diff --git "a/geometry3k_vqa.tsv" "b/geometry3k_vqa.tsv"
new file mode 100644--- /dev/null
+++ "b/geometry3k_vqa.tsv"
@@ -0,0 +1,632 @@
+index	image	question	answer	category	l2-category	split
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$\overline{A C}$ and $\overline{D F}$ are equidistant from the center. If the radius of $\odot G$ is 26 find $A C$	48	Geometry	Geometry3K	test
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the length of $\widehat {ZY}$. Round to the nearest hundredth.	7.85	Geometry	Geometry3K	test
+2	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the area of the figure to the nearest tenth.	31.1	Geometry	Geometry3K	test
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pentagons $A B C D E$ and $P Q R S T$ are similar, find $S R$	4 \frac { 4 } { 11 }	Geometry	Geometry3K	test
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$\triangle PQR$, $\overline{ST} \| \overline{R Q}$ . If  $PS=12.5$, $SR=5$, and $PT=15$, find $TQ$.	6	Geometry	Geometry3K	test
+5	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	<image>$a=14, b=48,$ and $c=50$ find $cosA$	0.96	Geometry	Geometry3K	test
+6	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C}$ is a diagonal of rhombus $A B C D$ If $m \angle C D E$ is $116,$ what is $m \angle A C D ?$	58	Geometry	Geometry3K	test
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parallelogram $JKLM$ to find $m \angle KLM$	71	Geometry	Geometry3K	test
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	<image>Find the perimeter of the parallelogram.	78	Geometry	Geometry3K	test
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x.	5 \sqrt { 3 }	Geometry	Geometry3K	test
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$PS$.	9	Geometry	Geometry3K	test
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the figure, $m∠1 = 50$ and $m∠3 = 60$. Find the measure of $\angle 8$.	120	Geometry	Geometry3K	test
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x	4	Geometry	Geometry3K	test
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$ABDC$ is a rectangle. If $m\angle1 = 38$, find $m \angle 2$	52	Geometry	Geometry3K	test
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is the value of $x$ below to the nearest tenth?	22.5	Geometry	Geometry3K	test
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$m\angle W$	108	Geometry	Geometry3K	test
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the ratio of $\cos B$ as a decimal to the nearest hundredth.	0.38	Geometry	Geometry3K	test
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the measure of $JK$.	31	Geometry	Geometry3K	test
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	<image>For trapezoid $T R S V, M$ and $N$ are midpoints of the legs. If $T R=32$ and $M N=25,$ find $V S$	18	Geometry	Geometry3K	test
+19	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$x$ so that each quadrilateral is a parallelogram.	4	Geometry	Geometry3K	test
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$WR$.	8	Geometry	Geometry3K	test
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	<image>Find the value of $x$	74	Geometry	Geometry3K	test
+22	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	<image>Find the area of the trapezoid.	678.5	Geometry	Geometry3K	test
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diameters of $\odot A, \odot B,$ and $\odot C$ are 10, 30 and 10 units, respectively. Find ZX if $\overline{A Z} \cong \overline{C W}$ and $C W=2$.	3	Geometry	Geometry3K	test
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x	6 \sqrt { 6 }	Geometry	Geometry3K	test
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	<image>Find x. Round to the nearest tenth.	52.5	Geometry	Geometry3K	test
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	<image>Find $y$ so that each quadrilateral is a parallelogram.	31	Geometry	Geometry3K	test
+27	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$K J$ if $G J=8, G H=12,$ and $H I=4$	2	Geometry	Geometry3K	test
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$QP$.	3.6	Geometry	Geometry3K	test
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$\odot T, Z V=1,$ and $T W=13$. Find XY	10	Geometry	Geometry3K	test
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the figure, $m∠11 = 62$ and $m∠14 = 38$. Find the measure of $\angle 1$.	38	Geometry	Geometry3K	test
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two polygons are similar. Find UT.	22.5	Geometry	Geometry3K	test
+32	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the measure of $∠A$ to the nearest tenth.	41.8	Geometry	Geometry3K	test
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$m \angle H$.	31	Geometry	Geometry3K	test
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$x$.	90	Geometry	Geometry3K	test
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\widehat{AC}=160$ and $m \angle BEC=38$. What is $m \angle AEB$?	42	Geometry	Geometry3K	test
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KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/Z	<image>A plane travels from Des Moines to Phoenix, on to Atlanta, and back to Des Moines, as shown below. Find the distance in miles from  Phoenix to Atlanta if the total trip was 3482 miles.	1591	Geometry	Geometry3K	test
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$x$.	123	Geometry	Geometry3K	test
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for x in the figure. Round to the nearest tenth if necessary.	3	Geometry	Geometry3K	test
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the figure, $\overline{A D}$ is perpendicular to $\overline{B C}$ and $\overline{A B}$ is perpendicular to $\overline{A C}$. What is $B C ?$	20	Geometry	Geometry3K	test
+40	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	<image>Find the area of the figure. Round to the nearest tenth.	30.2	Geometry	Geometry3K	test
+41	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	<image>If $c=5,$ find $b$	2.5 \sqrt { 3 }	Geometry	Geometry3K	test
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$z$.	12	Geometry	Geometry3K	test
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	<image>Find the area of the shaded region. Assume that the polygon is regular unless otherwise stated. Round to the nearest tenth.	216.6	Geometry	Geometry3K	test
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$m \angle 2$.	39	Geometry	Geometry3K	test
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x. Round to the nearest tenth.
+"	5.8	Geometry	Geometry3K	test
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is the perpendicular bisector of $XZ$, $WZ=14.9$. Find $WX$.	14.9	Geometry	Geometry3K	test
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$JL$.	14	Geometry	Geometry3K	test
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pFnFZ3mjywtDcwoFkPzBeWHJOSG57ivU7C5+26da3RGPOhSTHpkA/wBa4L4z30H/AAq66CyKwvJIFhIP3/nD8evCk13Wl27WmkWVs4w8MCRsPcKBQBg+E/FVxr2qa/pl7ax291pN35OI2JDxnOx+fXB/Ssq3+I/+ieLdUubRF0vRJ/s8MkbHdcSA4I54HJXH+9WX4l1BfA/xKutbOFt9W0eU4PRriBdw/NQB+NYOs6JNpH7OAVwfPuGivbknqTJKpGffBQfhQBV+IHibxdqPw6Mmt6DaW2nak0TW8tvKS8XzB1EgPqAeeO2a9zsv+PC3/wCuS/yFecfFye2Pwf3Ky7JTbeR78gjH/AQa9Hsv+PC3/wCuS/yFAHEeLvCU8N0/iDw+mLsc3Nqo4nHcgf3vbv8AXrl6XqcGq2gnhOCOHQ9UPoa9SrgPF3hK4trt/EPh+PFyObq0UcTjuQP73t369eu0J391msJ9GQ0VS0zU7fVbQTwHB6Oh6ofQ1dqmrGgUUUUgCiiigAooooAKKKKACiiigAooooAKKKKACiiigCG2uoLyLzbeQSJnGR61NWD4R/5Azf8AXZv6VvU2b4mkqVaVNbJhRRRSMAooooAKxg174U1JtY0hd9s//H5Z/wALr6j0P8vpkVs0U07Adto+sWWu6bHfWMu+J+oP3kPdSOxFX68hV73wlqTavpKF7R/+PyzHRh/eHoR+n0yK9Q0jV7PXNNivrGUSQv27qe6kdiKznC2q2MZRsXqKKKzICiiigAooooAKKKKACiiigDD8SeFbHxQNPF7LcR/YbpbuLyWUZdegbIPH0x9a0dU0y01nTLjTr+ETWtwhSRD3H9D3zVuigDz3TPhDpNjqlndXOq6rqMFiwa0tLuYPFER04x0HoMCvQqKKAPIfH19pPxC1jTPCWlrNc31rqZ+3OImUW0SZWTLEYOe2PQe1epajpdnqmk3Gl3cIe0niMTxjj5SMcemO3pVsKASQACevvS0AeaH4LaRcWAsb7XNdurWIYtYpLkbbcZH3VKkZwMdMYJ4716RFGIYUjUkqihRn2p9FABRRRQB594u8JXFpdv4h8Px/v/vXVoo4mHdgPX279evXP0zU7fVbQTwN7Oh6ofQ16jXnvi3wncWN3J4h8Px/vfvXdmo4mHdgPX2/Hr12hPm0ZrCfRjKKp6bqVvqlotxbtx0ZT1U+hq5VNWNAooopAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAZ+j6adKsjbmXzcuX3bcda0KzNC1GbU9PM86oriRlwgIGB9TWnQzfEqoq0va/FfUKKKKDAKKKKACiiigArGSS88I6k2raUhkspD/AKZZjoR/eX0x+n0rRv72HTrC4vbgkQwRmR8DJwB2rA0fxedS1C3s7rS7ixN3EZrVpGDCZQM9uhxzimpW0FdbM9e0jVrPW9OivrGUSQyD8VPcEdiKvV5DHLeeD9SbVdLQyWMh/wBMsweMf3l9Mfp9K9R0nVbPWtOivrGUSQyD8VPcEdiKznC2q2MpRsXaKKKzICiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAPPPFvhO40+7k8Q+H48v967s1HEo7so9fb8frS03UrfVLRbi3bIPDKeqn0NeoV534s8KXGmXcniDw/Fkn5ryzUcSDuyj19vx9c7QnzaM1hPoxKKqadqNvqlotxbtlTwynqp9DVuqasaBRRRSAKKKKACiiigAooooAKimuYLfHnTRxbum9gufzqWsjU4Yp9c0qOaNJEImyrqCPujsaDWhBTnaW1m/uTZd/tKx/wCf22/7+r/jR/aVj/z+23/f1f8AGk/svT/+fG2/78r/AIUf2Xp//Pjbf9+V/wAKZf8As/n+BmeEf+QM3/XZv6VvVFbrbpFtthEIwekYGM/hUtDFiavta0p2tdhRRRSMArF8Uay+j6STbL5l/csILSMdWkbgfgOtbVea3HirTV8eXV1q3niPTc29nEsRYbs4dz78YHt9KTdhN2ND4Y+bFo2prcyF5I751dyxOSFXJyayPDWiWmu6Wl/qWvahb3N1LIY4o7wJlQxHAIJ6g1Z+Huq2V1Brmn+a8bzTTXW8rgLGQq5JPAIzVv8A4V34eTw1OImNzN5bvHeeZ0IzjGDtxUrYhapHWxaPbJof9kSvNcW5iMTNM+XZTnOT681l6P4Og0rUIbyTUL29e3jMVstw4IhU8YGPbijwFfz6j4NsZrl2eVQ0ZdjksFYgfpiukqtHqWrPUKxoprzwdqTappiGXT5Dm7sweMf3l9Mfp9OmzR1GDVJ2GdzpWq2es6dFfWMokgkHB7g9wR2Iq5XkMM954N1FtT01DLpspzd2YPAH95fT/Pbp6lpeqWmsafFfWMwlgkGQR1B7gjsRWc4W1WxjKNi5RRRWZAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB514s8K3GlXcniDQIsg/NeWS9HHdlHr/wDr9RVXTtQt9TtFuLdsqeCD1U+hr0+vPPEvg+8sNROteGoQ5lb/AEqxBwH/ANpfT/PuK2jPm0ZrCfRjaKzc+K/+hWm/7/CjPiv/AKFab/v8KvlNNDSorNz4r/6Fab/v8KM+K/8AoVpv+/wo5Q0NKis3Piv/AKFab/v8KM+K/wDoVpv+/wAKOUNDSorNz4r/AOhWm/7/AAoz4r/6Fab/AL/CjlDQ0qy77/kP6V/uzf8AoIp2fFf/AEK03/f4VVntPFU1/a3X/CMzA24cbfNHzbgB/SjlNaE4xk230f4po3KKzc+K/wDoVpv+/wAKM+K/+hWm/wC/wo5TLQp+Ef8AkDN/12b+lb1c9pOneKdKszbjw3PKC5fcZAOtX8+K/wDoVpv+/wAKLHTjZxniJyi7ps0qKzc+K/8AoVpv+/woz4r/AOhWm/7/AAo5Tm0NKis3Piv/AKFab/v8KM+K/wDoVpv+/wAKOUNDL8PeGZtO0zV7K/eJ0v7iV/3LE4R1Awcgc9aw4fDfjGx0mTQLS+086c25FuHDCRUYnIxj3Pr1612GfFf/AEK03/f4UZ8V/wDQrTf9/hU8n9XJsh+i6VDomj22nQEskC43EYLEnJP4kmr9ZufFf/QrTf8Af4UZ8V/9CtN/3+FPlHoaVFZufFf/AEK03/f4UZ8V/wDQrTf9/hT5R6GkRkYPSsa3uLzwXqLajpyNLpkpzd2YP3f9pfT/AD26T58V/wDQrTf9/hSH/hKiCD4VlIP/AE2H+FNKwaHpumanaavp8V9ZTCWCUZBHb1BHYj0q3XkXh2DxZ4e1p7i18P3KafOwM9oJFI/3l6YP/wCr6etxv5kavtZdwBwwwR9awnDlehhKNnoOoooqCQooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD//2Q==	<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.	91.9	Geometry	Geometry3K	test
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x.	15	Geometry	Geometry3K	test
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$ST$.	19	Geometry	Geometry3K	test
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x.	18 \sqrt { 6 }	Geometry	Geometry3K	test
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	<image>Find $EG$ if $G$ is the incenter of $\triangle ABC$.	5	Geometry	Geometry3K	test
+54	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$x$ so that each quadrilateral is a parallelogram.	13	Geometry	Geometry3K	test
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$x$.	3	Geometry	Geometry3K	test
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x.	1	Geometry	Geometry3K	test
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	<image>Tangent $\overline{M P}$ is drawn to $\odot O .$ Find $x$ if $M O=20$	12	Geometry	Geometry3K	test
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H, the diameter is $18$, $LM = 12$, and $m \widehat {LM} = 84$. Find $HP$. Round to the nearest hundredth.	6.71	Geometry	Geometry3K	test
+59	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	<image>Find x to the nearest tenth. Assume that segments that appear to be tangent are tangent.	21.6	Geometry	Geometry3K	test
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$m \widehat{F E}=118, m \widehat{A B}=108$, $m \angle E G B=52,$ and $m \angle E F B=30$, find $m \widehat{C F}$	44	Geometry	Geometry3K	test
+61	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADZAVsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD27yfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAFPyfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAFPyfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAFPyfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAFPyfb9KPJ9v0q5tHpRtFAFPyfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAFPyfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAFPyfb9KPJ9v0q5tFG0UAU/J9v0o8n2/Srm0UbRQBT8n2/Sjyfb9KubRRtFAEmKMUtFACYoxS0UAJijFLRQBnahruj6TIkeparY2Ujjcq3NwkZYeoDEZqK08TeH7+4W3s9c0y4mb7scN3G7H6AHNcKdP07xX8ZNXGpW0F1Z6VYR24jnUMvmMd2cHvy1VPiX4Y8L22hQ2mjaZaQ69cXEaWKWahZC24ZOF/hAzyeBxQtk+/8AmO2rXb/K561ijFRWkckVnBHM++VI1V29WA5NTU3uSndCYoxS0UhiYoxS0UAJijFLRQAmKMUtFACYoxS0UAJijFLRQAmKMUtFACYoxS0UAJijFLRQAmKMUtFACYoxS0UAJijFLRQAmKMUtFACYoxS0UAJijFLRQAmKMUtFACYoxS0UAFFFFABRRRQAUhIUEk4A5NLUVzCLm1lgLugkQoWQ/MuRjIz3pO9tBrzPJPBXgzQfHCaz4i1ywN213qU32dvOkTEYPHCsP19KPE3hbSvBOv+HZ/CKy2erXV8sJt0neQSwn7+4MScDj863LX4P6bYwCC08S+J7eFckRxXyooz7BMV0GgeBtG8P3bX0K3F3qDLtN5ezGaXHoCeB+AFUrJq3S34f5ibvfzv/XyOkopCyhgpYbiCQM8kD/8AWKWkAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBwXj61uL3xH4YtrW8ktJpHuAk8fVDhD6j0qSPxRrHhiRbbxXamW2ztTU7VMqf98Dofy+hqfxV/yO/g//AK63H/oKV2EkaTRtHKiujDDKwyCPcV2SqKNOEZK6s/Xd9TijTcqlSUXZ3Xpst0RWd7a6hbJc2c8c8L9HjbIqeuLvPBM+m3T6h4TvTp9weXtXOYJfbHb/ADjFSab44SO7Gm+JLRtJv+gZ/wDUye6t0H8ves3R5lzUnfy6/d/kaqvyvlqq3n0+/wDzOwopAQygggg8gjvS1znQFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHG+Kv8Akd/B/wD11uP/AEFK7KuN8Vf8jv4P/wCutx/6CldhJIkMbSSOqIoyzMcAD3Nb1f4cPR/mzno/xKnqv/SUOqnqWl2Or2ptr+2jniPZx09weoP0p1jqVjqcJmsL22u4gcF7eVZFB9Mg02fVtNtbyOzuNQtYbmX/AFcMkyq7/RScmsU2ndbm7SaszkW0PxB4RJl8PTnUdNBy2nXDfOg/2G/z9DW1oPjHTNdc24L2l+uQ9pcDa4I649f5+wq9rmqNpGm/aI4PPmeWOGGIvsDO7BVy3OBk8nBrAk0q08Xtd2ut6dHZ6tYuoM9nNvwGXKsrlVJ+jDjH410KrGp/FWvdfr3/ADOf2Uqf8J6dn+nb8jsaK4T7d4m8G/LqMb63pK9LqIfv4l/2h3/H866vSNc07XbX7Rp10ky/xKOGX2I6is50ZRXMtV3X9aFwrRk+V6Ps/wCtfkaFFFFZGwUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHG+Kv+R38H/9dbj/ANBSq3j26tZdb8PaRqU0cWlTSS3V75rAI6RLkK3qpYjj2qz4q/5Hfwf/ANdbj/0FKp+MrS3b4ieDLy9VTaiSeLL42iUqCgOfcce4rep8NL0f5v8AUwo/FV9f/bUWfDkfhW98QXGueGNQtQq23kXVpaIEV+cq7LxyOgOKxPC2gaX4q8Bajq2p2kNxe6pJcStcyIGkTDMqbWPK7QBjFamqRI/xg0kWYUTHTZ/txQcmM4Cbv+BdKg8C3MGkfC66iupVRtNa6iuAxwUZXY4P4EfnXPL4G/L9Xf8AQ6V8VvNfkavguSPxR8NtLOqILkTQBJfM53FGxnPXOVBz610OmaRY6PA8NjCY1dt7szs7u2MZZmJZjgAcntWD8NbR7L4daLFIpVzB5hB/2iWH6GurrSek2Zw+FBXKav4HtLm6Oo6RO+lamORNBwrn/aXpz/8ArzXV0UQqSg7xYp041FaSOIt/F+o6DOln4usvKBO1NQt1LRSfUDp/ngV2VvcwXluk9tNHNC4yrxsGB+hFLcW8N1A8FxEksLjDI6hlYe4NcbceDr/Q53vfCN6bcsdz2E53QyfTPQ/5yK2/dVf7r/D/AIH5GP72l/eX4/8AB/P1O2ork9J8cW092NO1qB9J1IceXPwj9vlbpz/+rNdZWM6coO0kbQqRqK8WUtV1ay0XT3vb+byoUIHQksx4CqByST0ArN0XxdZa1qM2nC0v7G9ijEvkX1uYmeMnG9eTkZ/GsvxE6z/EbwrY3GPsyrcXKBujzKoC/iASa27S60nUfEV2beIS39gggluAvCBvm8sN68AkduKhd/X+vvLf9f16GxRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAV729ttNspry8mWG3hQvJI3RQKwdP8cWF9q1vp0lhqljJdAm1kvbUxJPgZO05645wQKPGOotDFp+kw2tpcXWqXAhiF4u6FNo3l2X+LGBgcc4rn4or+5+KGkWWo61DqMthaz3ckcFuIkhZsIvGWOcMepojq/67XB6L+vQ1PFX/ACO/g/8A663H/oKV02p6VYa1YvZalaRXVs/JjkXIz6j0PvXM+Kv+R38H/wDXW4/9BSuyret/Dp+n6swo/wASp6/+2oydE8NaP4dSRdKsUtzLjzH3M7vjplmJJ/Oq2oeCPDWq6n/aN7pEE10SCznIDkdNyg4b8Qa36Kw8zcQAKoVQAAMADtS0UUAFFFFABRRRQBn6tomna5am31G1SdP4SRhkPqD1Fcp/Z3ibwcd2lStrOkr1s5j++jH+ye/+eO9d3RWsK0orleq7MynRjJ8y0fdf1r8zkY7zwr8QrRbO8gSWaJtxtZ8xzRMOpUgg/iprotM0qx0axSy061jtrdMkRxjAyepPqfc1ma94Q0zXiJ3Vra+XlLu3O2RT7+v4/pWGNa8ReECI9egbVNMHA1C3X50H+2v+fqa09lCp/CevZ/p3/Mz9rOn/ABVp3X6rp+R3dFUtM1aw1i0W60+5jniPdTyp9COoPsau1ztNOzOhNNXQUUUUhhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGbrWgaX4htFtdVs1uYkcOgLFSrDuGUgg/Q1BZ+FNC068truz02KCe2Ro4njJGAxyc8/MSe5ya2aKNgON8Vf8jv4P/663H/oKV2Vcb4q/wCR38H/APXW4/8AQUrsq3q/w6fo/wA2c9H+JU9f/bUFFFFYHQFFFFABRRRQAUUUUAFFFFABQQCCCMg9qKKAOQ1PwNGLo6l4dum0jUev7r/VSezL0/p7GorTxpc6XdJp/iyy+wzHhLyMEwS/j2/z0rtKgu7O2v7Z7a7gjnhf7ySKCDXQq3MuWqrr8fv/AMzndDlfNSdn+D+X+RJFLHPEssMiyRuMq6HII9jT64aXwrq/hqV7rwneFoPvPply25G/3Seh/L61paL42sdRufsF/FJpmpqcNbXPGT/st3/Q0pUbrmpu6/FeqHGvZ8tRWf4P0f8ATOnooorA3CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAON8Vf8AI7+D/wDrrcf+gpXZVxfi6RIfGfhGSV1RFluCWY4A+VO9dR/a2m/9BC1/7/L/AI10Vf4dP0f5sxoQlKdSy6/+2ouUVT/tbTf+gha/9/l/xq5XOdDjKO6CiiigkKKKKACiiigAooooAKKKKACivOYtW8Wa7pWo+JNM1a1tLO2kmFrYNaiQTpGSCXcnIJwemMe9aWoeMLqfwvoNzpUUaajrrxRQCUblhLDLMRxkKAfrxR/wPx2B6P7/AMNztK5zxDD4X1e6i0fV7iy+3SD9zE0yrOM9Nvf8O9ZthqWuaH4vs9C1zUYtTt9Rhke1uhbrC6yJyyELwRg5B61Nf+GNSuL3UIYZLH7BqF1HcyzSBvPiKBBtUAYP3OCSNuehqoycWpJkyipJxkin5Xijwaf3JfXdHX+Bj/pEI9v7w/P6Cuk0PxNpfiGHfY3AMij54H+WRPqP6jiteub1zwXp2sTi9hL2GpKdyXdt8rZ9WA6/z9639pCp/E0fdfqv8jD2dSn/AA3ddn+j/wA/wOkorhU8R674WdYPFFqbqyzhNStVzj/fX/8AV+NdjYahZ6narc2NzHcQt0eNs/gfQ+1Z1KMoa7rutjSnWjPTZ9nuWaKKKyNQooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA4vxdGk3jPwjHKiujS3AKsMg/Knauo/snTf+gfa/9+V/wrmfFX/I7+D/APrrcf8AoKV2VdFX+HT9H+bMaE5RnUs+v/tqOZ8X6bYReENVeOytkdbZiGWJQQcfSumrD8Zf8ibq/wD17P8AyrcrF/CjvqScqEbvrL8ohRRRUnMFFFFABRRRQAUUUUAFFFB5GKAOU8aQ+I77SJY9AksGtZIXW5Dswmde4iYZUHGRyDzXMvdWV9N8NbjSo3j07zXSONz8yYjxg+4wa1rbwz4s0S2n0jQ9Q0ldJkeRopbmKQz24ckkAA7WwScZx+NXrnwSieFtK0vTbryLrSZEmtLmRdw8xc53AdQ2TkD1oWmvmv8Agjfb1KXiwFviT4IC9RJdE/TyxXdVyWleHtaufE0Wv+JLmxa4tYGgtbexVvLTd95yX5LEDHtXW0+iQm7sKKKKQDXRZEKOoZWGCrDIIrj7/wAEPZ3Taj4WvDpl31aDrBL7Fe36j2rsqK0p1ZU/hM6lKNRe8cbYeODa3Sad4otDpd6eFlP+ol9w3b8yPeuxVldQyMGUjIIOQRVa/wBOs9UtGtb62juIW6o4z+I9D7iuPbw9r3hRzN4ZujeWGctpt02ceuxv8/jWtqdXb3X+H/A+f3mV6lLf3l+P/B+X3HdUVzmheMtO1mU2cgey1JeHtLj5WB9B6/z9q6OsJwlB2krG0JxmrxdworB8XeJF8MaIbpIftN5K6w2lsDzNK3Qf1P0qLwN4mk8W+F4dVmgSCZpHjkiQkhSrY7+2Kla3t0Leh0dFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRXE6t4s1XUNfm8PeEbW3nu7YD7ZfXRPkW2f4cDlm9v8A6+MzWD8RfC9hPrT61p+sW1uPNns2tBCQg+9sZeTgep/PpSvpfoO2tup1XiPwuniGexnN/dWc1mXMclucNlsZ57fd/Wsz/hBbz/ob9e/8CT/jXSaLqkOt6JZapApWK6hWVVbquR0P0q9XQq9SC5E9jndClN87W5xU3w/nuYXhn8Va3LE4wyPOWVh6EHrT/wDhBbz/AKG/Xv8AwJP+NdlRR9Zq9/wQfVqW1vxZxv8Awgt5/wBDfr3/AIEn/Gj/AIQW8/6G/Xv/AAJP+NdlRR9Zq9/wQvqtLt+LON/4QW8/6G/Xv/Ak/wCNH/CC3n/Q369/4En/ABrsqKPrNXv+CD6rS7fizjf+EFvP+hv17/wJP+NH/CC3n/Q369/4En/Guyoo+s1e/wCCD6rS7fizjf8AhBbz/ob9e/8AAk/40f8ACC3n/Q369/4En/Guyoo+s1e/4IPqtLt+LON/4QW8/wChv17/AMCT/jR/wgt5/wBDfr3/AIEn/Gr3inVrrT7zQbW0uBC15fqkrFVP7lVZ36jjgDmtyzv7PUYjLY3cFzGCVLwSBwCO2QetCxNXv+CB4Wkun4s5X/hBbz/ob9e/8CT/AI0f8ILef9Dfr3/gSf8AGuyoo+s1e/4IPqtLt+LON/4QW8/6G/Xv/Ak/40f8ILef9Dfr3/gSf8a7Kij6zV7/AIIPqtLt+LON/wCEFvP+hv17/wACT/jR/wAILef9Dfr3/gSf8a7Kij6zV7/gg+q0u34s43/hBbz/AKG/Xv8AwJP+NH/CC3n/AEN+vf8AgSf8a7Kij6zV7/gg+q0u34s43/hBbz/ob9e/8CT/AI0f8ILef9Dfr3/gSf8AGuyoo+s1e/4IPqtLt+LOBuvhfDfSrLea9qdxIvCvM4cj6E11WjaZcaRamCfVJ72NR8rXAG5R/vDqPrWpXI+PptXn0yDRNFtrhrnVJPIkukjYpbRfxszDgHHA5qamIqzjyt3Lp4elCXNFWOZ0/wAS6F4j8e3OtalrWnW+n6TuttNhuLpEMkh+/NgkcdgasfB25hNp4isIJUlht9UkaJo2DKUboQRwQdtdJafDrwla2cNudBsJTGgTzJYFZnwOpPcmsHwbok3h/wCJfii2t9MlttJuI4ZLd1hKw5AGVVsYzljx7VnGydvJ/ozWWqv5r/L9T0aiiikAUUUUAFFFFABRRRQAUUUUAFFFFABVPVrz+ztGvr3Gfs9u8v8A3ypP9KuVHcQR3VtLbyrujlQo49QRg1Mk3FpDjZNXOI+EVoIvANvev81zqEstzPJ3di5HP4AV2GpanY6TaG51G5it7fcE3ynAJPQV53o2leOvAkT6Tpen2eu6QJWa2LXIgliUnOG3cEZ9M/0rWtvDGueIdZtdU8XyWqQWb+ZaaXaEtGr9nkY/eI9Bx+oOjak7rYmzS13O4XG0bRgduKWiipGFFFFABRRRQAUUUUAFFFFABRRRQBwviLTbXxF8SNG028US29jZTXkkLfdkLMqKGHcdeO9P0SwtrH4o6zHplvFb2Y0+D7RHCoVPOLMQcDjO0VZ1Twbe3fiibxDYa9LYXphS3j226yKsYyWVgxw2SQe2Md62dC0KLQ7aVRPLdXVxIZrm6mxvmc8ZOOAAMAAcACiOiXz/AB/4H5BLX8P6+81aKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP//Z	<image>If $c=5,$ find $a$	2.5	Geometry	Geometry3K	test
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x.	5	Geometry	Geometry3K	test
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the length of $\widehat {AB}$. Round to the nearest hundredth.	9.77	Geometry	Geometry3K	test
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the figure, line $l$ is parallel to line $m$. Line $n$ intersects both $l$ and $m$. Which of the following lists includes all of the angles that are supplementary to $ ∠1 $?	angles 2,3, 6, and 7	Geometry	Geometry3K	test
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the figure, $m∠3 = 43$. Find the measure of $\angle 11$.	43	Geometry	Geometry3K	test
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AB || DC, find x.	115	Geometry	Geometry3K	test
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the measure of $\angle 2$.	33	Geometry	Geometry3K	test
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diagram shows the layout of Elm, Plum, and Oak streets. Find the value of $x.$	125	Geometry	Geometry3K	test
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$y$.	5 \sqrt { 5 }	Geometry	Geometry3K	test
+70	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	"<image>In $\odot P, m \angle M P L=65$ and $\overline{N P} \perp \overline{P L}$.
+Find $m \widehat{N M}$"	25	Geometry	Geometry3K	test
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pair of polygons is similar. Find y	5	Geometry	Geometry3K	test
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parallelogram $JKLM$ to find $m \angle KJL$.	30	Geometry	Geometry3K	test
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the area of the figure. Round to the nearest tenth if necessary.	63	Geometry	Geometry3K	test
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FFFABRRRQAUUUUAFFFFABRRRQAVg+MtDuPEfhe50u1kijmlkhYNKSFASVHPQHspreooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==	<image>Find the perimeter of the parallelogram. Round to the nearest tenth if necessary.	76	Geometry	Geometry3K	test
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$GHJK$ has an area of 75 square meters. Find the height.	5	Geometry	Geometry3K	test
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x	58	Geometry	Geometry3K	test
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x. Round to the nearest tenth.	30.2	Geometry	Geometry3K	test
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the pair of similar figures, find the area of the green figure.	9	Geometry	Geometry3K	test
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$\odot X, A B=30, C D=30,$ and $m \widehat{C Z}=40$
+Find $m\widehat{C D}$"	80	Geometry	Geometry3K	test
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EFGH is a rectangle. If FK = 32 feet, find EG.	64	Geometry	Geometry3K	test
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$x$.	7	Geometry	Geometry3K	test
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the figure, $m \angle 1=4 p+15$, $m \angle 3=3 p-10$ and $m \angle 4=6 r+5 $. Find the value of $p$.	25	Geometry	Geometry3K	test
+83	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	<image>Find x.	\sqrt { 21 }	Geometry	Geometry3K	test
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$BC$.	13	Geometry	Geometry3K	test
+85	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x.	24 \sqrt { 3 }	Geometry	Geometry3K	test
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	<image>If $ZP = 4x - 9$ and $PY = 2x + 5$, find $ZX$.	38	Geometry	Geometry3K	test
+87	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	<image>Find y	6 \sqrt { 3 }	Geometry	Geometry3K	test
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w021jtrWMkrFGOAScn9TXNfCzTP7K+G2jRFcPNEbhvfzCWH6ED8K7GgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK4b4oeENW8a6HZ6ZplxaQKlyJpjcOy5AUgAbVOfvH07V3NFAEVrbR2dpDawjEUMaxoPQAYH8qloooAKKKKACiiigAooooAKKKKAP//Z	<image>Find the measure of $∠T$ to the nearest tenth.	21.8	Geometry	Geometry3K	test
+89	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	<image>Find x to the nearest tenth. Assume that segments that appear to be tangent are tangent.	7.2	Geometry	Geometry3K	test
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\cong \overline{DF}$. Find $x$.	2	Geometry	Geometry3K	test
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$m \angle WYZ$.	23	Geometry	Geometry3K	test
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	<image>Find the area of the shaded region.	22.1	Geometry	Geometry3K	test
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$\odot O, \overline{E C}$ and $\overline{A B}$ are diameters, and $\angle B O D \cong \angle D O E \cong \angle E O F \cong \angle F O A$
+Find $m\widehat{A D}$"	135	Geometry	Geometry3K	test
+95	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$x$  if $AE=3, AB=2$, $BC=6,$ and $ED=2x-3$	6	Geometry	Geometry3K	test
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	<image>Find $A E$ if $A B=12, A C=16,$ and $E D=5$	15	Geometry	Geometry3K	test
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$x$ in the given parallelogram	38	Geometry	Geometry3K	test
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x	115	Geometry	Geometry3K	test
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the area of the figure. Round to the nearest tenth if necessary.	129.9	Geometry	Geometry3K	test
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$a$ in the given parallelogram	9	Geometry	Geometry3K	test
+101	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADMARsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiikZgqlicADJNAC0V434M8DaH46t9V8R63bSTveajM0BEzpiMHjofXP5VYXw3a+D/in4fsfC89zFHdJJJf2nnF0EYHDEH1569wMU0tUn1/yuD0vboeuUUUUgCiiigAooooAKKKKACiiigAooooAKKKKACiivPtV1PVfF/iq68M6HfSafp1gB/aV/D/rCx6RRnsfU+3tydbIPNnoNFee3nwj0U28k2n3mqW2qhP3d8Lx2k3dt2TyM+mK6Twa+ut4XtV8SQmPVI8pLllJcA8MdpIyRigDeooooAKKKKACiiigAooooAKKKKACiiigAooooAKwfG2pf2R4K1i9DbWjtXCH/aI2r+pFb1c9408MyeLvDcujpf8A2ISujNL5XmZCnOMbh3A71MldWKi7STZxvhT4YIfCumSP4l8S2bzW6yvBa3wjjRmG4gLt460eFbCXwp8VrvQYbt9Sgu7EXUtzdANcRkHADSDkj2PqPx1IvBXjKJEj/wCFiziJQF2rpcYOB2B3cV0HhvwlZeG/tE8c1xeahdENc3t0+6WU9hnsB6CtL+836kfZszfoooqRhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAAehrzf4OOJtG1ueX/j9k1aZrgHqDxwf1r0iuG1L4cn+27nWPDmvXehXl0c3CxIJIpD6lCRz+NC0fy/yHurf11Oh8S+I7Lwto0mo3u5gCEjhT78rnoqjua0rSZ7i0hmkhaB5EDNE5yUJGcH3FcvpngOGHVIdV1vVLzXNQg5he7IEcJ9UjHAPvzXXUdBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUEgAknAHeiuQ8b6ncSLbeG9Nb/iYamdjEf8ALKH+Jj+GfwBq6cHUkooipUVOLkypB4l8Ua7dXkvh2y05tNhlMUc11vBkI6kYbp/iKsfaPiH/AM+eg/nJ/wDFVeudR0jwLo1hYbJ5C37m2traIyTTvjJIUd+pJ4HNWNB8VWOvzXFtFDd2l7bgGazvYfKlQHoccgj3BNbOtG7UIqxiqErJzk7mT9o+If8Az56D+cn/AMVR9o+If/PnoP5yf/FV2Vcp4s1KW01Cxgm1ebR9OkjkZ7yKNGJlBXZGS6sBkFjjGTjAqfbr+VfcV9X/AL7+8g+0fEP/AJ89B/OT/wCKo+0fEP8A589B/OT/AOKrf8PXV3e+H7G5v1K3MkQL5TYT6Er/AA5GDjtmtOm61nblX3CVC/2395xv2j4h/wDPnoP5yf8AxVH2j4h/8+eg/nJ/8VXZUUvb/wB1fcHsP77+8437R8Q/+fPQfzk/+Ko+0fEP/nz0H85P/iq7Kij2/wDdX3B7D++/vON+0fEP/nz0H85P/iqPtHxD/wCfPQfzk/8Aiq7Kij2/91fcHsP77+8437R8Q/8Anz0H85P/AIqj7R8Q/wDnz0H85P8A4quyoo9v/dX3B7D++/vON+0fEP8A589B/OT/AOKo+0fEP/nz0H85P/iq19e8U2OgTW9tLDd3d7cgmG0s4TLK4HU44AA9SRT9B8S2HiKOf7KJ4Z7ZwlxbXMRjlhYjI3KfX16UKvf7K+4HQt9t/eYv2j4h/wDPnoP5yf8AxVH2j4h/8+eg/nJ/8VXZVw/ivWLuz1eeJtYn0xIrRZbFIoFcXkxLZQ7lJbGFG1cH5s/Q9uv5F9w1h7/bf3mp4V8RXOrm9sdUhit9VspSk0UeQpXsy5JOP/retdJXCeJobvSp9O8ZQQFbmGNI9RgT+KM4z+R4/L0rtbW6hvbSG6t3DwyoHRh3BorQWk47P8H1FQm9YS3X4ro/0ZNRRRWB0BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFbUb+30vTp766fZDAhdj/Qe56VyvgmxuL6e68VaiuLrUOIEP/LKAdAPrgfgAe9QeIGbxZ4pg8NQMf7PsyJ9RdT1P8KZ/wA9fau5RFjRURQqqMAAYAFdL/dU7dZfl/wTmX72pfpH8/8AgbfeZN3oEF34l0/XJJn82xikjjiwNvz4yfrxXM6PIuv/ABTvta08l9OsrAWDTr92abfuIU9wo71H8RfENtaX+l6De6n/AGZYXyvJe3K53+UuP3akAkbicZ9BWlonjPwTFZGx0fUrVLezgaTy40ZQka9TyP8A65rmi+va/wCt/wBTpfbvb/gFKfx3d6bqmtaPe2sMuqQzIulwQKVN0sg+TOSehB3HgACu0sPtn2CD+0GhN5sHnGBSqbu+0Ek4/GvKp59Qj8SaL8Qb4NFaXV0LJLZlGYbVwRG7ejFjuP1Ar12ml7uu/wDX9MH8Wn9f10CiiikAUUUUAFFFFABRRRQAUUUUAY76FbJ4qbxJJcOJEsvsuxsbEXduLZ7Guc8Iv/bXjXxF4jsgf7MmSK0glIwtw0edzj1APAPeqPj3xDpreJ7Tw3rOqf2fpBt/tV4Ru3XHzYWLI5CnBJ9RxWzb/EDwfBpFw2mX8EkFhCCIII2XAyFVVBA5JIAFC2v6/wDB/Ub7en/A/QzrTx3qdzDNo4tbV/FSXz2ggVWESopz5zDcSE2kHryeBXfoHEaiQqXwNxUYBPsOcV5bo8Op6D8QdP1jWiBL4mieKaPAxbSLho4wf90Ae5zXqlP7Kvv/AF/w/wAxPd22/r/hvkMmhjuIJIJkDxSKVdT0IPBFcV4Umk8Oa9deErx2MOTPp0jn78Z5K/Ucn8G9q7iuY8a6JNqWmx32n5XVNOfz7Zl6tjkr+OPzArajJO9OWz/B9GYV4tWqR3X4rqv66nT0VleHdbg8Q6Jb6hDgFxiRP7jjqP8APYitWsZRcW4vdGsZKSUlswooopFBRRRQAUUUUAFFFFABRRRQAVieK9fXw9oct0o33LnyraPqXkPTjvjr+FbZIAyeBXCaYD4y8Yyaw/zaRpbGKzH8Mkvd/wCv/fPvW1GCbcpbL+rfMxrTaSjHd7f5/I2/B+gtoejD7QS2oXTefdyE5Jc84/D+efWugoorOc3OTk+ppCChFRjsgoooqSgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDhP+RM8bY+7o2tP+EM/wDQHP6+1d3WV4j0SHxDodxp8uAXGY3I+44+6f8APbNZvgrW5tS02Sx1DK6ppz+Rcq3U44Dfjj8wa6Z/vIe06rR/o/0OaH7qp7Po9V+q/U6eiiiuY6QooooAKKKKACiiigAooqvf30Gm2E97dPsggQu59h/Wmk27ITaSuzmfG+qXBit/D2mN/wATLUzsyD/qov4mP6j8/Suh0jS7fRtKt9PtVxFCu0Hux7k+5OTXMeCrG41G6uvFmpJi5vvltozz5UI6Y+v9M966uDUbG5Wdre8t5Vt3KTGOVWETDqGweCO4Nb1moL2S6b+v/A2MKKc26r67en/B3Ib/AFvStKmhh1DUrS1lnOIkmmVC/wBATzV+uR1PSbvV7i61DRbjS7q01SyW1kknJcIo3/MhXIcfOflyBkda6i0gFrZwW4dnEUapubqcDGTXP6nQ99CaiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACio554raCSeeVIoY1LPJIwVVA6kk9BUD6pp8dlFevfWy2su3y52mUI+77uGzg57etAEcet6VLqr6XHqVo2oIMtbLMpkH/AAHOa5bxXDJ4c1628W2iEwnEGoxqPvRngP8AUcD8F96s2vhjUor22geSx/s62v5L9JlDfaHZizbSMYHLYLZOQMYFdTdWsN7aTWtwgeGVCjqe4Na0anI7vbr6GVanzqy36Pz/AK/Ow+GaO4gjmhcPFIodGHQg8g0+uJ8HXU2jand+Eb9yz22ZbKRv+WkJ7fh/j6V21KrT5JW6dPQdKp7SN+vX1CiiiszQKKKKACiiigArhfEbv4q8TQeF7dj9htsT6k698fdjz/nr7V0HinXk8PaHLd433Dfu7ePqXkPQY/X8Kr+DdBfRNG3XRL6jdsZ7uQ9S55x+GfzzXRS/dx9q99l69/l+ZzVf3kvZLbd+nb5/kdAiJFGscahUUBVUDAAHavItRWC5+Kt74dtb4xa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$m\angle B$	120	Geometry	Geometry3K	test
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GH in the kite	\sqrt { 369 }	Geometry	Geometry3K	test
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the value of the variable $x$ in the figure.	125	Geometry	Geometry3K	test
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to the figure at the right. Find the value of $m ∠FCE$ if $ p \parallel q $.	105	Geometry	Geometry3K	test
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is the measure of $\angle B$ if $m \angle A=10 ?$	30	Geometry	Geometry3K	test
+106	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	<image>Express the ratio of $\cos N$ as a decimal to the nearest hundredth.	0.38	Geometry	Geometry3K	test
+107	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$m \angle R$	29.1	Geometry	Geometry3K	test
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$x$.	8	Geometry	Geometry3K	test
+109	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	<image>Find the area of the figure. Round to the nearest tenth.	50.2	Geometry	Geometry3K	test
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y.	21 \sqrt { 3 }	Geometry	Geometry3K	test
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the area of the shaded sector. Round to the nearest tenth.	182.6	Geometry	Geometry3K	test
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K L N$ and $\triangle L M N$ are isosceles and $m \angle J K N=130$. Find the measure of $\angle J$.	106	Geometry	Geometry3K	test
+113	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADjAQ4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKp32q2OmyW6Xtylv9oYpG0hwpbrjPQH0z1q5XN+PdG/tzwdfW6rumiXz4fXcvOB9RkfjV00nJKWxFRyjBuO50lFeQ+FZ/FeleG7PVdHl/trS2XEthIf3sLKcME7444x6/d713fh3xto/iP9zBKbe9Xh7Sf5ZAR1x6/h+OK0qYeUL21S/rUypYmM7J6N/1odHRRRWB0BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHn/AIL/AOJB4w17wu3ywF/ttmO2xsZA+gKj/gJre8ReCtH8R/vbiEwXq8pdwfLICOmT3/H8MVhePgdE13QfFcYIW2m+zXRHeJs/yBf8SK74EMoZSCCMgjvXTUnJONWL1f5o5KUItSoyV0n+D2PO/wC0/Fvgf5dWibXNHT/l8hH76NfVh3/H/vqux0TxFpXiG18/TLtJgB86dHT/AHlPIrUrjtb+H1je3X9o6PM+kaopys9t8qsf9pR6+2PfNLmp1Pj0fdbfNf5FclSl8Duuz3+T/wAzsaK8+h8Za14YmSz8ZWBMJO1NTtV3I3+8B/TB9q7ixv7TU7RLqxuYriB+jxtkfT6+1ZzpShq9u/Q0p1oz0W/bqWaKKKzNQooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAyvEukLrvhy/wBNIG6aIiMns45U/mBWT8O9XbVvB1qJSftNpm1mB6gp0z/wHb+Oa6uvP9H/AOKc+Kep6WfltdYj+1wDt5gyWA/8f/IVvT96nKHbX/M56nuVYz76P9P68z0CiiisDoGTQxXMLwzxJLE4wyOoZWHoQetcNfeALjS7t9S8Hag2m3J5e1cloJfbBzj8cj0xXeUVpCpKGxnUpRqfF/wThtN+IP2W7XTPFli2kX3QSsMwSe4bsPxI967eORJY1kjdXRhlWU5BHqDVXUtLsdYtGtdQtYriBv4XGce4PUH3FcQ/hXxD4Rka48JXpu7LO59Mu2yPfYf/ANR+taWp1Nvdf4f8AyvVpb+8vx/4J6HRXJ6B4/0zVrj7Beo+l6op2ta3Xy5b0UnGfocH2rrKxnCUHaSNoVIzV4u4UUUVJZBd3ltYW73F3cRQQoMtJK4VQPqawvBPi+Hxro9xqUFq1vFFdPbqGfcXChSG6DGd3SpfEngvQPFrWza3Ym5NsGEWJnTbuxn7pGeg61yHwKQR+CL1FGFXU5gPptSgDQ1b4mmw8S6hotj4Z1bVZbEoJpLKPeBuUMMgA46kc+hro/DGv3HiHT5bq40W/wBJdJTGIb6Mo7DAO4A9ucfga8v0e/8AGVl4y8ZXHh/w0t752oHzJrqTylKRllVUyRuJGTkE9q9D8C+MovGejy3BtWs721lMF1bMcmNx6d8H37gjtQB1FFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcL8S7aW2stO8R2q5uNJuVc47xsQCD+IX8Ca7qqupWEWqaZdWE4/dXETRt7ZGM1pSnyTUjOtDng4klrcxXtpDdQNuhmjWRG9VIyKmrifhlfyvoE+j3ZxeaTO1tIvfbk7f/Zh/wABrtqVSHJNxClP2kFLuFFFFQaBRRRQBj694X0jxJb+XqVqruBhJl+WRPo39DxXJeR4v8D827N4g0Vf+Wbf6+JfbqT+o9hXotFawrOK5XquxjOhGT5lo+6/rUwvD3i/R/Esf+g3O24Ay9tL8si/h3+oyK3a5jxD4F0nXpPtahrHUlO5Ly2+V93qcfe/n71hL4g8T+C2EXiO1bVNLHC6jbD50H+2P8cfU1fs4z/hvXs/07ke1nT0qrTuv17HoleZfA3/AJEu/wD+wpN/6Cld9pOt6brtoLrTbuO4j77Typ9GHUH61NY6bY6XC0On2VvaRM5dkt4ljUsepIAHPA5rBpp2Z0JqSujhtB+KFm+oa3p/ieey0m7065aNEdiokjHQjJ5PHQdiMVS+D4e+uPFfiFI2jstU1NntgwxlQWOf/HwPqD6V2+qeFPD+tXS3Op6NZXc64AklhVmx6E9x7GtS3t4bS3jt7aGOGGMbUjjUKqj0AHAFIZJRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB5/P/AMU38WoZfu2evQbG7ATLjH4/d/77NegVx3xL0yS88LG+tsi70yVbuJh1AX736c/8Bro9F1OPWdFs9RixtuIlfA/hJHI/A5H4VvU96EZ/L7tvwOel7lSUPmvnv+JeooorA6AooooAKKKKACkIDKVYAgjBB70tFAHFat8Pbc3Z1Pw5dPo2pDnMPET+xXsPpx7Gqtr461HQblLDxnp7WzE7U1CBd0MnucdPw/IV39Q3Vpb3ts9vdQRzwuMNHIoZT+BrdVrq1RXX4/ec7ocr5qTs/wAPuC1ure9tkuLWeOeFxlZI2DKfxFTVwF14G1HQLl7/AMGag1sSdz6fO26GT2Gen4/mKtaR8Q7drsaZ4itX0bUxwRNxE/uG7D68e5odG6vTd1+P3Aq/K+WqrP8AD7ztaKQEMAQQQeQR3pawOgKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAZNFHPDJDKoaORSrKehBGCK4X4cSyabJrHha4YmTTbktDu6tExyCP5/8Crva8/8Sf8AFO/EfRteX5bbUB9huj2z/CT/AOO/98VvR95Sp9/zRz1/dcanbR+jPQKKKKwOgKKKKACiiigAooooAKKKKACs/V9E03XbQ22pWkdxH23D5lPqp6g/StCimm07oTSkrM87OgeKPBbGXw5dNqulry2nXJ+dB/sH/DH0Nbvh7x1pOvSfZSzWWoqdr2dz8r7u4H97+ftXT1g+IfB+j+JY/wDTrfbcAfJcxfLIv49/oc1v7SNT+Ite6/Xuc/sp09aT07P9OxvUV519p8W+Bf8Aj8Da9oadZlH7+FfU+uB65HHUV2OieItK8Q2vn6ZdpMAPnTo6f7ynkVE6TiuZaruXCtGT5Xo+z/rU1KKKKyNgooooAKKKKACiiigAooooAKKKKACiiigDn/Gfiu28HeHpNTniaeQuIoIFODLIei57dCT7CuQh+IXijRdW06Pxl4dg0/TtRkEUVzBLuMTnoHGT/TuecEU/40QXEeiaPq8ULz2+malHcXEajPyep9s8f8Crlvi74+0DxJ4QtbLRbpruf7Qlw5WNh5CgEZYkcElgP8jIB7rXNePdG/tvwffQIuZ4l8+HHXcnPHuRkfjXRQsXgjZvvFQT9cU+qhJwkpLoTOCnFxfUxPCGs/294WsL8tuleMLL/vrw35kZ/GtuvP8AwV/xIPF+veF2+WEv9ttB22NjIH0BUf8AATXoFXWiozdtnqvmZ0JuVNX3Wj9UFFFFZGwUUUUAFFFFABRRRQAUUUUAFFFFABXHa38PrG9uv7R0eZ9I1RTlZ7b5VY/7Sj19se+a7GirhUlB3iyJ041FaSPPofGWteGJks/GVgTCTtTU7VdyN/vAf0wfau4sb+01O0S6sbmK4gfo8bZH0+vtU00MVzC8M8SSxOMMjqGVh6EHrXDX3gC40u7fUvB2oNptyeXtXJaCX2wc4/HI9MVrenU391/h/wAAxtVpbe8vx/4J3lFcNpvxB+y3a6Z4ssW0i+6CVhmCT3Ddh+JHvXbpIksayRurowyrKcgj1BrKdOUPiNadWNRe6x1FFFQaBRRRQAUUUUAFFFFABRRRQBy3xB1vVfDvhWXUtK0+G+MUgFxFMpYeSQQxwCOhx+Ga808Q6t4f8enSfDHgzTkX7Xdpc6jJDaeSIo1znfwM9Sc8jgAE5r3SoobeC33eTDHHuOW2KBk++KAJelFFFAHAePgdE1/QfFcYIW3m+zXRHeJs/wAgX/Eiu+BDKGUggjII71leJtIXXfDd/ppA3TRHy89nHKn8wKy/h3q7at4OtPNJ+0WmbWYHqCnTP/Adv61vL36SfbT/AC/U54+5Wcektfmt/wBDqqKKKwOgKKKKACiiigAooooAKKKKACi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x.	12	Geometry	Geometry3K	test
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	<image>$ABCD$ is a rhombus. If $PB = 12$, $AB = 15$, and $m \angle ABD = 24$, Find $m\angle BDA$	24	Geometry	Geometry3K	test
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$y$.	12	Geometry	Geometry3K	test
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the value of $x$ in each diagram	68	Geometry	Geometry3K	test
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	<image>Find $m \angle RST$.	55	Geometry	Geometry3K	test
+118	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	<image>$∠6$ and $∠8$ are complementary, $m∠8 = 47$. Find the measure of $\angle 7$.	90	Geometry	Geometry3K	test
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	"<image>Find the measure of $m\angle 1$. Assume that segments that appear
+tangent are tangent."	129	Geometry	Geometry3K	test
+120	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	<image>Let $\overline{G H}$ be the median of $R S B A .$ Find $G H$	62	Geometry	Geometry3K	test
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parallelogram PQRS to find $QP$	5	Geometry	Geometry3K	test
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$WXYZ$ is inscribed in $\odot V$. Find $m \angle X$.	120	Geometry	Geometry3K	test
+123	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the height of the parallelogram given its area with 2000 square units.	40	Geometry	Geometry3K	test
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$m \angle A$ of quadrilateral ABCD	135	Geometry	Geometry3K	test
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y	10	Geometry	Geometry3K	test
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	<image>Find the measure of the altitude drawn to the hypotenuse.	4 \sqrt { 3 }	Geometry	Geometry3K	test
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the area of the shaded region. Round to the nearest tenth.	157.1	Geometry	Geometry3K	test
+128	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x. Round to the nearest tenth.	30.7	Geometry	Geometry3K	test
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$y$ in each figure.	6	Geometry	Geometry3K	test
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$m \angle S$.	34	Geometry	Geometry3K	test
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the figure, $m∠3 = 110$ and $m ∠ 12 = 55$. Find the measure of $∠13$.	55	Geometry	Geometry3K	test
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x.	3 \sqrt { 35 }	Geometry	Geometry3K	test
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EFGH is a rectangle. If $m \angle HGE = 13$, find $m\angle FGE$.	77	Geometry	Geometry3K	test
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x in the parallelogram	37	Geometry	Geometry3K	test
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the side length in isosceles triangle $DEF$.	11	Geometry	Geometry3K	test
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the length of $\widehat {JK}$. Round to the nearest hundredth.	13.74	Geometry	Geometry3K	test
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parallelogram to find $b$	11	Geometry	Geometry3K	test
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PR || KL, KN = 9, LN = 16, PM = 2 KP, find MN	12	Geometry	Geometry3K	test
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$x$. Round to the nearest tenth.	14.1	Geometry	Geometry3K	test
+140	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the area of the rhombus. 	132	Geometry	Geometry3K	test
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TX if $E X=24$ and $D E=7$	32	Geometry	Geometry3K	test
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igAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//9k=	<image>Find $m \widehat {LP}$.	150	Geometry	Geometry3K	test
+143	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	<image>Express the ratio of $\sin N$ as a decimal to the nearest hundredth.	0.92	Geometry	Geometry3K	test
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x.	1	Geometry	Geometry3K	test
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the area of the figure. Round to the nearest hundredth, if necessary.	4.8	Geometry	Geometry3K	test
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$x$.	3.5	Geometry	Geometry3K	test
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parallelogram ABCD to find $m\angle ADC$	128	Geometry	Geometry3K	test
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the measure of $\angle 3$ if $\overline{A B} \perp \overline{B C}$.	76	Geometry	Geometry3K	test
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$\triangle DEF, m \angle E=108, m \angle F=26$, and $f=20$, Find $d$ to the nearest whole number.	33	Geometry	Geometry3K	test
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$y$ so that each quadrilateral is a parallelogram.	4	Geometry	Geometry3K	test
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$m \angle 4$.	33	Geometry	Geometry3K	test
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$cos C$	\frac { 4 } { 5 }	Geometry	Geometry3K	test
+153	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	<image>In rhombus $A B C D, m \angle D A B=2, m \angle A D C$ and $C B=6$. Find $m \angle A C D$	60	Geometry	Geometry3K	test
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AB	10	Geometry	Geometry3K	test
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$x$ in the figure.	14	Geometry	Geometry3K	test
+156	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	"<image>Circle $O$ has a radius of 13 inches. Radius $\overline{O B}$ is perpendicular to chord $\overline{C D}$ which is 24 inches long.
+If $m \widehat{C D}=134,$ find $m \widehat{C B}$"	67	Geometry	Geometry3K	test
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$\odot M$, $FL=24,HJ=48$, and $m \widehat {HP}=65$. Find $FG$.	48	Geometry	Geometry3K	test
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four congruent triangles off the corners of a rectangle to make an octagon. What is the area of the octagon?	528	Geometry	Geometry3K	test
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$m\angle A$	60	Geometry	Geometry3K	test
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	<image>Use parallelogram JKLM to find $m \angle KJL$ if $J K=2 b+3$ and $J M=3 a$.	30	Geometry	Geometry3K	test
+161	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x.	\frac { 17 } { 2 } \sqrt { 3 }	Geometry	Geometry3K	test
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$XZ$.	34	Geometry	Geometry3K	test
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	<image>Find $XW$.	12	Geometry	Geometry3K	test
+164	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	"<image>Find x so that $GJ \parallel FK$. $G H=x+3.5, H J=x-8.5, F H=21, H K=7$.
+"	14.5	Geometry	Geometry3K	test
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	"<image>In $\odot P, m \angle M P L=65$ and $\overline{N P} \perp \overline{P L}$.
+Find $m \widehat{N J K}$"	155	Geometry	Geometry3K	test
+166	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square is inscribed in a circle having a radius of $6$ inches. Find the length of each side of the square.	6 \sqrt 2	Geometry	Geometry3K	test
+167	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diagonal of a rhombus is twice as long as the other diagonal. If the area of the rhombus is 169 square millimeters, what are the lengths of the diagonals?	26	Geometry	Geometry3K	test
+168	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x	9	Geometry	Geometry3K	test
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$AB=12,AC=16$, and $ED=5$, find $AE$.	15	Geometry	Geometry3K	test
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$x$ so that $\overline{BE}$ and $\overline{AD}$ are perpendicular.	10	Geometry	Geometry3K	test
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DE	9	Geometry	Geometry3K	test
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	<image>Find the area of the shaded region formed by the circle and regular polygon. Round to the nearest tenth.	76.4	Geometry	Geometry3K	test
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the figure, $m ∠ 12 = 64$. Find the measure of $ \angle 7$.	64	Geometry	Geometry3K	test
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$BC$.	9	Geometry	Geometry3K	test
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$m \angle 1$.	37.5	Geometry	Geometry3K	test
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the ratio of $\sin P$ as a decimal to the nearest hundredth.	0.88	Geometry	Geometry3K	test
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$x$. $A=357$ in$^2$. 	21	Geometry	Geometry3K	test
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$x$ so that $a ∥ b$.	14	Geometry	Geometry3K	test
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KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP//Z	<image>$\overline{GJ}$ is a diameter of $\odot K$. Find $m \widehat {GLJ}$.	180	Geometry	Geometry3K	test
+180	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	<image>Find $C F$ if $\overline{B F}$ bisects $\angle A B C$ and $\overline{A C} \| \overline{E D}, B A=6, B C=7.5$, $A C=9,$ and $D E=9$	5	Geometry	Geometry3K	test
+181	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	<image>Find $m \angle K$	100	Geometry	Geometry3K	test
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the value of the variable $y$ in the figure.	50	Geometry	Geometry3K	test
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l8Y49fQu3Yfwj8c+5afp9rpWnwWFjCsNtAgSONegFAyeONIo1jjRUjQBVVRgKB0AFOoooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFeZfF3Q/FviO1sdO0C1aexO57oLNHHuYEbQdzAkDk46dK9NooA8L0DT/i34Z0mPTdL0Cxit0JPLwFmY9Sx8zk1p/wBofG3/AKA9l/33B/8AHK9hooAzPDx1VtAs21wIuptHm4VMYViegwSOOBxWnRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/2Q==	<image>Find the value of $t$ in the parallelogram.	7	Geometry	Geometry3K	test
+184	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	<image>Find the perimeter of the triangle. Round to the nearest hundredth.	8.73	Geometry	Geometry3K	test
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segment is tangent to the circle. Find the value of $x$.	3	Geometry	Geometry3K	test
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	<image>Find the area of the shaded region. Round to the nearest tenth.	58.9	Geometry	Geometry3K	test
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	<image>Find the measure of $m \widehat{YXZ}$.	166	Geometry	Geometry3K	test
+188	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x.	14	Geometry	Geometry3K	test
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$y$.	2	Geometry	Geometry3K	test
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x.	8 \sqrt { 5 }	Geometry	Geometry3K	test
+191	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y.	48	Geometry	Geometry3K	test
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parallelogram WXYZ to find $m\angle XYZ$	105	Geometry	Geometry3K	test
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AooooAKKKKAP/2Q==	<image>Find $x$.	9.5	Geometry	Geometry3K	test
+194	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	"<image>Find the measure of $m\angle 2$. Assume that segments that appear
+tangent are tangent."	157.5	Geometry	Geometry3K	test
+195	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	<image>Find the perimeter of the parallelogram. Round to the nearest tenth if necessary.	64	Geometry	Geometry3K	test
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DEFG is a rectangle.  If $m \angle EFD = 2x - 3$ and $m \angle DFG = x + 12$,
+find $m \angle EFD$."	51	Geometry	Geometry3K	test
+197	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	<image>Find y	4 \sqrt { 2 }	Geometry	Geometry3K	test
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	"<image>Circle $O$ has a radius of 13 inches. Radius $\overline{O B}$ is perpendicular to chord $\overline{C D}$ which is 24 inches long.
+Find OX"	5	Geometry	Geometry3K	test
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the area of $▱ JKLM$.	24	Geometry	Geometry3K	test
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$m \angle 1$.	108	Geometry	Geometry3K	test
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$AB$.	4.1	Geometry	Geometry3K	test
+202	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$RS$ if $\triangle QRS$ is an equilateral triangle.	2	Geometry	Geometry3K	test
+203	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	<image>If two sides of a triangle measure 12 and 7, which of the following cannot be the perimeter of the triangle?	38	Geometry	Geometry3K	test
+204	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	<image>Find the area of the triangle. Round to the nearest hundredth.	7.51	Geometry	Geometry3K	test
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is a diameter, $AC=8$ inches, and $BC=15$ inches. Find the radius of the circle.	8.5	Geometry	Geometry3K	test
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$m \angle 1$.	70	Geometry	Geometry3K	test
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$w$ in the given parallelogram	5	Geometry	Geometry3K	test
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$x$.	\frac { 5 } { 3 }	Geometry	Geometry3K	test
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$\triangle L M N \sim \triangle Q R S, Q R=35, R S=37, S Q=12$, and $N L=5$, find the perimeter of $\triangle L M N$. 	35	Geometry	Geometry3K	test
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the measure of $\angle 7$ if $m∠4= m∠5$.	89	Geometry	Geometry3K	test
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and $\overline{XZ}$ are midsegments of $\triangle RST$. Find $ST$.	14	Geometry	Geometry3K	test
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$m∠5 = 7x - 5$ and $m∠4 = 2x + 23$, find $x$.	18	Geometry	Geometry3K	test
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the measure of $\angle 2$.	76	Geometry	Geometry3K	test
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	<image>Use parallelogram ABCD to find $m\angle ACD$	29	Geometry	Geometry3K	test
+216	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEMAW8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuU8feJr7wzpFm+lw282oXl5HawJcAlCWz1wQe3r3rq6878Wf8TX4q+EtJHzR2glv5V9MfdJ/Ff1o3aX9d3+AbJv+v6uStd/FaJTI2n+F5gvJjieYM3sCWxn61teC/F8fi3TZ5GtWs760lMF3aucmNx7+n+Brpa84+Ga/avEPjPV4v8Aj1udSMcR7Ns3ZI/76FC3a8v1QPa/n/mej0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV5Ld6tqOkfFrV9Ym8L67f262qWdrJZ2TOuOGY5PB5z0r1qqeo6tYaRbmfULuK3j9Xbk/QdT+FOKbkrA2lF3OIu/EXirxVZtp+h+HL/R/PBSW/1RRF5KnglU6s2Oldf4d0G08NaFa6TZA+VAuCx6ux5LH3Jpnh/xHZeJLe4uLFZPJhl8rdIuNxwDkD0571r05RcG4tWZMZKaUk7oKKKKkoKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoooJwMnpQAUVyt/8SfB2m3X2a516280NtIiDSAH3KAgfjXQadqdjq9ml5p13DdW7/dkicMPp9aN9Q2LVFFFABRRRQAUUVga14y0bQ28qa4866zgW1uN8hPpjt+NVCEpu0Vcmc4wV5OyN+srWfEmk6DHu1C8jjbGViHzO30Uc1znmeMvE/8Aq0Xw/p7fxN81ww+nGP0NaujeCdG0eX7T5LXd6Tua5ujvfPqM8D+dbezhD+I9ey/z2/Mx9rUn/DWnd/5b/kZX9ueKfEwxoWnjTLJul7ej5yPVV5/qPermm+AdOguBe6tLLq98est2dyj6L0x9c11lFJ12laC5V5b/AHjWHTd6j5n57fdscb8PlCL4gVQAo1aYAAcAcV2Vcd4A/wCZh/7C839K7GjE/wAViwv8Jf11CiiisDoCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8+8aXV14h8Vaf4Hs7h7eCeI3WpSxnDeSDgID23Hr9RXoNeXy38Hh746XU+rSrb2+paekdrPKdqBgVyuTwOVP5j1oWskn/AFoPaLa/rU7zT/Dmi6XYLZWel2sVuBgoIgd31z1P1rK8M+DI/C+uaxdWNyF0+/ZXSxWPasDAckHPfJ4wO3pV3XvFujeHtOe7vL2InH7uGNw0krdlVRySaTwlca3eaEl5r8UcF3OxkW3Rdvkxn7qt/tY6/Wmt2xbKxu0UyWaKCJpZpEjjUZZ3YAD6k1yN54+gmuGsvDtlNrF2OCYgREn1Y9v096uFKdT4UZ1KsKfxM7EkAEk4A71y2qePNKsrj7HYiTVL48CCzG/n3YcflmqA8La94ixJ4n1UxW55+wWJ2r9Gbv8Ar9a6nS9F03RbfydOs4rde5UfM31J5P41py0qfxPmflt9/wDl95nzVanwrlXnv93+f3HLf2X4u8Tc6rero1g3/LraHMrD0Zu3+eK39E8K6P4fQCws0WXGDM/zSN+J6fhgVs0VM68pLlWi7L+tfmVChCL5nq+7/rT5BRRRWJsFFFFAHHeAP+Zh/wCwvN/SuxrjvAH/ADMP/YXm/pXY1vif4rOfC/wl/XUKKKKwOgKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArP1fQtL161FtqthBdxA5VZVztPqD1B+lGq65pmiQedqN5FApGVVjlm+ijk1y/8Awk/iDxGSnhrSjb2p6ahfDapHqq9/1+lawoSmr9O72Mp14wduvZbl208I+C/B4+3xadZWRj5Wedi7Kf8AZZySD9Kqy+NrzV5WtvCulS3pB2m7nGyFffnGf0/GsGbwy8Pj7QbfW7+TV2ulmeUTj5BtQkBVzwM4/LpXqEUUcESxRRrHGowqIMAD2FbSjTpJP4m/u/z6eRjGVSs2vhSdu72v6dfM42HwPdarKtz4r1WW/cci1hJSBfyxn68fjXW2djaadbrb2VtFbwjokSBR+lWKKwnVnPRvTt0NqdGENUte/X7wooorM1CiiigAooooAKKKKAOO8Af8zD/2F5v6V2Ncd4A/5mH/ALC839K7Gt8T/FZz4X+Ev66hRRRWB0BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRXN6x440fSZfsySte3pOFtrQb2J9Djgfz9qy/I8ZeJ/8AXyLoGnt/yzj+a4Zfc9v0+hreNCVuaWi8/wCrswlXjflj7z8v1eyN7WvFejaCCt7eL53aCP5pD/wEdPxxWB/aPi/xP8unWg0Owb/l5uhmZh6qvb8voa29F8HaNoREtvbebddWuZzvkJ9c9vwxW9T56cPgV33f+X+dxclSp8bsuy/z/wArHL6V4E0mwn+13nmanfk7muLw7+fUA8D8cn3rqAABgcCiisp1JTd5O5rCnGCtFWON1v8A5Kd4Y/65XH/otq7KuN1v/kp3hj/rlcf+i2rsq0rfDD0/VmVH46nr+iCiiisDoCiiigAooooAKKKKACiiigDjvAH/ADMP/YXm/pXY1x3gD/mYf+wvN/SuxrfE/wAVnPhf4S/rqFFFFYHQFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVBe3kGnWM95dSCO3gQySOegUDJqevNPHeuadq3iay8IXOp2tnYKRdapLPOsYZBysIJI5Y4JHpik+yGu7NDwJ4+uvFuralZ3WmiyFvHHNACxLPG+SCfw2n8a7uvKtL1PTW+OrnS720ubW90oJutZVdAyHplTjICdK9Qubq3s4GnuZo4YUGWeRgoH4mqtdK39a2Jbs3f+tES0jOqIXdgqgZJJwBXG3Hjw31w9n4Y02bVbheDNjZCn1Y9f0+tRr4O1XXXE3ivVnljzkWFoSkQ9Mnv/P3rf2HLrUfL+f3f52MPrHNpSXN+X3/AOVy1qPj7T4rg2WjwTavfHgR2oygPu3THuM1U/sHxR4lO7XtSGnWTf8ALjYn5iPRm/8ArkewrrdP0ux0m3FvYWkVvH6RrjPuT1J9zVuj20Yfwl83q/8AJB7GU/4r+S0X+b/rQy9H8OaToMWzTrKOJj96Q/M7fVjzWpRRWEpOTvJ3ZtGKirRVkFFFFIoKKKKAOO1rn4neGgCMrDcEj22NXY14v4h8ViH4pxagjZt7CQW5x/dGRJ/6E35CvZ1YMoZTkEZBHet6yajC/b9W/wBTtxeWywcYTf8Ay8V/n2+6wtFFFYHEFFFFABRRRQAUUUUAFFFVdSvo9N0y6vpf9XbxNIffAzigcYuTUVuzmfAS7T4gGQSdWmPHbpXYV4/8LNef/hI72yuXydQBmBJ6yDJOPqCfyr2Ct8Qn7R3OvHZf/Z9X2HSya+f/AAbhRRRWBxhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAZ2valNpOh3d7b2c97PEhMVvBGztI3QDABOM9T2Fcp4X+H2nHRxeeJtNtr/Wr1zc3UlxGHKM3OwZ6ADAx9a7yihAeY654Vh0P4ieEtR0DQ/KthJJHdtZ2x2oGAAZ9owB8x5Neiahptlqtsba/tYriE87ZFzg+o9D7irVFNNpK3QUkpbnEN4M1LQpGn8Kaq8CE7msbo74mPse38/epIPHb6fOtp4o0ybTJjwJ1BeFz7EdP1rs6iuLeC7gaC4hjmicYZJFDA/UGt/bqf8AFV/Pr/wfmYewcP4Tt5br7unyEtbu3vbdZ7WeOeFvuvGwYH8RU1cbc+AxZztd+GdRn0m4PJjBLwufdT/9ce1RL4v1fQXEPirSWWLOBf2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$CD$ if $AC=x-3$, $BE=20, AB=16,$ and $CD=x+5$	40	Geometry	Geometry3K	test
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VJ=3$, and $ZT=18$. Find $SV$.	9	Geometry	Geometry3K	test
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$\odot O, \overline{E C}$ and $\overline{A B}$ are diameters, and $\angle B O D \cong \angle D O E \cong \angle E O F \cong \angle F O A$
+Find $m\widehat{A E}$"	90	Geometry	Geometry3K	test
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$\triangle PQR$, $ZQ=3a-11$, $ZP=a+5$, $PY=2 c-1$, $YR=4 c-11$, $m \angle PRZ=4 b-17$, $m \angle ZRQ=3 b-4$, $m \angle QYR=7 b+6$, and $m \angle PXR=2 a+10$.  If $\overline{RZ}$ is an angle bisector, find $m∠PRZ$.	35	Geometry	Geometry3K	test
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segments are parallel?	A D and B E	Geometry	Geometry3K	test
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parallelogram MNPR to find $m \angle RMN$	109	Geometry	Geometry3K	test
+222	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	<image>If WXYZ is a kite, find WP	\sqrt { 20 }	Geometry	Geometry3K	test
+223	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x.	17	Geometry	Geometry3K	test
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the figure below, $∠ABC$ is intersected by parallel lines $l$ and $m$. What is the measure of $∠ABC$? Express your answer in degrees.	71	Geometry	Geometry3K	test
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z	6	Geometry	Geometry3K	test
+226	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DB = 24, AE = 3, and EC = 18, find AD	4	Geometry	Geometry3K	test
+227	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	<image>Find the measure of $m∠1$.	109	Geometry	Geometry3K	test
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MY6bhkn+LpXbUUAeefFbwZrPjW10my0uW3jhinaS4MzkAcAK2ADnHzfnXReGvCq6E0l3d6hdanqs6BZ7y5c5IHO1F6IuewroaKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/2Q==	<image>In the figure, $m∠1 = 50$ and $m∠3 = 60$. Find the measure of $\angle 6$.	70	Geometry	Geometry3K	test
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$x$.	35	Geometry	Geometry3K	test
+230	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	<image>Find the perimeter of the parallelogram. Round to the nearest tenth if necessary.	50	Geometry	Geometry3K	test
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parallelogram ABCD to find $m\angle DAC$	72	Geometry	Geometry3K	test
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the figure, $m∠1 = 123$. Find the measure of $\angle 14$.	57	Geometry	Geometry3K	test
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parallelogram $JKLM$ to find $m \angle JKL$.	80	Geometry	Geometry3K	test
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HRvEml61NNb2V0ss1uB5gHfI6j1GeMj/CuE8e6hqPiDwffX1vGbbRIDGUMi/vLsl1UED+FBnI7n+XTyaD9p0DSb3RxHa6lZ26NbMowrAqCY29VP8AM59auS/cxv3f6HTCjCGJlTquzaXond7/ANaeqsdXRWZoWtRa3YmVUaG4iby7i3f70Mg6g/0NWtQ1C00qxlvL6dILeIZZ3P8AnJ9qws72FUi6bcZ6WJ3dIo2kkdURQSzMcAAdya881DxBqnja+l0bws7Qaeh23eqEEDHdU/zk+w5MX/E2+JlxgedpvhZG+kl3g/y/Qe56egafp1ppVjFZWMCQW8YwqIP19z710WjR31l+X/BOO8q+2kfxfp5FLw94b07wzpwtNPixnmSVuXkPqx/p0Fa9FFc8pOTuzpjFRVo7BRRRSGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBFc20N5ay21zEssMqlHRhkMD1FeTvpieEPE1ppOuTTz+FpZWks97fuo5CRgSeoH5c5/vV67WfrejWev6VNp19HuhlHBH3kbswPYitqVTl92Wz/q5nJTjJVKTtJbP9DF+IqB/h9qqqBgRoRj2dT/Stfw2/meFtIf+9ZQn/wAcFeY3uq3uh+HdY8Ga+5aRLZm0+6PSaMchfrxx9COwz0EXjW10DwToVvFGbzVp7KFLezj5YnaAC2Og4+p7dyNpUZezUVrr+hyxrx9q5y0019blzxnd2/ha5h8SQTxxXTERTWpOPtiemP7y9Q3bv6Vn6foGqeN72LWfFKNb6ah3WmlgkAjsz/5yfYcG54e8G3VzqI8Q+LJBd6o2DFbnmO2HYAdCR+QPPJ5ruahzVJWhq+/+X+Z0SlPEqPtdlsuvz9OiGxxpFGscaKiKAqqowAB2Ap1FFcxsFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBz3jDwrbeK9Ga1k2pdR5a2mI+43of9k9D/AIgVR8GeBLTwvAtxOVutVZcPcHkIMY2pnoMcZ6n2HFdfRWirTUOS+hk6MHP2jWoUUUVmahRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf//Z	<image>Refer to the figure at the right. Find y.	6.75	Geometry	Geometry3K	test
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	<image>Find the area of the figure. Round to the nearest tenth if necessary.	95	Geometry	Geometry3K	test
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$x$.	6	Geometry	Geometry3K	test
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	<image>For the pair of similar figures, use the given areas to find $x$.	16	Geometry	Geometry3K	test
+238	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x.	8	Geometry	Geometry3K	test
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$a,$ if $F G=18, G H=42,$ and $F K=15$	57	Geometry	Geometry3K	test
+240	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FUYH6CrFFAHJaN4XvdO+IfiLxBNLbtaalHCsKIzGRSiAHcCMDkdiaPCvhe90PxR4p1O5lt3g1a4jlgWJmLKF3Z3ZAAPzDoTXW0UAcl4K8L3vhu68Qy3ktu66lqUl3CIWY7UY8BsgYP0z9a62iigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==	<image>Find the area of the figure. Round to the nearest tenth if necessary.	22.1	Geometry	Geometry3K	test
+241	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PT	\frac { 20 } { 3 }	Geometry	Geometry3K	test
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$GD$.	14	Geometry	Geometry3K	test
+243	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	<image>Find the area of the regular polygon figure. Round to the nearest tenth.	101.8	Geometry	Geometry3K	test
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x	120	Geometry	Geometry3K	test
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y.	45	Geometry	Geometry3K	test
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	<image>Find the area of the rhombus.	168	Geometry	Geometry3K	test
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0VsEbgDg9RXk/x8dx4X09Bna1z835V5E9rHsw3Jvgn4ajsfDza5Om67vWO126hB/ia9Urn/AyRp4H0dY8bfsy9K6Ctp/FbsZw1V+5ynjvwPB4306C1luTbPDJvWVU3H6VuaJpzaRotpp7Tmc28Yj8wjBbFZ2r+NNC0PVIdNv7zZdzY2RhSxOTgdK6AHIB9ahbaFPfUKKKKACiiigAooooAKKKKACiiigAooooAKKKKAAkAZPSvAfEl1L8TPijb6NasW0yzfaxHTAPzN+PSve5Y0mieKQZR1KsM4yDWRo3hLQfD9xLcaVpsVtNKMO6kkkfiTQviTfQd/daRah0LSYYUiTTbTaihRmFe34VzXxE0Gxm8B6t5FjbxypFvVkiUEYPqBXa1Fc20N5bS21xGJIZVKOh6EHqKUk2mEXZo84+B199p8DG3Jybadl/A816ZWXovhzSPDsMsWkWKWscrbnVCTk+vJNalXJ3dyUrBRRRUjCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorjPHnjhvCqWtnY2v2zVbxtsEPb6mk2NK52dFeQ3Xjb4h+Go01HxDodq2mlhv8AI+8gPrgn9a9S0nU7fWdKttQtG3QXCB1NVbS4i5RRRSAKKKKACiiigAooooAKKKKACiiigAooooAK474meGZPE/g64trdd11CfOiHqR2rsaKUldWGnZ3PFfhp8TLDSdKXw/4hkNnNakpHJIMDHofQiuv1z4teFdKs3kt9Qjvp8fJFbndk+57Vqa98PvDXiOYz3+nJ556yxHYx+uOtZ2nfCXwfp06zLpzTspyPPkLAfhTbctxJJbHCeAdA1Pxt4yk8Y63EUtUfdCrDhiOgHsK9zpkUUcMSxRIqRqMKqjAA+lPp6WSWwtb3YUUUUhhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVxGm+PJbj4gXfha/sEtnjBaGUSE+YPpj0rt68U+M7f2F4h0fxBp86R6ioKle5A6HFK9pK+w0rp23O31Xx1LF4xtvDej2K3103Ny5k2rCPfANdoM4GetcP8NfDMelaKNWnlW51LUh500+c9ecA13FU1bR7k3vqtgorzrWvjFomiavcadLY30kkDbGZEGCfbNUP+F76B/0DdR/74X/ABqU76oppo9Uoryv/he+gf8AQN1H/vhf8a6jwf4/03xnLcR2VvcwvAAzCZcAg+hFVa4nodZXLal4Kt9T8Z2HiSW7cPZrhINgKn3zmupqNpImYwmRd5H3dwz+VLrcPI4f4o67pkPgrULI3MUl1cr5UUKMGYtn0FaXw50650vwJpltdqUmEe4qeq55xXFeKPhLaaXbXWv6De3EWoW5a4Cy4cE9Tjjiuz+HXiWbxT4Rt765A+0qTFKQMAkd6IbPvoEunbU6yiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAM3XdbtPD2j3GpXrhYoVzjux7AV5PpnhG7+IGn6v4m1tWEt3Ey6dCf+Wajoa9jurK1vovKu7aG4jznZLGHGfoaljjSKNY40VEUYVVGAB7Clbcd7WsebfBnW3vPDU2j3Lf6VpshjIPXb2r0uq1vp1laSyS21nbwySffeOJVLfUgc1Zqm76kpWKk2l6fcSGSawtZJD1Z4VJP4kUz+xdK/6Bll/34X/Cr1FIZR/sXSv+gZZf9+F/wqe3s7W0BFtbQwhuvlxhc/lU9FABXj/je4m8IfFHT/FE0Usmmyx+VKyAkL2NewVDdWdtfW7QXcEc8LdUkUMD+BpapproPo0+p5v4p+LHhyXw5cwaXcteXlzGY4okQ5yRjmtr4W6FcaD4ItYLtClxMxmdT1Xd0FbVl4Q8PafcC4tdHs4pQchxGCR9M9K2qpWV/MT1t5BRRRSAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/Z	<image>Find $AB$ if $\triangle ABC$ is an isosceles triangle with $\overline{AB} \cong \overline{BC}$. 	7	Geometry	Geometry3K	test
+248	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD6APwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorj/EWseN7LVmh0HwvbajYhFInkvEjJbuMFgeKAOworzjRfHPiu48c2nhvWPDdtZvLE08rRXQlMUYBwx2kgZYAc+tV5PiB4r1q+1JvCHhy3vdM06ZoXuLiXDTMvUIMj8OvUeuKAPT6KwPB3iq18ZeHIdWtonh3MY5YXOTG46jPccgg+h7Vv0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRXnnxWtruDTbLWbK7ubZrWXy5nt5CreW3fgjoR/49WlKHPNRva5nWqezg52vY9Dorz+LQPG9tDHLpXjCG9hdQ6fbIfvA8jnDGn/2v8RNO/wCPrw/YahGvVrWbax/AnP8A47V+wv8ADJP8PzM/rFvii1+P5XO9orgv+FmGy/5DPhnV7D1by96/mdtaNn8SvCl7gDVFhY/wzxsmPxIx+tJ4eqteX9RrE0npzfp+Z1lFU7PVtO1Af6Ff2tz/ANcZlf8AkauVk01ubJp6oKKKKQwooooAKpavqdvouj3mp3RxBaxNK+OpAGcD3PSrteafG++li8FQabA2JdSvY7faO6jLfzC/nQBd+F2n3E2k3XirUwDqmuym4YnkpD0jQe2OR7EelO8TXd54B0YQ+EPCbXi3LSzSmAsVgfC/MygEtn0BH3a7WztIrCwt7KAbYYIlijHoqjA/QV5R4a+KUfhuzv8ASPHVzdrrNnO4DNAW85P4du0Y9cE4BBBzQBu/BmHT4fh7B9gvDdNJO73JK7Skpxlcew2/Xr3r0GvOfg7p11beHdR1K5tXtV1S/kuoIXGCsZAwce/P1GDXo1ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVQ1rTI9Z0S806XG24iZAT/CccH8Dg/hV+imm07oTSaszjvhrqcl74UWyuci702RrSVT1G37v6cf8Brsa8/tv+Kb+LU8H3bPXYfNX085c5/H73/fYr0Cta6XPzLZ6mOHb5OV7x0/r5BWdeaBo+o5N5pdnOT/ABSQKT+eM1nax478L6BfCx1PWbeC64zFyxXPTdtB2/jitqG+tLixW+huYXtGTzBOrgoVxndnpisk2tjZxT0Zy158L/Ct1kpYyWz/AN6CZh+hJH6VT/4V3f2X/IH8X6raqOkcreYv5AgfpWzpvj/wrrGpjTrDW7aa7YkLGCRvPopIAb8CayvF2u663ivS/C3h+4trG5u4HuZLy4j8zaq5G1FPBPBrVYiqtL/fr+Zi8NSevLb00/Ij+xfEnTuYtT0vU0HRZo9jH8gP50f8Jb4x0/jU/Bkkw7vZTb/0G7+dXfAniHU9W/tfTNaMEmo6RdfZ5Li3GEmBGQcdjwciuwp+2T+KK/L8hewa+GbX4/mcLH8VdESQRajaalp8ncT2/A/I5/Stuz8b+GL/AB5Gt2gJ6CV/KP5NitySKOaMpLGroeqsMg1iXngrw1f58/RbPJ6mOPyyfxXBovRe6a+dw5a62afysbcU0U8YkhlSRD0ZGBH5in1w0vwp0ESGWwuNQ0+Tsbe46fmCf1qP/hD/ABbp/Ol+NJ5AOiXsW8fmS38qPZ03tP71/wAOHtKq+KH3P/Ox3tRyW8Mzo8sMbshypZQSv09K4b7V8StO4ksNJ1RB1aJ9jH8yo/Sj/hYWp2X/ACGPB+qW6j70kA81fzwB+tH1eT+Fp/MPrMF8Sa9UzvaK4y0+KXhW5O2S8ltX6bZ4GGPxGR+tdDZ+ItF1DAtNVspmPRUnUt+Wc1EqVSPxJmka1OfwyRpUUUVmaBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBxPxNsZToVtrVoP9L0m4W4Q/7ORuH57T+FdRb6rBc6HHq0eTbvbi4Hrt25x9asXdrFfWU9pOu6GeNo3HqpGD/OuC8CvO/hrW/C05zeaa8tuvbKPu2n8934Yrf46P8Ah/J/8E5/gr+Ul+K/4H5HAeC9b8DW3h+7vPGE1vcatrU8skpktzM8cZJXqFO3kMfXke1bPiqC28MfA6LT9C1eS/stQuliiuSw+45LMox0GVII9yDWj8FNL0mf4d3JuLS3kkluZY7vzUBJAAwrZ7YI49zXn6xSP8ELqWMs9lZ+IxJCSScRbQvHtl/zJrA6DvPij4P0nQfh3BfaRZxWd5pEsLQ3MKBJD8wXLMOSckNk9xXaar4Y0fx1pGm3WpwOswiWaGeCQpJEWUE4YdvrmsH4z39v/wAKuuQkqsL2WBYSpzv+cPx68KTXdaTbvZ6NY20gw8NvHGw9woFAFTw74a0vwrpn2DSrcxRFi7szFmkY9WYnqa16KKACiiigAooooAKKKKAKt3plhqAxeWNtcj/ptEr/AMxXP3nw38KXuS2lJEx/igdkx+AOP0rqqKuNScfhdiJUoT+JJnBf8KxSz50bxHq+nnsol3KPwG2j+xfiFp3/AB5+I7K/jXot3DtJ/EAn9a72itPrE38Vn6pGX1amvhuvRs4L/hIvHun83/hSC8QfxWU+Cfwyx/SlHxRs7UhdX0TVtOfv5kGVH4nB/Su8pCAQQRkHsaPaU38UPuuv8w9lUXwz+9J/5HNWfxC8K32BHrEEbHtOGix+LACt+1vrS9TfaXUFwvrFIHH6Vn3nhbQdQz9q0eykY9W8lQ35jmsG5+FXhiZ99vDdWT9mt7g5H/fWaLUX1a/H/IL110T+9f5na0VwX/CCa7Y86T4z1CNR92K5Hmr/ADx+lGz4madyJNI1VfQjYx/9BFHsYv4Zr8g9tJfFB/LU72iuC/4TbxLYcar4LvMD70lo/mD8gCP1qa3+K3ht5PLu/tti46rcW54/75zS+r1Oiv6ah9apbN29dPzO3orM0rxDpGt7hpuoQXLKNzIjfMB6kHmtOsmmnZm8ZKSumFFFFIYUUUUAFef6p/xTnxV0/UR8tprUX2WY9vMGAp/9A/WvQK5P4jaS2qeD7iSHP2myIuoiOoK9f/Hc/jitqDSnZ7PQwxEW4cy3Wv3GTqnwi0m/1O8u7TVdV0yG+Obu1spgkUvrxjvzwcjnpXTxeE9Fh8Kf8I0lmP7LMRiMRJyQTknPXdnnPrVjw7qy654esdSXGZ4gXA7OOGH4EGtOspJxdmbRkpJNdTzvTPg/pNjqlndXWq6pqMFiwa0tLuYNFFjpxjoPQYFeiUUUhhRRRQAUUUUAFFFFABRRRQAUUUUAFMlljgheaVwkcalmY9AByTT6wPHF19j8Ca9PnBWwmCn3KED9SKAKn/CyvBn/AEMdj/33/wDWrX1HxFo+kabBqOoahBb2c5URTSNhXLAsMfUAmvHfCHif4ZWeh6RpuqaXaSXfkos17caajJ5h5YFyMnBOM9OOuK3vi9eaZZy+DoL4RjShf+fKgTcjRRhflCjqCGxj3oA7fTvHPhjVr+KxsNbtLi6lyEiRslsAk4/AGuZ1LWvFuu+MNa0jw5f2GmQ6NHGXa5i3tcO67h1+6vbI+vOeH+DfEXw91vWhDomk2VjqsQLRq+npBKRjkoQPQnjOcZ961/Efw68PeJ9Q+330M8d2yCOSW2mMZlQfwvjg/wA+nPFAFvwP4ik8VeD7DWJoVhmnVlkRPu7lYqSPYlc/jXQ1V07TrTSNOg0+wgWC1gTZHGvRR/X696tUAFefeLdbm8Q6g3hPw/FFcXLZF5duoZLZehGfX37dBz0l8S+Jb7VtUbwt4WbdeNxd3gPy2y9wD6+/boOenR+GvDVj4Y0tbOzXc7fNNMw+aVvU/wBB2roilSXPLfov1Zyzk6zcIbdX+iDw14ZsPC+lrZ2S5Y4M0zD5pW9T7eg7Vs0UVhKTk7vc6IxUVyx2CiiikUFFFFABSMquhRgGVhgg9CKWigDgfh8zaNq2u+FJSf8AQ5zPbZPJibH/ANifqxrvq8/8Yf8AFP8AjfQfEq/LbzN9huz2wfuk/mT/AMAFegVvX95qp3/Pqc+H91On/K/w6BRRRWB0BRRRQAUUUUAFFFFABRRRQAUUUUAFYni++0rTvCt/da5btcaYiqJ4lXcWBYAcZHcituq2o6fa6rp1xYXsImtbhDHJGe4P8vrQBwvjpNEl+Ct1JbQQxacbOKWzQKBsJKlMeh5/U1X0bUNBWw8A6f4gsjPq8tkj2Eske4RnavUk8Hhex5xRB8FtGSSGG51jWbvS4JPMi06W4HlA57gDp9MH3rp/FfgjSfF1hbW14JbeS0bdaz2zBHhPHTjGOBx7CgDkPiCkS/FXwHJaADUGuHExT7xhBXr7YMn616nXGeGvhvpvh7WDrM9/f6rquwxrc30u8xjp8v4cck/hmuzoAK4PxL4lvtW1RvC3hZt143F3eA/LbL3GfX37dBz0PEviW+1bVG8LeFm3XjcXd4D8tsvcA+vv26Dnp0fhrw1Y+GNLWzs13O3zTTsPmlb1P9B2rojFUlzz36L9Wc0pOs+SG3V/og8NeGrHwxpa2dmu52+aadh80rep/oO1bNFFYSk5O73N4xUVyx2CiiikUFFFFABRRRQAUUUUAYPjTRv7e8J39kq7pvL8yH13ryAPrjH40zwPrP8AbvhGwu2bdMqeTN6714JP14P410Nef+FP+Ke8fa54db5be6P260HQc/eA/PH/AACt4e9Sce2v+Zzz9yrGXfT/ACPQKKKKwOgKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuD8S+Jb7VtUbwt4WbdeNxd3gPy2y9xn19+3Qc9DxL4lvtW1RvC3hZt143F3eA/LbL3GfX37dBz06Pw14asfDGlrZ2a7nb5pp2HzSt6n+g7V0RiqS5579F+rOWUnWfJDbq/0QeGvDVj4Y0tbOzXc7fNNOw+aVvU/0HatmiisJScnd7nRGKiuWOwUUUUigooooAKKKKACiiigAooooAK4H4iI2k3+ieK4VO6wuBFcbepib/LD/gVd9Wdr+lJregX2mvj/AEiIqpPZuqn8CAfwrSjNQmm9jKvBzptLfp6l9HWWNZEYMjAMrDoQe9Orkfhvqr6j4Rht58i6sGNpKp6jb93/AMdwPwNddSqQcJOL6FU5qcFJdQoooqCwooooAKKKKACiiigAooooAKKKKACuD8S+Jb7VtUbwt4WbdeNxd3gPy2y9xn19+3Qc9DxL4lvtW1RvC3hZt143F3eA/LbL3GfX37dBz06Pw14asfDGlrZ2a7nb5pp2HzSt6n+g7V0RiqS5579F+rOWUnWfJDbq/wBEHhrw1Y+GNLWzs13O3zTTsPmlb1P9B2rZoorCUnJ3e50RiorljsFFFFIoKKKKACiiigAooooAKKKKACiiigAooooA8/sP+Kc+LF7ZH5bTXIftEXp5q5J/9nP4ivQK4f4m2ksek2WvWg/0rSLlZgfVCQCPzC/hmuxsbuLULC3vIDmGeNZEPsRkVvV96MZ/J/L/AIBz0fcnKn816P8A4JPRRRWB0BRRRQAUUUUAFFFFABRRRQAVwfiXxLfatqjeFvCzbrxuLu8B+W2XuM+vv26DnoeJfEt9q2qN4W8LNuvW4u7wH5bZe4z6+/boOenR+GvDVj4Y0tbOzXc7fNNOw+aVvU/0HauiMVSXPPfov1ZzSk6r5IbdX+iDw14asfDGlrZ2a7nb5pp2HzSt6n+g7Vs0UVhKTk7vc3jFRXLHYKKKKRQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAV76zi1HT7iynGYriNo3HsRiuP+GV5Kuj3mhXZ/0rSLloGH+wSSD+YYfQCu4rz++/4pz4sWl59201yHyJPTzlwB/7IP8AgRrel70ZQ+a+X/AOet7k41Pk/R/8E9AooorA6AooooAKKKKACiiigArg/EviW+1bVG8LeFm3XrcXd4D8tsvcZ9fft0HPQ8S+Jb7VtUbwt4Wbdetxd3gPy2y9+fX37dBz06Pw14asfDGlrZ2a7nb5pp2HzSt6n+g7V0RiqS5579F+rOaUnVfJDbq/0QeGvDVj4Y0tbOzXc7fNNOw+aVvU/wBB2rZoorCUnJ3e5vGKiuWOxhXvizTdP8V2Ph2585L2+jMkDlP3bYzxuz1+U8e49aLHxZpmpeJr3QbPzprmxXNzIiZijP8AdLZ+97ex9DXnXx1v7a1j0N7SZ11+1nNzb+UMtHEBlmPoMqpH+6feuz+Gmkadpfgiwl09zO19Gt1cXLfflkYZOfoeMdseuaRR19FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVyHxJ0t9Q8JS3NvkXWnuLuJh1G3736ZP4CuvpskaSxtHIoZHBVlPQg9RV05uElJdCKkFODi+pQ0HVE1vQrLUo8YuIg5A7N0Yfgcj8K0a4H4dSPpV5rXhWdiW0+4MkG7qYm6f0P8AwOu+p1oKE2lsTQm5003v19QooorM1CiiigArg/EviW+1bVG8LeFm3XrcXd4D8tsvfn19+3Qc9DxL4lvtV1RvC3hZt163F3eA/LbL359fft0HPTo/DXhqx8MaWtnZrudvmmnYfNK3qf6DtXRGKpLnnv0X6s5pSdV8kNur/RB4a8NWPhjS1s7Ndzt8007D5pW9T/Qdq2aKKwlJyd3ubxiorljsFFFFIo4zS/h/DDqut6rrV9/at9qqNAzmHy1hgIwY0G5u3Gc9h75v+B/C83g7w4ujy6kb+OOV3hcw+XsVuduNxzzuOfeukooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8/8AFP8AxT3xA0PxCvy213/oN2eg5+6T+ef+AV6BXO+OdG/tzwhf2qLumRPOh9d68gD6jI/GpPBus/294TsL5m3TGPy5vXevB/PGfxrefvUlLtp/kc8Pcqyj31/zN6iiisDoCuD8S+Jb7VdUbwt4Wbdetxd3gPy2y9+f73v26DnoeJfEt9quqN4W8LNuvW4u7wH5bZe/P9737dBz06Pw14asfC+lrZ2a7nb5pp2HzSt6n+g7V0RiqS5579F+rOaUnVfJDbq/0QeGvDVj4X0tbOzXc7fNNOw+aVvU/wBB2rZoorCUnJ3e5vGKiuWOwUUUUigooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvP/B3/ABT/AI117wy3ywSN9ttB22nGQPwIH/ATXoFcB8QFOjazoXiuIHFpP9nucDkxNn/FvxYVvQ969Pv+fQ58R7qVT+V/h1O/rg/EviW+1XVG8LeFm3XrcXd4D8tsvfn19+3Qc9E8R+J7zWNR/wCEY8KOHu3H+lXqn5LZO+CO/v26Dnp0nhrw1Y+F9LW0s13O3zTTsPmlb1P9B2pxiqS5p79F+rFKTrPkht1f6IPDXhqx8L6WtpZrudvmmnYfNK3qf6DtWzRRWEpOTu9zeMVFcsdgooopFBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWZ4h0iPXtAvdMkIX7RGVViM7WHKn8CAa06Kabi7oUoqSaZi+GfDNj4X0tbOzXLnBmmYfNK3qfb0HatqiiiUnJ3e4oxUVyx2CiiikUFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//Z	<image>Find x. Round the side measure to the nearest tenth.	69.8	Geometry	Geometry3K	test
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$J$ has a radius of $10$ units, $\odot K$ has a radius of $8$ units, and $BC=5.4$ units. Find $JK$.	12.6	Geometry	Geometry3K	test
+250	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	"<image>The perimeter of this polygon is 60 centimeters. Find the length of each side of the polygon.
+"	12	Geometry	Geometry3K	test
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$XN=6,XM=2$, and $XY=10$, find $NZ$.	24	Geometry	Geometry3K	test
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$x$ 	1	Geometry	Geometry3K	test
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BC	6	Geometry	Geometry3K	test
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$x$.	30	Geometry	Geometry3K	test
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	<image>Find $\widehat{\mathrm{WN}}$ if $\triangle \mathrm{IWN}$ is equilateral and $W N=5$	\frac { 5 } { 3 } \pi	Geometry	Geometry3K	test
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x.	4 \sqrt { 15 }	Geometry	Geometry3K	test
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x.	4 \sqrt { 2 }	Geometry	Geometry3K	test
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	<image>Find the value of the variable $x$ in the figure.	54	Geometry	Geometry3K	test
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area $A$ of the shaded region is given. Find $x$. $A = 66$ cm$^2$ .	13.0	Geometry	Geometry3K	test
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	<image>Find the value of x.	163	Geometry	Geometry3K	test
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\cong \overline{KJ}$. Find $x$.	55	Geometry	Geometry3K	test
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regular hexagon UVWXYZ, each side is 12 centimeters long. Find $W Y$.	12 \sqrt { 3 }	Geometry	Geometry3K	test
+263	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$\angle 5$	50	Geometry	Geometry3K	test
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the figure, $m ∠1 = 58 $, $m ∠2 = 47 $, and $m ∠3 = 26 $. Find the measure of $∠9$.	49	Geometry	Geometry3K	test
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	<image>Find $m \widehat {QTS}$.	248	Geometry	Geometry3K	test
+266	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCABtAOgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACigkAEk4A71xlr4/Vke7vNJu4tKaR1hv4lMiMqkjcwHK9PetIUpTvyoidSMPiZ2dFVNP1Sx1W3E9hdxXEfrG2cfUdvxq3UNNOzKTTV0FFFFIYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVheJfETeH47EQ6dNqFze3HkQwQuqsTtLZy3HRaAN2isjQtV1DVEmN/odxpZjICCaVH8zOc42k4x/WovE3iFvD9tZ+RYte3d7crbW8AkEYZyCeWPAGAaANyisu112G51ybRmhljvYLaO5lzgoA5IwDnJIIPatSgDnPGt9Nb6H9htD/AKbqUgtIAO27hj+Azz24rZ06wh0zTbexgH7qCMRrx1wOp9z1rlJGvdZ8bzXtlFDPBoo8hElcqryuP3hUgHBAwORW/Fr9sJFhv45dPnPAS6ACsf8AZcZU/QHPtW9ROMFBer+f/AJo0p1G6kVfp56eW+/6GT4j8M6PDa3GrW8c1jfRrlJbB/Kd2PAXA4OTgdKSOXxfosam5hg1u3AG5of3U6+vH3Wx7cmtS9P9oa9Z2KnMNqPtk+D1PIiU/jub/gArZpe2lZKWvr/VyqmHhGKcdJPXT8Lrbz+aMPS/FukapL9nE7W14OGtbpfKkB9MHr+Ga3KoapommazD5Wo2UNwuMAsvzL9GHI/CsP8A4R7W9GO7QdYMsA6WWo5kT6K4+ZfpRy05fC7ev+f/AAPmY81SPxK/p/l/wfkdXRXLR+MlspVg8Q6dcaVITgTMPMgY+zr/AFrpLe5gu4Fntpo5onGVeNgyn8RUTpyhui4VIz2ZKTgE4z7VxGm+KtW1H4ippU+m3Wm2A0+SYRXIj3ysHUBvlJwACRjPeu3rjrj/AJLDZf8AYFl/9GrUR+JfP8mafZfy/NBfy+JdZ8U3+naZqR0eysIY28/7IspuJHBOMvxtAAzjn3rR8Fa5ceIvC1tf3aItyWeKXyx8rMjFSR7HGapa/qWo6tqknhjQX8icRq1/fkcWsbdAo7yMM49Otb+j6TaaHpNtplimy3t02oCck+pJ7knJP1oWwnv/AF/XmcTd+OVX4gz2L6jd2+m2NuC8MWmSSGeUswYMfLLBRgYK4B9TWz4A8VnxX4eS5n4vUZhMFgeNAN7BdpYYPA5wTjviobL/AJKxrX/YKt//AEN6T4Wf8k807/fn/wDRr04/Dr/WrG+vqvyOyooopCCiiigAooooAKKKKACiiigArmPFPh++1zU9Gks9UXT/ALHJJIzhQ0h3Jt+QEEZwTyema6eud8S+G59Xu9O1LTr8WOqaezmCZovMRlcYZWXIyCPfigaKPha/1S28Tax4b1O+bUPskcVxb3ToFdkfOVbbgZBHWs/4i6JYahrHhaW5t/MaXU0t5DvYZj2uccH179a3/DfhyfSbq/1LUr4X2q37L50yx+WiqowqKuTgD681Y1/Qm1uXSXW58j7BfJd/c3b9oI29RjOevNPrG/l/X3C6St2f5f5nKad4d0m3+L18UtsPHp8NzF+8b5XLspPXntx0rs9e1VNF0O71B+TDGSi/3nPCj8SRWdP4cu/+E2j8Q2mpLDG1sttcWzQb/MVWLDDZG05PoelVtb/4nXi3TNFGTb2n+n3focHEan8ecelaUYqTXNsr3+8yrScU7bu1vu/pml4V0p9I8P28E5JupMzXDHq0j8tn+X4VrSxRzxtHLGskbDDK4yCPcU+iolJyk5PqaQjyJJdCnYaVZaWJRZW6wrKQWVSccDAAHYew4q5RRUlylKTvJ3YUUUUEjZI0ljaORFdGGGVhkEe4rm7jwXaRTNc6JdT6PdNyTbHMTH/ajPBH0xXTUVcKkofCyJ04z+JHKf2t4k0TjVtMGpWw/wCXvTh84Hq0Z/pxVvS73w5r2rJq1lNHLqUUDW/LssiIWyQYzjuOuPxroKyNV8MaRrLeZd2i/aB924i+SVfT5hz+dXzU5fErPuv8v8rEctSPwu67P/P/ADuU77wJ4d1LU7jUbmznN3cEGWSO9nj3YGBwrgdB6VraXpVno1kLOxSRIAxYCSZ5Dk9fmck/rWCNP8U6Hj+z7+PWLVf+Xe+OyYD0Eg4J/wB4VPaeNNPa4W01SKfSbw9Irxdqt/uv90ij2Mre5qvL/LcPbK/v6Pz/AM9jYj0qyj1abVEhxezRLDJLuPzIpJAxnHUntVfRvD2l+H1nTTLdoEmfe6ec7qDkn5QxIXkngYrTVldQykMpGQQcg0tYmwUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUARzzR21vJPKwWONS7sewAyTXN+C4ZLi1vNeuEK3GrTGYA9ViHEa/lz+NHjSWS6t7Lw/buVn1WYRuVPKQr80jflx+NdLDEkEMcMShY41Cqo6ADgCtvgpecvyX/B/Ix+Or5R/N/5L8x9FFFYmwUUUUAFFFFABRRRQAUUUUAFQXdna39u0F3bxTxN1SRAw/Wp6KE7aoGr6M5VvCEumsZfDeqT6cc5NtJ+9gb/AICeV+opB4n1TSML4j0d0jHW9scyw/Uj7yj866uitvbc38RX/P7/APO5j7Hl/hu35fd/lYp6dqthq0Hn2F3FcR9zG2SPqOo/GrlYGo+D9Jvrj7XDG9he8kXNm3lPn1OOD+Iqnu8W6H95YdetB3XENwB9Put/M0ezhL4H8n/nt+Qe0nH4181/lv8AmdXRWFpni7SNSmFsZntLzobW7XypAfTB6/hmt2s5QlB2krGkZxmrxdwoooqSgooooAKKKKACiiigAoopGUMpU5wRjg4oA5XQv+J14r1TXGybe2/0C0z0+XmRh9W4zXV1yv8Awrjwn/0Cv/JiX/4qj/hXHhP/AKBX/kxL/wDFV01HRk73f3L/ADOWCrxVuVfe/wD5E6qiuV/4Vx4T/wCgV/5MS/8AxVH/AArjwn/0Cv8AyYl/+KqOWj/M/uX/AMkXzV/5V97/APkTqqK5X/hXHhP/AKBX/kxL/wDFUf8ACuPCf/QK/wDJiX/4qjlo/wAz+5f/ACQc1f8AlX3v/wCROqorlf8AhXHhP/oFf+TEv/xVH/CuPCf/AECv/JiX/wCKo5aP8z+5f/JBzV/5V97/APkTqqK5X/hXHhP/AKBX/kxL/wDFUf8ACuPCf/QK/wDJiX/4qjlo/wAz+5f/ACQc1f8AlX3v/wCROqorlf8AhXHhP/oFf+TEv/xVH/CuPCf/AECv/JiX/wCKo5aP8z+5f/JBzV/5V97/APkTqqK5X/hXHhP/AKBX/kxL/wDFUf8ACuPCf/QK/wDJiX/4qjlo/wAz+5f/ACQc1f8AlX3v/wCROqorlf8AhXHhP/oFf+TEv/xVH/CuPCf/AECv/JiX/wCKo5aP8z+5f/JBzV/5V97/APkTqqK5X/hXHhP/AKBX/kxL/wDFUf8ACuPCf/QK/wDJiX/4qjlo/wAz+5f/ACQc1f8AlX3v/wCRNzU9G07WIfK1CzhuF7F15X6HqPwrC/4RzWNH+bw/rDNCOljqGZI/or/eWl/4Vx4T/wCgV/5MS/8AxVH/AArjwn/0Cv8AyYl/+KrSM6cVbmdu1lb8zOUKsnflV+/M7/8ApIsfjE2LiHxFptxpbk4E/wDrYG+jr0+hrpLa6t7yBZ7aeOaJvuvGwYH8RXNf8K48J/8AQK/8mJf/AIqtjR9A0vQIpYtMtRAkrBnG9myR7sTU1fYNXhe/pp+bLpe3TtUtb11/JI0qKKK5zoCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/9k=	<image>Use the Pythagorean Theorem to find the length of the hypotenuse of each right triangle.	13	Geometry	Geometry3K	test
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diameters of $\odot A, \odot B,$ and $\odot C$ are 10, 30 and 10 units, respectively. Find YW if $\overline{A Z} \cong \overline{C W}$ and $C W=2$.	3	Geometry	Geometry3K	test
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$m\angle MPQ$.	101	Geometry	Geometry3K	test
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	<image>Find x to the nearest hundredth.	43.86	Geometry	Geometry3K	test
+271	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	<image>Find x	10.5	Geometry	Geometry3K	test
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$x$.	9.6	Geometry	Geometry3K	test
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	<image>Find z.	6 \sqrt { 5 }	Geometry	Geometry3K	test
+275	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	"<image>Use rectangle LMNP, parallelogram LKMJ to solve the problem.
+If $L N=10, L J=2 x+1,$ and $P J=3 x-1,$ find $x$"	2	Geometry	Geometry3K	test
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$\odot P$, $JK=10$ and $\widehat {JKL}=134$. Find $m \widehat{JL}$.	67	Geometry	Geometry3K	test
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$m \angle N C L$	120	Geometry	Geometry3K	test
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$m \angle 1$.	79	Geometry	Geometry3K	test
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	<image>The pair of polygons is similar. Find x	6	Geometry	Geometry3K	test
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\angle 3=x-12$ and $m \angle 6=72$. Find $x$.	84	Geometry	Geometry3K	test
+281	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	<image>Find the perimeter of  $\triangle D E F,$ if $\triangle D E F \sim \triangle C B F,$ perimeter of $\triangle C B F=27, D F=6,$ and $F C=8$	20.25	Geometry	Geometry3K	test
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$TQ$.	12	Geometry	Geometry3K	test
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ABCD is a rectangle. $m\angle 2 = 40$. Find $m \angle 3$	40	Geometry	Geometry3K	test
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	<image>Find $h$ in the triangle.	8	Geometry	Geometry3K	test
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diameters of $\odot A, \odot B,$ and $\odot C$ are 10, 30 and 10 units, respectively. Find AC if $\overline{A Z} \cong \overline{C W}$ and $C W=2$.	34	Geometry	Geometry3K	test
+286	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	<image>Find $m∠1$.	53	Geometry	Geometry3K	test
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	<image>In rhombus $A B C D, m \angle D A B=2, m \angle A D C$ and $C B=6$. Find $m \angle A D B$	30	Geometry	Geometry3K	test
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\cong \overline{TWY}$. Find $x$.	5	Geometry	Geometry3K	test
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$WXYZ$ is a rectangle. Find the measure of $\angle 6$ if $m∠1 = 30$.	60	Geometry	Geometry3K	test
+290	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$\odot Z, \angle W Z X \cong \angle X Z Y, m \angle V Z U=4 x$, $m \angle U Z Y=2 x+24,$ and $\overline{V Y}$ and $\overline{W U}$ are diameters.
+Find $m\widehat{W U X}$"	308	Geometry	Geometry3K	test
+291	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x.	10	Geometry	Geometry3K	test
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x. Assume that segments that appear to be tangent are tangent. Round to the nearest tenth if necessary.	10	Geometry	Geometry3K	test
+293	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the perimeter of the figure.	32	Geometry	Geometry3K	test
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the measure of the altitude drawn to the hypotenuse.	\sqrt { 336 }	Geometry	Geometry3K	test
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parallelogram MNPR to find $m \angle MNP$	71	Geometry	Geometry3K	test
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the figure, $\triangle A B C \sim \triangle D E F . \overline{B G}$ is a median of $\triangle A B C,$ and $\overline{E H}$ is a median of $\triangle D E F .$ Find $E H$ if $B C=30, B G=15,$ and $E F=15$	7.5	Geometry	Geometry3K	test
+297	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	"<image>Find x. Round to the nearest tenth if necessary. Assume that segments that appear
+to be tangent are tangent."	2	Geometry	Geometry3K	test
+298	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	<image>Find $m \angle Y$	80	Geometry	Geometry3K	test
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	<image>Equilateral pentagon $P Q R S T$ is inscribed in $\odot U$. Find $m \widehat{Q R}$	72	Geometry	Geometry3K	test
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ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP//Z	<image>In the figure, $m ∠9 = 75$. Find the measure of $\angle 6$.	105	Geometry	Geometry3K	test
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	<image>Given that the perimeter of $\triangle A B C=25,$ find $x$. Assume that segments that appear tangent to circles are tangent.	3	Geometry	Geometry3K	test
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and $\overline{IG}$ are diameters of $\odot L$. Find $m \widehat {IHJ}$.	270	Geometry	Geometry3K	test
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the scale factor from $W$ to $W'$.	\frac { 1 } { 3 }	Geometry	Geometry3K	test
+304	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x.	\sqrt { 7 }	Geometry	Geometry3K	test
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	<image>Find tan X	\frac { 5 } { 12 }	Geometry	Geometry3K	test
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	<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.	1440	Geometry	Geometry3K	test
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$A B C D$ is a rhombus, and $m \angle A B C=70^{\circ}$, what is $m \angle 1 ?$	55	Geometry	Geometry3K	test
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and $AT=16$. Find $MS$.	3.5	Geometry	Geometry3K	test
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trapezoid $ABCD$, $S$ and $T$ are midpoints of the legs. If $CD=14$, $ST=10$, and $AB=2x$, find $x$.	3	Geometry	Geometry3K	test
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$m \angle 4$.	71.5	Geometry	Geometry3K	test
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	<image>Circles $G, J,$ and $K$ all intersect at $L$ If $G H=10$, find FH	20	Geometry	Geometry3K	test
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DE	10	Geometry	Geometry3K	test
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ABC \sim \triangle FDG$. Find the value of $x$.	10	Geometry	Geometry3K	test
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x. Assume that segments that appear to be tangent are tangent.	5	Geometry	Geometry3K	test
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trapezoid QRTU, V and S are midpoints of the legs. If QR = 4 and UT = 16, find VS.	10	Geometry	Geometry3K	test
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z	36 \sqrt { 7 }	Geometry	Geometry3K	test
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	<image>Lines $l$, $m$, and $n$ are perpendicular bisectors of $\triangle PQR$ and meet at $T$. If $TQ = 2x$, $PT = 3y - 1$, and $TR = 8$, find $z$.	3	Geometry	Geometry3K	test
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parallelogram JKLM to find $m \angle JML$	109	Geometry	Geometry3K	test
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$x$.	12.75	Geometry	Geometry3K	test
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$\angle C$ of quadrilateral ABCD	90	Geometry	Geometry3K	test
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	<image>$P Q R S$ is a rhombus inscribed in a circle. Find $m \widehat{SP}$ 	90	Geometry	Geometry3K	test
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the variable of $x$ to the nearest tenth. Assume that segments that appear to be tangent are tangent.	6.0	Geometry	Geometry3K	test
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segment is tangent to the circle. Find $x$. Round to the nearest tenth.	8.5	Geometry	Geometry3K	test
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$x$.	16	Geometry	Geometry3K	test
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$ST=8, TR=4$, and $PT=6$, find $QR$.	9	Geometry	Geometry3K	test
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the value of $x$ in each diagram	71	Geometry	Geometry3K	test
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	<image>$m \angle 2=2 x, m \angle 3=x$ Find $m\angle 2$	60	Geometry	Geometry3K	test
+328	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADRAQ4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAormpfEWoJqE1mumo8sR5Akxkdj/Knf27q//QHH/f0VyvGUU7Xf3M3+rz/po6Oiuc/t3V/+gOP+/oo/t3V/+gOP+/oo+u0e7+5h9Xn/AE0dHRXOf27q/wD0Bx/39FH9u6v/ANAcf9/RR9do939zD6vP+mjo6K5z+3dX/wCgOP8Av6KP7d1f/oDj/v6KPrtHu/uYfV5/00dHRXOf27q//QHH/f0Uf27q/wD0Bx/39FH12j3f3MPq8/6aOjornP7d1f8A6A4/7+ij+3dX/wCgOP8Av6KPrtHu/uYfV5/00dHRXOf27q//AEBx/wB/RR/bur/9Acf9/RR9do939zD6vP8Apo6Oiuc/t3V/+gOP+/oo/t3V/wDoDj/v6KPrtHu/uYfV5/00dHRXOf27q/8A0Bx/39FQWHjJbnV2sLi3WJkcRyEOTsY9AeO9NYuk+v4MPq1WzaWx1VFFFdJgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHPeJLV4Wh1e3XMkBxKB/En+f5+1TwypPCksZyjjINbDoskbRuoZGBDA9xXK2KtpmozaVKTs/wBZbse6nt/n3rzMVT5J862f5/8ABOyjLmjyvdfkatFFFc5YUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVw+lWa33iPxXCeG82IofRsNiu4qpbaZZ2d3c3UEOye6IMzbidxGccE8dT0q4yXJKL6r9TelVUITXVpfmn+hd0DUWv9P2zcXMB8uUHrkd/wAf8a1a5OaQ6PrMWoLxbz/u7gDt6H/Pp711gIIBByD3ruwlXnhyy3R59eHLK62YUUUV1GIUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVi+I7B57Rby3H+k2p3rjuO4raoqKtNVIOD6lQk4SUkYNndJeWkc6dGHI9D3FT1liL+xtce06Wt0d8Pordx/n2rUrx1dNxlujudt1swooooEFFFFABRRRQAUUUUAFFFFABRRRQAVy3h24ml8V+JI5JpHjjkjCKzEhfvdB2rqa5vQdPurXxN4guZ4GSG4kjMTno4G7OPzFa07ckr9v1R00XH2dS/ZfmjeurdLu2kgk+64x9Pejw3eu8Emn3B/0i0O3/AHk7H/PtU1ZWo79PvYNWhBJjOyZR/Eh/z/KohU9lNT6dfQ5nHnjynWUUyKVJ4UljYMjqGUjuDT69lO5wBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBma7p39pacypxPGd8RHXcO341n6Ze/brJZDxIvyyD0YV0dctfxf2ProuF4tL04f0V/X/Pqa8/GU7NVV6P8AQ6qErrkfyNKiiiuQ1CiiigAooooAKK5jxd440nwtp12ZLy3bUkiJhtN2XZyPlyo5A9+OK0vDeqyax4Z0/VLhY45Lm3WVwmQqkjnGe1VytLmFdXsatFeZP8Q/Empw3+qeHfD8FzolkzBp55dryhRlioyO3PQ/nxXceHNcg8SeH7PV7dGSO4QnYxyUYEhh+BBpypyirsSknsatFcz448T3HhbR7eeztUuby6uktYI5Gwu5gTk/l+tRzeKL3R5PD1jrNlEdR1WVoX+zP+7iII5Gck8EUKDauPmR1VULLWLa/wBQvrKESebZsqy7lwMnOMflV+uS8M/8jh4o/wCusX/s1OEU4yb6f5nRSpxlTnJ9EvzSOtpskayxtG4yrDBHqKdRWZgU/Dty1pcTaPO2THl4Cf4kPb/Pv6V0dcrq8MiCLULfi4tTu+q9x/n3ro7K7jvrOK5iPySLn6HuK7sHUuvZvpt6f8AwxENeddfzJ6KKK7TnCiiigAooooAKKKKACiioLy8ttPtJbu8njgt4l3SSysFVR7k0AT0Vz2j+OvC+v3v2LTNZtp7nnEXKs2OuNwGfwrR1jXNM8P2P2zVr2G0t920PIcZPoB1J9hQBoUVlaH4l0bxLBJNo+ow3aRkB9hIZM9MqcEZ56jtWrQAVT1OwTUtPltnwCwyrf3W7GqFp4u0C/wBcuNGtNThm1C3VmliQE7ApAbLY28E8jNa1vcwXkCz208c8TZxJE4ZTjjqKUoqScXsxptO6Oc0i6ea3aCfIubc+XID146GtGqGuwnTdSi1aMfupMR3AH6H/AD6D1q8CGUMDkEZBFeK4uEnB9DvupJSXUWiiigQUUUUAcf8AEDQ9Jn8Ka1qM2mWcl8lm5W4aFTICF4w2M8VBpEzW/wAFo50OHj0V3U+hEZNa3jv/AJEPXf8Aryk/9Bqn4WshqPwr0+xJwLnTPJJ9NyEf1rZP3FfuQ173yOE8Haj41h8A2sugaXpraZaJJlbksZbo7mLlQCBjJIHfj8K9L8Ha9a+JPDFpqVrbrbrICrwL0jcHBH58/jXnfhfx9YeDfB8nh/V4Z4da05pY0tvKJ84lmZcEcYy2OfqM12Hww0S50LwNaW95G0VxKzTvGwwU3HgEdjgDirrLRtrrp5kweyOb+Lmg200+jag01yJbjUIbRlWUhApDcgdm96z/ABj4J06w8T+FLWK71FkvbkwyNJclmUDZyp7HnrXS/Fb/AI8vDn/Ybg/k1V/iddxaXrvhDVLretna3rtNIqlto+X0+h/KqpylaKXmKSWvyPQLCzj07T7eziaRo4IxGrSNuYgDHJ7mq1jo1tp+o399E8plvWVpAxBAxnGOPerNjewalYW99auXt7iNZY2IIypGQcHkcViaDqN3d+JdftZ5i8NtJGIUIHyA7s/yFYRUmpfj952UoycJuL0S1+9fqdHRRRWZiBAIweRWfo0v9latJprnFvP+8gJ7HuP8+nvWhVDVrRrm1Dw5FxCfMiI65HahScJKcd0OyknF9TpqKo6RqC6np0dwMB/uyL6MOtXq9mMlKKktmcEk4uzCiiiqEFFFFABRRRQAVxfxJ8M6l4s0jT9MsSn2f7dHJeBpNm6IA5Hv1zj2FdpXPeM/FUPg/wAOyalJC1xMziG3gXrLK2dq/oT9BQBwHxS0rSNHn8KLolla2msjU4lt1towjNGOucdRu2dfU+9aHiC3h8SfG7SdHv41n0/T9Oa7NvINyPISRkjv/B+VX/Bngq+/tVvFvi2UXOvzr+6h/wCWdkh6Ko9cHHtz1JJNW4C2X7Qtq8pCi90YpET3YMSR9cKTQBVksbfwz8edKTTIUtrbWLGQXEMQCoXUO2do4/gX8c+tej6xNqUGkzy6RbRXV+oHlQzPsVjkZye3Ga8/1tlvP2gPDcMRDGysJZZsH7u5ZAM/mv5ivTqAPBfh3P4oh8M69Npug6fcB7qfzLiWcLJ5mE3J6lQCSPeuo+CFxrD+D7aCeygTSUEpt7lZcySP5pyCvYDn8qd8J/8AkRPEH/YSuv8A0Ba0fgv/AMku0z/fm/8ARrUAdzdW0d5ayW8oyki7TXNaTJJA82mXB/fWxwp/vJ2P+fUV1dc94ktXhaHV7dcyQHEoH8Sf5/n7VxYylePtFuvyOjDz15H1/MtUUyGVJ4UljOUcZBp9cJuFFFFABRRRQAxoYmlWVokMi/dYqMj6Gn0UUAFFFFABXK+HIZY/FniV3jdUeSPaxUgN97p611VVbfUbS7urm1gmDzWxAmQA/IT0/ka0jJqMklv/AJm1ObjCaSvdfdqmWqKKKzMQooooAzLWX+xte2ni0vT+Cv8A5/n7V1Vc9qNmt9ZPCeG6ofRu1XNA1Fr/AE8LLxcwHy5QeuR3/H/GurB1OVuk/VfqjKvG6518zVooor0TlCiiigAooooAK5zxf4MsPGlna2uoXN5AltN5yNauqtuxjklT610dFAHni/CHT1YN/wAJR4pODnB1Bf8A4iug8WeC9O8XRWxuZbm1u7Ry9teWr7JYieuD6cD8q6OigDlPCXgLTvCdzd3qXV3f6jdgCa8vH3yEDsD6dPrgeldXRRQBh+G/Clh4Y0y60+zknlhubh7iTz2BO5wAQMAccVR8JeA7DwbLMdO1DVJYJFKi2ubgPFHk5yqhRg+9dVRQAU10WWNo3UMjAhge4p1FAHJ2KtpmozaVKSUH7y3Y91Pb/PvWrTPEdg89ot5bj/SbU71x3XuKjs7pLy0jnTow5Hoe4rxqlP2U3Dp09P8AgHfGXPHm+8noooqQCiiigAooooAKKKKACuS8M/8AI4eKP+usX/s1dbWTpmif2dq+qX/2jzPtzK2zZjZjPfPPX2rWEkoyT6r9UdFGcY06kXu0rfema1FFFZHOFFFFABWVNIdH1mO/Xi2n/dzgdvQ/59D61q1DdW6XdtJBJ91xj6e9J3Wsd0NW2exugggEHINFYXhu9d7eTT7g/wCkWh28/wASdj/n2rdr2KVRVIKSOKcHCTiwooorQgKKKKACiiigAooooAKKKKACiiigAooooAK5QRf2Nrj2nS1ujvh9FbuP8+1dXWZrum/2lpzLHxPGd8RHXcO341zYql7SF1ujajPllZ7Mjoqnpl79uslkPEg+WQejCrleYndXR1NWdgooopiCiiigAooooAK5a3kTxLrGsaXqcEcltYSoYQpZTkhuSQea6muS8M/8jh4o/wCusX/s1bUvhk+qX6o6sOrQqSW6St5aov8A/CGeH/8Anw/8jSf/ABVH/CGeH/8Anw/8jSf/ABVb1FT7ap/M/vI+tV/5397MHwYSfCGnEkk7Dyf941vVg+C/+RP07/cP/oRreorfxJerDFfx5+r/ADCiiiszAytR36fewatCCfLOyZR/Eh/z/KupilSeFJY2DI6hlI7g1kyRrLG0bjKsMEeoqt4duWtZ5tHnbJjy8DH+JD2/z7+lb4WpyT5Hs/z/AOCRWjzRv1X5HRUUUV6hxhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQByuoRjRdb+0/ds7zh/RX9f8+pqx/alh/z9w/8AfVbtxbQXUXl3ESSJnO1hkZqr/Yml/wDPhB/3wK8+pg58zcGrM6o142XNuZn9qWH/AD9w/wDfVH9qWH/P3D/31Wn/AGJpf/PhB/3wKP7E0v8A58IP++BUfVKvdfiP29PszM/tSw/5+4f++qP7UsP+fuH/AL6rT/sTS/8Anwg/74FH9iaX/wA+EH/fAo+qVe6/EPb0+zMz+1LD/n7h/wC+qP7UsP8An7h/76rT/sTS/wDnwg/74FH9iaX/AM+EH/fAo+qVe6/EPb0+zMz+1LD/AJ+4f++qYuoaYjs63FurN94ggE/Wtb+xNL/58IP++BR/Yml/8+EH/fAo+qVu6/Eft4eZmf2pYf8AP3D/AN9Uf2pYf8/cP/fVaf8AYml/8+EH/fAo/sTS/wDnwg/74FH1Sr3X4i9vT7M5nw9JbaToNpYz3ts0sKkMUfKnknjOPWtP+1LD/n7h/wC+q0/7E0v/AJ8IP++BR/Yml/8APhB/3wKcsLWk221+Jc8TCcnJ3uzM/tSw/wCfuH/vqj+1LD/n7h/76rT/ALE0v/nwg/74FH9iaX/z4Qf98Cl9Uq91+JHt6fZmZ/alh/z9w/8AfVZuq3ltuhvrS6iN1bsCAG+8O4/z710v9iaX/wA+EH/fAo/sTS/+fCD/AL4FJ4Oq1uvxGq9NdGWLK7jvrOK5iPySLn6eoqeore2gtI/Lt4ljTOdqjAzUtelG9lzbnI7X0CiiiqEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFUNN1rTtYkvI7C6WdrOdre4CgjZIOq8jn8Kz/ABVo+t6zaQw6N4hfRmBbzXS3EpkBHABJBXHqK4r4I2r2On+I7SSYzPBqrxNKRguVAG78cZoA73XPFGieGo0fWNSgtPMzsVzlmx1woyT+VT6Prul+ILL7ZpN9DdwZ2loz90+hHUH2NeYeIf7P0v43LqXiuJDo82niOymuY98KSDGQcggH7/8A30DVr4WW8Uvi7xdqukQmLw/czolqVTbHIyk7ig44GT2/iFAHqhIUEkgAckmsTSvGPh7W3vF07VYJxZAG4cZCIDnB3EAEcHkGoPHM+rW/hO9bR7SG5mMbrKJZNgSLY25ge5HHFeQaPN4kg+B10ltoWnjTJLeUNd+cBK8e597EdyDgAelAHv8AFLHPEksUiyRuAyuhyGB7g96fXFfC641ifwXp66nZQW9vHawrZvHLuMsez7zDsenHvXa0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXmnwi+/4u/wCw3NXpdYfhzwrY+GDqJspbiT+0LpruXzmU7XbqFwBx9c/WgDg7Sxs/Fnxp8QW3iCJLuLTLeNbKzn+aNVYKWbb0PXv/AHvYU/wZbxaH8ZPEmg6STHpAtEuGt1bKRTHy+np95v5dq6XxP8OtN8SatHq8d7f6ZqsabPtdjLsZl7A/4jB/SrnhLwTpfg+K5+xvcXF1dvvuLu6ffLKeepwOOT+fOaANLxD/AMi1qv8A15zf+gGvNtG/5Npk/wCwfc/+jHr1S8tUvrG4tJSwjnjaJivUBhg49+ax7Hwfpth4LPhVWuJdPMMkBaRx5hVySeQAM5Y44oAZ4C/5J94e/wCwfD/6AK6Kuf8ACfhK28IWUlnaajqV3CxXat7OJBEAMYQAAKPaugoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==	<image>Find the perimeter of the parallelogram. Round to the nearest tenth if necessary.	76	Geometry	Geometry3K	test
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JKL \sim \triangle WYZ$. Find $x$.	21	Geometry	Geometry3K	test
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$KL$.	12	Geometry	Geometry3K	test
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$QS$.	25	Geometry	Geometry3K	test
+332	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	<image>parallelogram MNPQ with $m \angle M=10 x$ and $m \angle N=20 x$, find $\angle M$	60	Geometry	Geometry3K	test
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$x$.	90	Geometry	Geometry3K	test
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y.	2 \sqrt { 6 }	Geometry	Geometry3K	test
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	"<image>$\overline{AB} \perp \overline{DC}$ and $\overline{GH} \perp \overline{FE}$.
+If $\triangle ACD \sim \triangle GEF$, find $AB$."	2.2	Geometry	Geometry3K	test
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$JQ$ if $Q$ is the incenter of $\triangle JLN$.  Rounded to the nearest hundredth.	18.79	Geometry	Geometry3K	test
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$FGHJ$ is a kite, find $m\angle GFJ$.	80	Geometry	Geometry3K	test
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$x$ so that $m || n$.	20	Geometry	Geometry3K	test
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x.	2 \sqrt { 11 }	Geometry	Geometry3K	test
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the pair of similar figures, use the given areas to find the scale factor from the blue to the green figure.	\frac { 1 } { 2 }	Geometry	Geometry3K	test
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the value of the variable $y$ in the figure.	10	Geometry	Geometry3K	test
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	<image>Find $m \widehat {XZ}$.	88	Geometry	Geometry3K	test
+343	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADRAVYDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKo61qKaPod/qbgFbS3knKk4ztUnH44oAvUV43pnxS8dazYJfad4IW5tXJCyxuxBwcHH410Pg34oHX/EL+HdZ0ebSNXVSUidiQ+BkjBAIOOe+QOtAHodFFFABRRRQAUUUUAFFFFABRRRQAUUUUAUtU1fT9EsWvdTvIrW2UgGSVsDJ6Aep9hVLQvFug+JvNGjanDdtFy6LlWUeu0gHHvWR4y8If8ACTazoV3eXFuNJ0ySSe6t5s4l4GM9sDBznsTXH40e/wDjZoUvhBLVoba2kOozWCjyQpVgAxX5Seg/EelAHpGu+K9C8MrGdZ1OC0MnKI2SzD1CgE498Vb0nWdN16xW90u8iu7ZiV3xtnB9COoPsa8ai17wunxL8V634ulhkW1mWwsbeaLzvu5DFUwem0c9PnPrXc/DnTfDcJ1jVvC+qG6sdRnDtbBdi2zDcdoXAK/e6EdAKAO6ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArgPjNqf9nfDW+QHD3ckdsp+rbj/46rV39eO/G121XVfCvhmJjuvLvc6jtkqin/x56AJPBPxN8E+HPBGlaXNqji4gtwZY1tZTiRiWYZ24PzE85rP8M3cnxB+NS+KLGzlh0jTYTGJpF2+YdjKAcfxEuTj0HNeqjwj4aGMeHtJ4/wCnKP8AwrVgt4bWFYbeGOGJeiRqFA/AUASUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBzmr+KLGz8U6b4XvLaRzq0Um2UkeXgA5U98nGPxFcDr2hWHgj4l+EZfDKGyOpTtBd20chKSR5UZKknsx9sgHrXf+LvBel+MrS3iv2nhmtn329zbvtkiPGcEgjnA/Ks3w58NtO0LWl1q51HUdW1NEKRT382/wAoYI+X8CRyT7YoA5f4daZZj4oePDeQRNepd74fMAJEbvIxIz65T9KseBIIbT4veNbbTFVNNURFkjGEWXjIA6DkyV0Pib4caf4h1hdYg1C/0rU9nlvcWEuwyL/tepxxnPT1wK1fCnhDS/B+nSWmnCV2mfzJ7idt0krerHj9P6mgDeooooAKKKKACiiigAooooAKKKKACiiigAooooAKoa1rFnoGj3OqX7slrbrukKrk9QBgfUir9eYfHbUWtvAcdjGcyX93HFtHUquX/mq/nQB2PhbxhpHjGznutIkleOCTy38yPYQcZ6Vo6tqtnomk3Op38vlWtsheRsZ49AO5JwAPU15X8F7U6H4i8YeH3bJtZ49nuAXBP5bah+Lmsvr2t2/g+zkItrWNr/VZFP3ERS2D9F59yy0Aeh+FPHGi+MxdnSHncWuzzTLEU+9nGPX7prpK8r+Amm/ZfA9xfMuHvbtiD6ogCj9d9eqUAFFFFABRRRQAVjX3hXRdS8QWeu3dl5upWahYJjK42AEkfKDtPLHqK2aKACuI8UeKtfsPFlroWhafaXcs9r5+JmKnO5wedwGMLXb1wWof8lt0n/sFt/OWtqCV22r2TMK7aSSdrtDf7Y+Jf/Qtab/3/X/45QdY+JYGf+Ea03/v+v8A8crv6Rvun6U/bL+Rfj/mHsX/ADv8P8jzrTvE3xA1SwhvbTw9pskEoyjecFzzjoXz2q1/a/xI/wCha03/AMCB/wDF1s+A/wDkSNL/AOubf+hGujpusk/gX4/5muIwns604KcrJtdOj9Dg/wC1/iR/0LWm/wDgQP8A4uj+1/iR/wBC1pv/AIED/wCLrvKKXtl/Ivx/zMfYP+d/h/kcH/a/xI/6FrTf/Agf/F0f2v8AEj/oWtN/8CB/8XXeUUe2X8i/H/MPYP8Anf4f5HB/2v8AEj/oWtN/8CB/8XR/a/xI/wCha03/AMCB/wDF13lFHtl/Ivx/zD2D/nf4f5HB/wBr/Ej/AKFrTf8AwIH/AMXR/a/xI/6FrTf/AAIH/wAXXeUUe2X8i/H/ADD2D/nf4f5HB/2v8SP+ha03/wACB/8AF0f2v8SP+ha03/wIH/xdd5RR7ZfyL8f8w9g/53+H+Rwf9r/Ej/oWtN/8CB/8XR/a/wASP+ha03/wIH/xdd5RR7ZfyL8f8w9g/wCd/h/kcH/a/wASP+ha03/wIH/xdH9r/Ej/AKFrTf8AwIH/AMXXeUUe2X8i/H/MPYP+d/h/kcH/AGv8SP8AoWtN/wDAgf8AxdH9r/Ej/oWtN/8AAgf/ABdd5RR7ZfyL8f8AMPYP+d/h/kcH/a/xI/6FrTf/AAIH/wAXR/a/xI/6FrTf/Agf/F13lFHtl/Ivx/zD2D/nf4f5HB/2v8SP+ha03/wIH/xdH9r/ABI/6FrTf/Agf/F13lFHtl/Ivx/zD2D/AJ3+H+Rwf9r/ABI/6FrTf/Agf/F0f2v8SP8AoWtN/wDAgf8Axdd5RR7ZfyL8f8w9g/53+H+Rwf8Aa/xI/wCha03/AMCB/wDF0f2v8SP+ha03/wACB/8AF1213eW1jbtcXdxFBCvWSVwqj8TXF3fxJhurhrLwxptzrN0ON6KViX3JPOPyHvVwbn8MF+P+ZnOMafxVH+H+Q3+1/iR/0LWm/wDgQP8A4uud1D4o+JNNuxaz6bpTzk48uCYykH0O1zg+1bv/AAivirxP83ifWfsdo3Ww0/jj0Zun57q6jRPCui+HkA06wijkxgzMN0h/4Eefw6Vo50YfEk35X/O5mqdafwyaXnb8rfqVvB+q67q+nzXGu6Ytg+8eSoUqWTHcEkg59cVwPxLP9tfFXwZ4fA3JHILmVR3Uvk5/4DEfzr2CuO/4QTd8Tv8AhMpdS37IfKhtPIx5fybM793PVj071xykpO6VjuhFxik3c4G68QW3gf4yeML+5/1UmmrNFHnHmSkRbV/Fi1Yz2dxo/wAI9c8VaoxOs+JpVjR24IiZ9xHtuAY/Tb6V6D4x+Ett4w8XQa3PqjQQqkaTWywbjKFJJ+fcNuQcdDjFavjvwEPGum6dp6aiNPtLSXzDGlvvD4G0AfMNuBn161JRe8Aab/ZHgHQ7MjDLaJI49Gf52/VjXSUiqqKFUAKBgAdhS0AFFFFABRRRQAUUUUAFcFqH/JbdJ/7Bbfzlrva848Qabaat8YNMtL2IywNpZJUOy8hpMcgg1vQ3l6MxrWvHm25kej0jfdP0rnP+EC8Nf9A9v/AmX/4qj/hAvDX/AEDm/wDAmX/4qsdDv5cN/PL/AMBX/wAkL4D/AORI0v8A65t/6Ea6Oq9hY22mWUVnZxeVbxDCJknAznqee9WKG7sjEVFUqymtm2/vYUUUUjEKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiikZgqlmIAAySe1AC0VyOr/ABG0PTpvsto8mqXxOFgshvyfTd0/LJ9qzPJ8eeKv9dLH4c09v4Y/mnI+vUH/AL5+lbKhK15aLzMJYiN+WHvPy/z2Oq1rxRo3h+MnUr+KJ8ZEQO6Rvoo5/HpXK/8ACW+J/E3yeF9FNrat0v7/AIGPVV6flu+la+i/D7QNHcTm3N7eZybi7PmNn1A6D64z711VPmpQ+FXfn/kTyVZ/E+Vdlv8Af/kcJafDeO8uFvfFGqXOsXI58tmKRL7ADnH0wPau0tLK10+3W3s7eK3hXokSBQPwFT0VE6s5/EzWnShT+FBRRRWZoFFFFABRRRQAUUUUAFFFFABRRVLV9UtdE0i71O9YrbWsTSvjqQB0HqT0A9TQBdoqjo2q2+uaNaaparItvdRiWMSABgD6gE1x9/8AGLwjp2o3VjPcXXnW0rwybbckblJBwe/IoA76uDv/APktel/9gpv/AEKSuq0DXbLxJo0Gq6cztazFghkQqflYqePqDXK3/wDyWvS/+wU3/oUlb0N5ejOfEbR9Ud5RRRWB0BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVg654y0Lw8GW+vk88f8u8XzyH8B0/HFVGMpO0VcmU4wV5OxvVVv9TsdKtjcX93DbRD+KVwufYep9q4j+3/GXij5dC0pdJsm6Xt998j1Vcf0P1q1p/w1sDci91+8udave7XDERj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the ratio of $\tan M$ as a decimal to the nearest hundredth.	0.42	Geometry	Geometry3K	test
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the ratio of $\tan L$ as a decimal to the nearest hundredth.	0.42	Geometry	Geometry3K	test
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$\odot S$, $m \widehat {PQR}=98$, Find $m \widehat {PQ}$.	49	Geometry	Geometry3K	test
+346	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	<image>Find $h$ in each triangle.	11	Geometry	Geometry3K	test
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x	93	Geometry	Geometry3K	test
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\angle 4=2 y+32$ and $m \angle 5=3 y-3$. Find $y$.	35	Geometry	Geometry3K	test
+349	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	<image>In the figure, square $ABDC$ is inscribed in $\odot K$. Find the measure of a central angle.	90	Geometry	Geometry3K	test
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$J$ has a radius of $10$ units, $\odot K$ has a radius of $8$ units, and $BC=5.4$ units. Find $CK$.	2.6	Geometry	Geometry3K	test
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	<image>Find $x$ so that the quadrilateral is a parallelogram.	5	Geometry	Geometry3K	test
+352	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x.	14	Geometry	Geometry3K	test
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x. Assume that segments that appear to be tangent are tangent.	\frac { 14 } { 3 }	Geometry	Geometry3K	test
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	<image>Find x. Round to the nearest hundredth.	27.44	Geometry	Geometry3K	test
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$\odot M$, $FL=24,HJ=48$, and $m \widehat {HP}=65$. Find $NJ$.	24	Geometry	Geometry3K	test
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the length of $AC$ in the isosceles triangle ABC. 	7	Geometry	Geometry3K	test
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$m \angle D$.	80	Geometry	Geometry3K	test
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degree measures of minor arc $\widehat{A C}$ and major arc $\widehat{A D C}$ are $x$ and $y$ respectively. If $m∠ABC = 70°$, find $x$.	110	Geometry	Geometry3K	test
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	"<image>Circles $G, J,$ and $K$ all intersect at $L$ If $G H=10,$ find each measure.
+Find JL"	5	Geometry	Geometry3K	test
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DEFG is a rectangle. If $m\angle EDF = 5x - 3$ and $m\angle DFG = 3x + 7$, find $m\angle EDF$.	22	Geometry	Geometry3K	test
+361	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	<image>Find the area of the figure.	120	Geometry	Geometry3K	test
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z	\frac { 40 } { 3 }	Geometry	Geometry3K	test
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Qf2hQ+zd/Jnp9Mmmit4zJNKkaDqzsAB+JrzLy/iVrH3nSwjPT5lTH/fOTT4/hjqV/IJNa16WX+8qZY/mT/Sj6tTj/ABKi+WofWqkv4dN/PQ6LVPiJ4d0zcoujdSD+C3G79elcxJ4y8VeKZDD4e05raA8eeRk/99HgfhzXV6X4A8O6XtZbJZ5B/HOd5/I8CuljjSJAkaKijoFGBR7XD0/gjd93/kL2WJq/xJcq7L/M860z4YtPcC88R6hJeTE5aNWOCfdjyf0rv7OxtdPt1t7SCOGJRgKi4FWKKxq16lX4mb0cPTo/Av8AMKKKKxNwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvn/48amsvijS7BstHbQeY6g92bn9FFfQFRvBDI254kY+rKDSa1T7DTtc8bh+PunQwpEmgThUUKB9oHQf8BqO7+Nmq6tCbbw74bm+0uMLISZdue4AA/WvZ/stv/wA8Iv8AvgU5YYkOUjRT7KBTeu4lpseXfC3wBqOkX1z4k8Qf8hO6BCRscsgY5ZmPqa9Uoopti8wooopDCiiigAooooAKKKKAGlEPVVP1FJ5MX/PNP++RT6KLhYaI0HRFH4U6iigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/2Q==	<image>Find $m \angle B$.	61	Geometry	Geometry3K	test
+364	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	<image>For trapezoid $Q R S T, A$ and $B$ are midpoints of the legs. Find $m \angle S$	135	Geometry	Geometry3K	test
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$CE=t-2$. $EB=t+1$, $CD=2$, and $CA=10$, find $CE$.	1	Geometry	Geometry3K	test
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parallelogram MNPR to find $m \angle RNP$	38	Geometry	Geometry3K	test
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	<image>Find $x$. Assume that segments that appear to be tangent are tangent.	6	Geometry	Geometry3K	test
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the measure of $\angle 3$ in the figure.	68	Geometry	Geometry3K	test
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LMN \cong \triangle QRS$. Find $x$.	5	Geometry	Geometry3K	test
+370	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	<image>Find the area of the triangle. Round to the nearest tenth if necessary.	54	Geometry	Geometry3K	test
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RST \cong \triangle ABC$. Find $x$.	10	Geometry	Geometry3K	test
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	<image>Find the area of the regular polygon. Round to the nearest tenth.	23.4	Geometry	Geometry3K	test
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	<image>Use parallelogram $ABCD$ to find $AD$	18	Geometry	Geometry3K	test
+374	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	<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.	10.2	Geometry	Geometry3K	test
+375	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$GHJK$ has an area of 188.35 square feet. If $HJ$ is 16.5 feet, find $GK$.	26.8	Geometry	Geometry3K	test
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of the following facts would be sufficient to prove that line $d$ is parallel to $\overline {XZ}$?	\angle 3 \cong \angle Z	Geometry	Geometry3K	test
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$LK=4,MP=3,PQ=6,KJ=2,RS=6$, and $LP=2$, find $ML$.	2	Geometry	Geometry3K	test
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x	4 \sqrt { 6 }	Geometry	Geometry3K	test
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$x$. $A=148$ $m^2$. 	18.5	Geometry	Geometry3K	test
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is a parallelogram with side lengths as indicated in the figure at the right. The perimeter of ABCD is 22. Find AB	7	Geometry	Geometry3K	test
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x to the nearest tenth. Assume that segments that appear to be tangent are tangent.	11.2	Geometry	Geometry3K	test
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$x$.	30	Geometry	Geometry3K	test
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$XM=4,XN=6$, and $NZ=9$, find $XY$.	10	Geometry	Geometry3K	test
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$\odot O, \overline{E C}$ and $\overline{A B}$ are diameters, and $\angle B O D \cong \angle D O E \cong \angle E O F \cong \angle F O A$
+Find $m\widehat{A C}$"	90	Geometry	Geometry3K	test
+385	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z.	3 \sqrt { 19 }	Geometry	Geometry3K	test
+386	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	"<image>In $\odot F, \overline{F H} \cong \overline{F L}$ and $\mathrm{FK}=17$.
+Find JG"	30	Geometry	Geometry3K	test
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and $\overrightarrow{BC}$ are opposite rays and $\overrightarrow{BD}$ bisects $\angle ABF$. If $m \angle FBC=2x+25$ and $m \angle ABF=10x-1$, find $m \angle DBF$.	64.5	Geometry	Geometry3K	test
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$XY$ of isosceles $\triangle XYZ$	7	Geometry	Geometry3K	test
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ACiiigAooooAKKKKACiiigD//2Q==	<image>Find $z$ in the given parallelogram	4.5	Geometry	Geometry3K	test
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\| \overline{BC}$. Solve for $x$.	9	Geometry	Geometry3K	test
+391	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	<image>Find y.	28	Geometry	Geometry3K	test
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the scale factor from $Q$ to $Q'$.	3	Geometry	Geometry3K	test
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and $AT = 16$. Find $MB$.	8	Geometry	Geometry3K	test
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the perimeter of $\triangle B C D,$ if $\triangle B C D \sim \triangle F D E, C D=12$, $F D=5, F E=4,$ and $D E=8$.	25.5	Geometry	Geometry3K	test
+395	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	"<image>In rhombus LMPQ, $m \angle Q L M=2 x^{2}-10$, $m \angle Q P M=8 x$,  and $M P=10$ . 
+Find the perimeter of $LMPQ$"	40	Geometry	Geometry3K	test
+396	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	<image>Find $BD$ if $\overline{B F}$ bisects $\angle A B C$ and $\overline{A C} \| \overline{E D}, B A=6, B C=7.5$, $A C=9,$ and $D E=9$	13.5	Geometry	Geometry3K	test
+397	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y.	12 \sqrt { 2 }	Geometry	Geometry3K	test
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EFGH is a rectangle. If EF = 4x - 6 and HG = x + 3, find EF.	6	Geometry	Geometry3K	test
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$m \angle R C M$	43	Geometry	Geometry3K	test
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	<image>Use parallelogram ABCD to find $m \angle CDF $	43	Geometry	Geometry3K	test
+401	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	<image>Point $D$ is the center of the circle. What is $m \angle A B C ?$	90	Geometry	Geometry3K	test
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	<image>Find the measure of $\angle 3$.	95	Geometry	Geometry3K	test
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$WXYZ$ is a rectangle. Find the measure of $\angle 3$ if $m∠1 = 30$.	60	Geometry	Geometry3K	test
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P+vvFyyh8G3b/AC/y/I2qK5q38R3GmXCWXiWFLaRztivY8m3m+p/gb2P510oIIBByD3qJwcdy4zUtgoooqCwooooAKzdW1yx0WJWupGMsnEVvEu+WU+iqOTV6dJJIHSKXypCMB9u7b74NcpB4HmttRl1CPxDe/bJRhpnijdsegJU4HsK1pxg9ZuxlUlNaQVyYaXqviX59bLWOnE5XToX+eQf9NXH/AKCK6S3toLS3S3tokihQYVEXAA9hWJ/YGrf9DTf/APfiH/4mj+wNW/6Gm/8A+/EP/wATVztLTmVu2v8AkRG8deV376f5nQUVz/8AYGrf9DTf/wDfiH/4mj+wNW/6Gm//AO/EP/xNRyR/mX4/5F88v5X+H+Z0FFcJquoQaLei01DxzewzbQzAWiOI1JwC5WMhAfViK2l0LVWUMviq+IIyCIYef/HaOSO/Mvx/yDnl/K/w/wAzW1HTLLVrRrW/tknhb+Fx0PqD2PuKwxY+INA/5B0w1exHS2u5NsyD0WToR7N+dT/2Bq3/AENN/wD9+If/AImj+wNW/wChpv8A/vxD/wDE1cWoq3Mmu2v+REryd+Vp99P8wt/GOlNKIL9pdMuT/wAsr5PLz9GPyn8DW7HLHMgeKRXQ9GU5BrnZ/DGoXURiuPEd3NGeqSW0DA/gUrJX4ZQRzGWHWr23c9TbokX/AKABTcKL+1b73+iFz1l9m/3L9Wd3RXJR+DL6Jdq+Ldax/tSg/wA6JPBl9Iu1vFutY/2ZcfyqPZ0/5/wZftKlvg/FHVySRxIXkdUUdWY4ArBuPGWlJKYLFpdTuRx5Vghlx9WHygfU1iN8MoZJRLPrd9cOOhuFSX9GBrWg8MahaxCK38R3cMY6JHbQKB+ASrUKK+1f71+jI56z+zb7n+qGGy8Q68cahONIsD1trV907j0aTov/AAH863dO0yy0m0W1sbdIIV7L1J9SepPuayv7A1b/AKGm/wD+/EP/AMTR/YGrf9DTf/8AfiH/AOJpSakrcyS7a/5DinF35W330/zOgorn/wCwNW/6Gm//AO/EP/xNYc+o29vq40qXx1erd+YIiPsqFFc9EL+XtDH0JzUckduZfj/kXzy/lf4f5neUVz/9gat/0NN//wB+If8A4mj+wNW/6Gm//wC/EP8A8TRyR/mX4/5Bzy/lf4f5m5cW8N3A8FxEksLjDI6ghh7iuaOlap4bJk0Nje6cOW02Z/mjH/TJz0/3TxVn+wNW/wChpv8A/vxD/wDE0f2Bq3/Q03//AH4h/wDiauFo6cyt21/yIleWvK799P8AMvaRrtjrUTNbOyzRnEtvKuyWI+jKeRWlXIXPgea7v4b+XxDffa4fuTJHGjY9CVUZHseK6uBJI4ESaXzZAMGTaF3e+BUVIwWsGXTlN6TViSiiisjUKKKKACiiigAooooA8t18ajLfeNV0WyW9tLmFIb6V3CtA6x4YRr/y0whBwSvPc16JosttPoWny2cjSWzW8ZidurLtGCffFYF/4PvpL3U5NL11rC11Tm8g+zCQltoUtGxI2EqB1B9a6WwsoNN0+2sbZdsFvEsUYJzhVGB/KhfD939f5A9/v/T+mWKKKKACiiigAooooAKKKKACiiigArx++e5/sfWDDa+Z4ZfWvtM+obh5yBZVMm2P+JQ6kbsg4zwcV7BXFzeBLh4rnTY9cePQbm4M8tj9mBf5m3Miy54UnttJ5PNC0lf+t0/0H0t/WzOzUhlDA5BGQaWkACgADAHApaBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/2Q==	<image>Find x. Assume that segments that appear to be tangent are tangent.	4	Geometry	Geometry3K	test
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$m \angle 2$ if $m \widehat{B C}=30$ and $m \widehat{A D}=20$	155	Geometry	Geometry3K	test
+406	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	<image>Find x. Assume that any segment that appears to be tangent is tangent.	25	Geometry	Geometry3K	test
+407	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	<image>Find the area of the shaded region. Assume that all polygons that appear to be regular are regular. Round to the nearest tenth.	56.9	Geometry	Geometry3K	test
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x. Round to the nearest tenth.	37.2	Geometry	Geometry3K	test
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RL = 5, RT = 9, and WS = 6, find RW.	7.5	Geometry	Geometry3K	test
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	<image>Find the measure of $\angle AFB$ on $\odot F$ with diameter $\overline{AC} $.	108	Geometry	Geometry3K	test
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x.	4 \sqrt { 6 }	Geometry	Geometry3K	test
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the area of the parallelogram. Round to the nearest tenth if necessary.	207.8	Geometry	Geometry3K	test
+413	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	<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.	178.2	Geometry	Geometry3K	test
+414	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	<image>Find the area of the regular polygon figure. Round to the nearest tenth.	65.0	Geometry	Geometry3K	test
+415	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regular pentagon and a square share a mutual vertex $X$. The sides $\overline{X Y}$ and $\overline{X Z}$ are sides of a third regular polygon with a vertex at $X .$ How many sides does this polygon have?	20	Geometry	Geometry3K	test
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$x$ if $\triangle JLM \sim \triangle QST$.	1.5	Geometry	Geometry3K	test
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WXY \cong \triangle WXZ$. Find $y$.	4	Geometry	Geometry3K	test
+418	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	"<image>Polygon ABCD ~ polygon AEFG, $m\angle AGF = 108$, GF = 14, AD = 12, DG = 4.5, EF = 8, and AB = 26.
+Find $m\angle ADC$"	108	Geometry	Geometry3K	test
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Kbwr4oj1TQpzJYy/urmzlb5gh7q3fBwcHng8nNd7RRVVKkqjvLcinSjTVo7BRRRUGgUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/9k=	<image>Find the measure of $\angle 3$ if $m∠4= m∠5$.	116	Geometry	Geometry3K	test
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parallelogram MNPR to find $x$	8	Geometry	Geometry3K	test
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segment is tangent to the circle. Find $x$.	16	Geometry	Geometry3K	test
+422	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	<image>JKLM is a rectangle. MLPR is a rhombus. $\angle J M K \cong \angle R M P$, $m \angle J M K=55, \text { and } m \angle M R P=70 . Find $m \angle K M L$	35	Geometry	Geometry3K	test
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ABCD is a rectangle. $m\angle 2 = 40$. Find $m \angle 8$	100	Geometry	Geometry3K	test
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	<image>Find $m \angle 3$.	38	Geometry	Geometry3K	test
+425	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	<image>Find y.	8 \sqrt { 3 }	Geometry	Geometry3K	test
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pair of polygons is similar. Find AC	7.6	Geometry	Geometry3K	test
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 P \cong \odot Q$, Find $x$.	11	Geometry	Geometry3K	test
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and $\overline{CG}$ are diameters of $\odot B$. Find $m \widehat {AG}$.	55	Geometry	Geometry3K	test
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to the triangle shown below. Find $y$ to the nearest tenth.	2 \sqrt { 41 }	Geometry	Geometry3K	test
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$PN$.	30	Geometry	Geometry3K	test
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$m \angle A B C$
+if $m \angle C D A=61$"	140	Geometry	Geometry3K	test
+432	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	<image>Find $m\angle 2$	90	Geometry	Geometry3K	test
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CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//2Q==	<image>The diagonals of rhombus FGHJ intersect at K. If $GH = x + 9$ and $JH = 5x - 2$, find $x$.	2.75	Geometry	Geometry3K	test
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KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP//Z	<image>$\triangle RSV \cong \triangle TVS$. Find $x$.	12	Geometry	Geometry3K	test
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$\odot M$, $FL=24,HJ=48$, and $m \widehat {HP}=65$. Find $m \widehat {HJ}$.	130	Geometry	Geometry3K	test
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x. Round to the nearest tenth.	17.4	Geometry	Geometry3K	test
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$\frac{I J}{X J}=\frac{HJ}{YJ}, m \angle W X J=130$
+and $m \angle WZG=20,$ find $m \angle J$"	60	Geometry	Geometry3K	test
+438	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ratio of the measures of the angles of the triangle below is 3 : 2 : 1. Which of the following is not an angle measure of the triangle?	45	Geometry	Geometry3K	test
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$G I$ if $G H=9, G K=6,$ and $K J=4$	15	Geometry	Geometry3K	test
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$AB$.	6.25	Geometry	Geometry3K	test
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the figure, a regular polygon is inscribed in a circle. Find the measure of a central angle.	60	Geometry	Geometry3K	test
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	<image>In rhombus $A B C D, A B=2 x+3$ and $B C=5 x$. Find AD.	5	Geometry	Geometry3K	test
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the figure, $m∠3 = 110$ and $m ∠ 12 = 55$. Find the measure of $∠1$.	110	Geometry	Geometry3K	test
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$WXYZ$ is a rectangle. Find the measure of $\angle 5$ if $m∠1 = 30$.	30	Geometry	Geometry3K	test
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pair of polygons is similar. Find GF	7.5	Geometry	Geometry3K	test
+446	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACgAO4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooqhrGtafoFgb7U5zDbh1TcI2clmOAAFBJ59qAL9Fc1aeP/DN5fQ2ceotHPO22Jbi2lhDt6AuoBPtXS0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXB/ECe4l1vwvptrZSX0n2w3rW8bqhZYlz1YgdWHU9q7yuN1rRfEj+N4dd0ldJlhhsjbJHeTSIVZm3M3yofQDrR1X9f1qPozL1/UbrW9Z0HSNb0a40a0lvVmSaaSOXzpU5WIeWxC59Se2K9GrlrfQtY1PWbHU/EU9kBYEvbWdiGKCQjG9nbBYgE4GBjNdTT6WF1CiiikAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAYnjB3j8Iaq8bMjrbsVZTgg+oqhEfEOgwo3za5p+0HHC3UYx+Un6GrvjP8A5E3Vv+vZq2YP+PeP/cH8q3jLlprS+r/Qwceao9baL9SnpWt6frMbNZXAZ04kiYbZIz6Mp5FaFZGq+HLDVZVuWV7e9T/V3du2yVfx7j2ORWd/aOueHxt1aA6nZL0vbSPEqj1ePv8AVfypckZ/A/k/61K55R+NfNf1odRRVXT9SstVtVubC5juIT/Ehzj2PofY1arJpp2ZommroKKKKQwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAMLxn/yJurf9ezVswf8AHvH/ALg/lWN4z/5E3Vv+vZq2YP8Aj3j/ANwfyrV/w16v9DJfxH6L9SSiiisjUwdQ8LWtxctfafNJpmon/l4tsAP/AL6dHH1qsPEGoaK3leI7MLDnC6jaKWhPpvXqh/MV09IQGUggEHgg961VW6tNXX4/eZOnZ3ho/wAPuGW9xDdwJPbypLE4yrxsGBHsRUlc5ceFjaTvd+Hro6ZcMdzwgbreU/7SdvquKSDxQ9lMlp4itP7OnY7UuAd1tKfZ/wCH6Nij2fNrB3/P+vQPacuk1b8v69TpKKRWV1DKQykZBByDS1kahRXF2d54k14LrWmX8MVj9s8uKxaJds0CvsZ2cjcGOGIxgdM5rtKOgdbBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFY2reK9E0O4FvqN75UpUOQsTvsUnAZyoIQe7YHFbNeN+Ktaa+j8Qxf2p9hle5FlNYwWalmiDBBLPIwJCkEkEbRjAyaFq7D6XPRvGLBvBeqspBU2zEEd62oP+PeP/cH8qxPFyKngfU0T7q2pA+mK24P+PeP/cH8q1l/DXq/0MY/xH6L9SSiiisjUKKKKACo5oIrmFoZ40kicYZHXII9xUlFAHMt4dvtHYzeG7zy485bT7oloD67T1Q/Tj2qxY+KLeW5Ww1SB9M1BuBBcEbZD/sP0b+ftW9Va+0+z1O1a2vraO4hbqki5H1HofetfaKWlRX8+v8Awf61MvZuP8N28un/AAP60Od0nwbNps9rFLrElxpdlM81nZ+SE2Mc43vk7wu444HvnFdXXL/2XrXh/LaNcnUbIf8ALheP86+0cp/k3FaGl+JLDVJja/vLW/X79ncrskH0H8Q9xmh03a8Xdf1v/XzGqivaWj/rb+vkbFFFFZGgUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGF4z/5E3Vv+vZq2YP+PeP/AHB/Ksbxn/yJurf9ezVswf8AHvH/ALg/lWr/AIa9X+hkv4j9F+pJRRRWRqFFFFABRRRQAUUUUAFZ+q6Jp+tQiO+tlkKnKSDh4z6qw5FaFFNScXdCcVJWZzG3xD4eyULa3pw/hOBdRj2PST9DWtpWu6frUbGznzIhxJC4KyRn0ZTyK0aydW8OafqzrPIrwXkf+ru7dtkqH6jr9DkVrzxn8as+6/yM+WUPhd12f+f9fI1qK5j7frugHbqcB1SwHS8tUxMg/wBuPv8AVfyrc07VLHVrVbmwuo7iI/xIensR1B9jUypuKvuu5Uaik7bPsW6KKKzLCiiigAooooAKKKKACiiigAooooAKKKKAMbxcAfCGrgjP+iSH/wAdNaViSbC2JOSYlyT9BWb4t/5FDWP+vST/ANBNNs4NdNjblNS04L5a4BsHJAx6+dWtr016v9CYRUqru0tF38+yZt0VitPrFnqOnR3V1Yzw3U7QsIrR42GIpHBBMjDqgHTvW1WbVjapT5La3v8A11CiiikZhRRRQAUUUUAFFFFABRRRQAVhaj4Xtbq5N9YzS6bqJ5+023G//fXo4+tbtFVGcou6JlCMlZnMf2/qOiMI/EVpm36DUbRS0X/A16p9eRXRW1zBeW6T200c0LjKvGwYH8RUpAIIIyD2rnbnwsLe4e80C6bS7pjl41XdBKf9qPpn3GDWl4T30f4f8Ai04bar8f8Ag/1qdFRXNxeKHsJVtvEdp/Z0rHC3KndbSH2f+H6NiujVldQykMpGQQcg1EoSjuVGcZbC0UUVBYUUUUAFFFFABRRRQAUUVn6rrmmaHAk2p30Nsjnam9uXPoo6k/SgCt4t/wCRQ1j/AK9JP/QTWjYf8g+2/wCuS/yFZNprmgeL7W80+1vVnDRlJ4cNHIqnjlWAYfXFMXwdYKoVb3VQAMAC/l4/WtU4uHLJ2MmpKfNFXLmrf8hLQv8Ar+b/ANJ5q1a51vBmnuyM15qpKHcpN/IdpwRkc+hI/Gnf8IfY/wDP9q3/AIMJf8aGqff8P+CaTqVJKK5Vou/m328zoKK5/wD4Q+x/5/tW/wDBhL/jR/wh9j/z/at/4MJf8aOWn/N+H/BM+ap/Kvv/AOAdBRXP/wDCH2P/AD/at/4MJf8AGj/hD7H/AJ/tW/8ABhL/AI0ctP8Am/D/AIIc1T+Vff8A8A6Ciuf/AOEPsf8An+1b/wAGEv8AjR/wh9j/AM/2rf8Agwl/xo5af834f8EOap/Kvv8A+AdBRXP/APCH2P8Az/at/wCDCX/Gj/hD7H/n+1b/AMGEv+NHLT/m/D/ghzVP5V9//AOgorn/APhD7H/n+1b/AMGEv+NH/CH2P/P9q3/gwl/xo5af834f8EOap/Kvv/4B0FFc/wD8IfY/8/2rf+DCX/Gj/hD7H/n+1b/wYS/40ctP+b8P+CHNU/lX3/8AAOgorn/+EPsf+f7Vv/BhL/jR/wAIfY/8/wBq3/gwl/xo5af834f8EOap/Kvv/wCAbs0MVxC0M0aSROMMjqCCPcGucbw5eaQ5m8NXggTJZtPuSXgb/d7ofpx7VN/wh9j/AM/2rf8Agwl/xo/4Q+x/5/tW/wDBhL/jVxlGO0tPT/gkyjKW8dfX/gC2PiiF7lbHVbeTS788CKc/JIf9h+jfz9q365i58CaRex+XdTajPHnO2W9kYZ+hNN8TakfCnheKy0mKSfUJR9l0+AHe7Njrz12jJ/Coquna8N+xVJVL2na3f/PQktPGlhe+Mp/DcEMzSxRsxuMDy2Zdu5Ae5G4Zrpa8hs5RpvizwXEmjatYRxNPbSz38aL57yLknKu2WLAnn1r16s7aI0vqFFFFIYUUUUAFcR4JRNev9U8U3SrLPJdSWtmWGfIgjO0BfQk5J9a7euKsPDviTw3Pd2+g3emTaZcTvOkV8sge3ZuSFKcMuexx9aFv8gex0E2k6ZceJbXU2YDU7aF0UK4BMbddw6kZ6e9atYmhaA2lz3V/e3RvdVvCPtFxs2KAPuoi87VHpk9cmtujyAKKKKACiiigAooooAKKKKAPOdQv9bg8V+KNW0mKxaHTbWGKRrvcd+xWlZFCkYOHHJ6ccGu+0+7F/p1reKhQTxJKFPUbgDj9a4tfCviOWTWrGe705dL1e7eaeRC5nSM4Xy1GAOUVRnPGTwa7qNFijWNAFRQFUDsBQvh+7/g/iEvi/r5DqKKKACiiigAooooAKKKKACsx9DtpfEUetyyTSXEUBghjYjy4gTlmUYzuPAJz0FadFAGVrWgWuutp7XEs8bWF2l3EYWAJdc8HIPBzz/OtWiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//2Q==	<image>$a=14, b=48,$ and $c=50$ find $sinA$	0.28	Geometry	Geometry3K	test
+447	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD3AKQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDk7DxLt8f6toF1JwfLktST38pSy/wBfzrrK8p1rRrjVPHHiS5sGZdSsFtri2KnqRGuV/ED869A8N65D4i0O31CLAZhtlQH7jjqP89iK68RSSjGceyv62/U48NVk5ShPu7el7fh/ka1FFFch2BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHG6J/yU7xP/ANcrf/0WtVnz4M8b+Z93RtabDf3YZ/X2B/r/ALNWdE/5Kd4n/wCuVv8A+i1re8Q6LB4g0S40+bA3jMb/ANxx0P5/pmu2U1GolLZxSf3L8jhhByptx3UpNfe/zNSiuY8E61PqOmyafqGV1TTm8i4Vjy2Ojfjjr6j3rp65akHCTizrpzU4qSCiiioLCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA43RP+SneJ/wDrlb/+i1rsq43RP+SneJ/+uVv/AOi1rsq3xHxL0j+SOfDfA/WX5s4fxZBJ4c1218W2cZMWRBqMaj78ZwA31HH5L712sM0dxBHPC4eKRQyMOhB5Bpl1bQ3tpNa3CB4ZkKOp7gjBrj/B1zNoup3fhG+dma3zLZSN/wAtISc4/D/H0qv4tPzj+X/A/IX8Kp5S/P8A4P5+p21FFFcx0hRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcbon/JTvE/8A1yt//Ra12Vcbon/JTvE//XK3/wDRa1r6Z4iXUNa1zTpLcQHSpI1Mhk3eYrJu3YwNv61viPiX+Ffkjnw3wP8AxS/NieJNUu7AafbWcttby31x5AubpS0cXyM33QRknbgDI5NcvqiX+uaCmvWxhfWdFuZFSa2B8u4RGw20ZJwcdMnkMM810+i38Hi/QWubvTIvsM8jrDHPiQTRA4VypGBnGcc8Y5rZhghtoEggiSKJBhY0UKqj0AHSopzdOXMa1YKpHlf9f1+hT0TV4Nc0e21G3PyTLkrnlG7qfoa0K4Sx/wCKM8aPpzHbpGrt5lt2WKbuv48D8Vru6daCjK8dnqv68iKM3KNpbrR/157hRRRWRsFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHG6J/yU7xP/1yt/8A0Wtc74gM4+IGsaBZlkuPEFtar5i5+SNd4lfPrsGPqRXQaSzp8SfFTRxmRxBblUBA3Hyxxk1d0HSr651258Sa1ZpaX0sK21vbLIJDBCDk5YcFmY5OOwFb1/jV+y/JGGGdqcvV/wDpR0Npaw2VnDa26COGFBHGg6KoGAKmoorBu5ulYxfFOgp4h0OWzzsnX95byd0kHQ5/T8ar+DdefW9G23QK6jaN5F2h6hxxn8cfnn0roq4XxCjeFPFNv4lgBFhdkW+oovY/wvj/AD0966KX7yLpPfdevb5/mc1X93JVVts/Tv8AL8juqKRHWRFdGDKwyCDkEUtc50hRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBxuif8lO8T/8AXK3/APRa12Vcbon/ACU7xP8A9crf/wBFrXZVviPiXpH8kc+G+B+svzYUUUVgdAVW1Gwt9U06exuk3wzoUYf1HuOtWaKabTuhNJqzON8EX9xZSXXhXUnzead/qXIx5sH8JH0yPwI9DXZVx3jfTri3Nt4n0xM3+mnMij/lrD/ED9Mn8Ca6bTNRt9W023v7Vt0M6Bl9vUH3B4reslJKquu/r/wdzCg3Buk+m3p/wNi3RRXO6h478MaVqLWF7rEEVyhw64ZhGfR2AIX8SK5/I6DoqKr3F/aWlg99cXMUdoieY0zMAgX1zWboni3QvEUssWlajHcSxDLx7WRgPXawBI9+lHkHmbVFFFABRRRQAUUUUAFFFFAGFr/iM6BfaRHNab7O/ufs0lz5mPIcj5MrjkE8dRin6Lr51y+vha2v/Eutn8qO9MnE8g++FXH3QeN2eTmua+Inn+JYn8H6Usb3bx/armVhkW6Lyn0ZmAA9smtzwFf2+o+B9JmtokhVYBE8SDAR1+Vhj6g0R1Tf9f1owlpb+v6uUNE/5Kd4n/65W/8A6LWuyrjdE/5Kd4n/AOuVv/6LWuyrfEfEvSP5I58N8D9ZfmwooorA6AooooARlDqVYAqRggjgiuF0Jj4R8WzeHpjjTb8mfT2J4Vv4o/8APoO5ru65/wAYaCdd0UrAdl/bN59rIDghx2z79PyPat6M0m4S2f8ASZhXg2lOO6/Huvn+Z0FcZb6TZeDvAuqjWLiCZJWnnupimBKXJwCD1PIFa/hTXl8QaHHdONl1GfKuYzwUkHXjtnr+NchY6hpXjDWX1fXdVsY9Osbh00/TZLhVBZDjzpATySQdo6AVjODUnB79TanNSiprYzDBdReBfh/o2pK3+lahCJ4nHWMbnVGH028e1dL4tCWfjzwbexLtmkuJbVyv8UbJ0PsDzR47kt5rPQNeglSey07VIpppYWDqsXKs2R2BIzUGsajZeJPH3ha10q6gvVsnlvbiSCQOsa7MLkjjJJp3vK/979F+lwtZW/u/5/rY9AoooqRhRRRQAUUUUAFFFFAEENlaW8888FrDFNcENNIkYVpCOAWI5P40WtlaWMbR2drDbozl2WGMICx6kgdz61PRQBxuif8AJTvE/wD1yt//AEWtdlXG6J/yU7xP/wBcrf8A9FrXZVviPiXpH8kc+G+B+svzYUUUVgdAUUUUAFFFFAHB6oP+EO8ZJq6jGkasRFeD+GKXs5+vJ/769q6A+DfCzHcfDejHPOfsMXP/AI7V7WdKt9b0m5065H7uZMZ7qezD3BwawPA+qztb3GgakcalpZ8ps/8ALSP+Fh68Y/T1rol+9p8/WOj9Oj/T7jmj+6qcnSWq9eq/X7zpbWws7KzFnaWkFvagECGKMIgz1+UDHOabZaZp+mK62FjbWiudzCCJYwx9Tgc1aornOkKKKKACiiigAooooAKKKKACiiigDjdE/wCSneJ/+uVv/wCi1rsq43RP+SneJ/8Arlb/APota7Kt8R8S9I/kjnw3wP1l+bCiiisDoCiiigAooooAK4rxpaT6TfWni3T0LS2ZEd5Go/1sJPP5f4HtXa0yWKOeF4pUDxupVlYZBB6itKVT2cr/ANWM6tP2kbf1cjs7uG/sobu2ffDMgdG9QanrhvC0r+GfEFz4TunJt3JuNOdu6HJKfUc/iD613NOrT5JWW3T0FRqc8bvfr6hRRRWRqFFFFABRRRQAUUUUAFFFFAHG6J/yU7xP/wBcrf8A9FrXZVxuif8AJTvE/wD1yt//AEWtdlW+I+JekfyRz4b4H6y/NhRRRWB0BRRRQAUUUUAFFFFAHM+NNDm1TS0vLD5dUsG8+2depI5K/jj8wK0PDeuQ+ItDt9QiwGYbZUB+446j/PYitauEfPgzxv5n3dG1psN/dhn9fYH+v+zXTD95D2fVar9V+pzVP3dRVOj0f6P9P+GO7ooormOkKKKKACiiigAooooAKKKKAON0T/kp3if/AK5W/wD6LWuyrjdE/wCSneJ/+uVv/wCi1rsq3xHxL0j+SOfDfA/WX5sKKKKwOgKKKKACiiigAooooAKy/EOiweINEuNPmwN4zG/9xx0P5/pmtSinGTi1JboUoqScXszmPBOtT6jpsmn6hldU05vIuFY8tjo3446+o966euH8WQSeHNdtfFtnGTFkQajGo+/GcAN9Rx+S+9drDNHcQRzwuHikUMjDoQeQa2rRTtUjs/wfVGNCTV6ct1+K6P8ArqPooorA3CiiigAooooAKKKKAPO10f8Atj4keI4/7R1Cx8tLdt1lP5TN+7XgnByK2v8AhCP+po8S/wDgw/8Asar6J/yU7xP/ANcrf/0WtdlXVXnJSSXZfkh4LF1qdNxg7K8u38zOL0i0uNI+IT6Z/a2p3ts2lG423tyZMP5oXI6DoPTua7SuV/5qx/3A/wD2vXVVjUd2n5HZjpOUoSe7igooorM4gooooAKKKKACiiigCG6tob20mtbhA8MyFHU9wRg1x/g65m0XU7vwjfOzNb5lspG/5aQk5x+H+PpXbVyfjjSJ57ODWtNGNT0tvOjwD86fxKQOvHb6jvW9Fp3py2f4Poc9eLVqsd1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x	10 \sqrt { 3 }	Geometry	Geometry3K	test
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$m \angle JKL$.	37	Geometry	Geometry3K	test
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$m \widehat {JKL}$.	232	Geometry	Geometry3K	test
+450	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEIAQoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiikAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFUNW1nTtDs/tWpXSW8O4KC3JJPYAcn8KtwzRXMCTwSJJFIoZHQ5DA9wadna4uZXt1JKKKKQwooooAKKKKACiiigAooooAKKKKACiiucv/GMGn301o2i6/O0TbTJb6ZLJG3+6wGCKAOjorkj8QLQMFOgeJgW6A6RNz+lL/wAJ7bf9C94n/wDBPN/hQB1lFMikEsKSBWUOoba64YZ7EdjT6ACiiigAooooAKKKKACiiigAooooAKKKKACuf8UeLbHwzbqrg3F9Nxb2kfLyH+g9/wAs1neKvGw024OkaNGt7rLjBUcpbj+85/p+fvzOmaOba4k1C/na81SbmW4fnHsvoP8APtXVSoac09u3f/gHJWxFnyU9+/b/AIJheI7TUdS0+41rXpvMvPlENuh/d26lhwB6/wCea2NNv9R8DSebbLJe6C53S2ucvb56snt7f/rq/qdgmp2ElpI7IrkEsvXg5q0BhQO2MV0819GtOxMpQ+rwUfjUpNvrZqNvXZ6HcaZqlnrFhHfWE6zW8g4Ze3sR2PtVuvI0h1Dwvfvqnh8bonObrTyfklHqvo3+fY+i+HvEmn+JdPF1YyfMvEsL8PE3ow/r3rkq0OT3o6r+tzWjXU/dlo/62Neiiiuc6AooooAKKKKACiiigAooooAKKKKAPNvGPjFNI+KXhLS/MAiYv9pGeP3v7tM/QgmvSa8Q8c/DO61r4k2U8uv7JNXeUxlbX/j2WFAVA+f5uMc8c817VbJNHawpcSiaZUUSSBdodgOTjJxk9s0AS0UUUAFFFFABRRRQAUUUUAFFFFABRRUN1dW9jayXN1MkMEa7nkc4CijcNiYkAEk4ArzrxB40utWuZdH8LOMKdtzqX8MfqE9T7/l6jP1fxBf+N5HtdPaWy0AHbJN92S69QPRf8n0q5aWdvYWyW9rEscSDhR/nk13U6Kp6z37f5nBVxDqe7Dbv39P8yvpWkW2k25jgBaRzmSV+XkPqTV+iitG23dmKSSsjK8R3M1poc81vIY5FK4YdR8wrUU5RSfSs3xBZz3+jTW9uoaViuATjowNaSjCgHsKnqdk3D6rBK3NzSv3taNv1t8xax7zTLq11AaxocwtdST7w/gnHdXH9f/1jYoqk2jiaubvhXxha+I43t5UNpqkAxPaP1H+0vqv8vyz0teU6ro630kd3bTNaajAcw3MfBB9D6iui8K+NmvbkaNrqLaauowp6R3I9VPr7fl6Dnq0NOaG3bt/wDqo4jXkqb9+//BO0ooorlOwKKKKACiiigAooooAKKKKAOT1//koPg/8A7ff/AEUK6yuT1/8A5KD4P/7ff/RQrrKACiiigAooooAKKKKACiiigAoorn/FHi2y8M26q4NxfzcW9pHy8h9T6D3/ACzVRi5u0dyZzjBc0noX9b1zT/D+nPfajOI4l4UdWc/3VHc15pdy6l40uku9XVrXSkbdb6eDy/o0nqf8/VYbC91bURrHiGQTXf8Ayxtx/qrcegHr/nnrWzXdTgqW2r7/AOX+Z51SpKrvpHt/n/kIiLGioihVUYCgYAFLRRTJCiiigZR1fUDpemyXYj8zYQNu7GckDr+NXVOVB9RWN4s/5Fy4+qf+hCthPuL9BS6nXOlFYWFRLVykvklG35sdRRRTOQKo6ppNrq9t5VwpDKcxyrw0Z9QavUU02ndCaTVmM8O+M7rSLqLRvFEgIY7bXUj92Qdg57H3/P1PooORkV5teWVvqFq9tdRLJE/UH+Y9DVXRvEV94KlSx1R5LvQmIWG6xue29A3qv+R6VnUoqfvQ37f5f5G1Ku6fuz27/wCf+Z6nRUcE8N1bxz28qSwyKGR0OQwPcGpK4TvCiiigAooooAKKKKAOT1//AJKD4P8A+33/ANFCusrk9f8A+Sg+D/8At9/9FCusoAKKKKACiiigAooooAKKCQASTgDvXnXiDxpdavcy6P4WcBVO251L+GP1Cep9/wAvUaU6UqjsjOrVjTV2afinxsNOuDpGixreaw4wV6pbj+859fb8/fmtM0c21xJf307XmqTcy3D849l9B/n2qbStIttJtzHACzucySvy8h9Sav12xUYLlh9/c8+UpVHzT+7sFFFFABRRRQAUUUUAQ3VzBZ27T3LhIlxliM9amByMjpWL4s/5Fy4+qf8AoQrYT7i/QUHTOjFYeFXq3Jfco/5jqKKKDmCiiigApskaTRtHIiujDDKwyCKdRQIxrG81DwNcNNZLJeaE7bprPOWg9WT29vz9R6fpWq2WtafHfafOs0Eg4YdQfQjsfauJrFFvqHhrUH1bw9gq5zc2B+5MPVR2b/PsVUpqr5S/P1LpVXS03j+Xp/keuUVjeHPEun+JrD7TZOVkTiaB+Hib0I/rWzXDKLi7Pc9CMlJXjsFFFFSUFFFFAHJ6/wD8lB8H/wDb7/6KFdZWPqOivfeI9F1RZlRdO8/dGVyX8xAvB7YrYoAKKKKACiiigAqG6u7extZLq6mSGCNdzyOcBRU1Z2uaNa6/o9xpt4uYpl4YdUbsw9wacbXV9hSvZ8u55trXimfxnM9nZ3P9n6Ep2ySswWW69gD0X/J9BesILO2tFgsRGIU4AjORn3PrXOaZolnZ6hcaDq9lGNQteVkyQJ4+zDn/AD+ddLZ2NtYRNHaxCJGbcQCev416TXL7sdv61OOf1eUOZSk59bpJea3Y5ru2RirXESsOCC4BFLHcwSttjnjdvRXBNUptA0u4meaWzRpHO5mJPJ/OpLXRtPsZ/OtrZY5MY3Anp+dSaSjhOTSUub0Vr/f+haknhhIEsqIT03MBmmfbbX/n5h/7+CorzS7LUGRrq3WUoMKSTx+VVh4b0gEEWSZH+03+NLUKccJyL2kpX8krfmjTd0jQu7KqjqWOBUX220/5+of+/gp1zbQ3lu0FxGHibGVPfBzWf/wjej/8+Kf99N/jTJorDOP75yT8kn+bRppIkiBo3V1PQqcioje2oODcw/8AfwUttaw2cCwW8YjiXOFHbNUT4c0hmLGyQknJ+Y/40BTWG5pc7lbpZK/z1/zLFzFZ6tavavIskbYLCNxng57VO9xbwkJJNGhA6M4Brn9d0600vQrqWxi8iRtgLIxzjcPetW40fT751mubZZJNoG4k9PzpHTKlRVOMnOXs25W0V7pRvpe2t+/QtLd2zsFW4iLE4ADjJp8kscK7pJFRc4yxxVCLQNLgmSWKzRZEYMpyeCPxq1eWNtfwiK6iEiBtwBJ6/h9aZzTWG51yuXL10V/lr+ov220/5+of+/gqUOhTeGBTGdwPGKzP+Eb0f/nxT/vpv8a0EtoY7UWyoBCF2BfbpigKywyS9k5PvdJfk2N+22n/AD9Q/wDfwVJHNFMCYpEcDrtYHFZv/CN6P/z4p/303+NXLPT7TT1dbWERBzlgCefzoHVWFUf3UpN+aSX5se91bxsVe4iVh1BcAilS6t5HCJPEzHoFcE1UuNC0y6neee0V5HOWYk8/rRbaJptncLPb2qpKucMCeMjHrS1Hy4Tk+KXNbsrX+/b5FTUrKSyv01jSbtLHU17swCTjurDv/n2I7Xwl40tPEsbW8ii11SEfvrZj1/2kPdf5fqeV1a206W1NxqUatFApbLEjHr0+gqf4ceFo3uX8UXFqIBLkWEH9yPpvPuR09ifUUVUpU259Nv8AIil7ONlTb5nurK1u973v8j0usGbxr4Zg1b+ypdcskvd+wxGUZDf3SegPtW3KrPE6o2xypCtjOD614t4o0nwt4N+H83hW7eC+8SXaeZFL9mxNNI8h2vu524xj73Y+teedh7FqGpWWk2b3moXcNrbJ96WZwqj05NU9F8TaJ4iWQ6RqdveGP76xv8y+5HXHvXL6l4K1HX7DwXb6jLbyW+mBJNSglYnz3WNQMAAhuQ2c9jWWltYL8erOPQYoYhbaa41NbdAqDOdobHG7JT8h6UAepUVS1jU4NF0a91O5yYbSFpnA6kKM4HuelefWXjTxlDFout6rpmm/2Jq08cSw2vmG4gWTlHYngjHJ/DpmgD06ivO28U+L9X8W6/oOg2mkIumPHi6vDJjDLkKQp5YnPPAAB9qyrXx7431vwtd67pulaTawaYj/AGxblnZppIxlxGAeBj1PXjNAHrNFZvh7Vhr3h3TtVEflfa7dJSmc7SRyM/WtKgAooooA5Txv4YfXLGO90/Eer2Pz2zjjeO6H2P8AP6muY0bVU1axEwUxzIdk0R4MbjqDXqVeb+NtGl0LUz4p02ItbyYXUoEHUdpAPX1/+ua7MPU5l7N/L/I4sTS5X7SPz/zJqKjgniuYEnhcPHIoZWHcVJWpzhRRRQMKKKKACiiigDP1qwk1PSpbWJlV3KkFunBBq+owoHoKz9cv5dN0mW6hCGRCoAcZHJArQU5UH1FB0z9p9Xhf4byt62jf9BaKKKDmCiiigAooooAKKKxtXuLu7u4NB0rnULzgt2hj7ufTjP8AnFNK7Jbsh1jp7eNvEP2Tn+xNPcNdOOk8nZAfT1//AFV6wqqiBEUKqjAAGABWdoOiWnh7R4NNs1xHEPmYjl27sfc1pVx1qvO7LZbHfQpezjd7vcgvJJorG4ktoxJOkbNGh6MwHA/E15TqnjHwr4s+Ft7f60dMXV/sskf2UlfOimG4IEB+brg5Hv7167WNL4S8OTal/aMuhac94W3mZrZCxbruJxyffrWJuefal4o1Tw78NfCemC6hstW1SFIPtd021baMKMu2e4DL19fWui8CjwboduulaNrthf6jdMXnlFyjzXMmCSTgk+px259yep1HRNJ1jyv7T0uyvvKz5f2m3SXZnGcbgcZwPyFQWfhfw9p10l1ZaFpltcx52TQWkaOuRg4IGRwSPxoAofEG0mvvh/rtvbqXla0dlVepxzgflXO6d8Q9NsfBvhaPTvI1G+vPs1l9jjuArxttCsWGCQFI9O45r0esm18MaDY6kdRtNGsILw5/fx26q3PXBA4z39aAOV8Ff8lK+IH/AF3tP/Rb1jeDv+SPeLP+umo/+gGvUYLCztrm4uYLSCK4uSDPLHGFaUjgbiOWx2zTIdL0+2s5bOCwtYrWbcZYUhVUfd97coGDnvnrQBh/Dr/knWgf9eUf8q6eora2gs7aO2tYI4II12pFEgVVHoAOAKloAKKKKACmyRpNE8UqK8bqVZWGQQeoNOooA8lubF/BXiAac5Y6NesWspWOfKfvGT/L/wDXWxXX6/odp4i0efTrxfkkGVcDmNh0Ye4/+tXnGkXN3a3c+hatxqNnxu7TR9nHrxj/ADmvQhP2sb9Vv/n/AJnmVKfspW6Pb/L/ACNiiiimIKKKKACiiigDH8TxSTaBPHFG8jkrhUGSfmHatdPuL9Kr399Fp1m91Pu8tMZ2jJ5OKsA5APrQdM5zeHhBr3U5Wfm1G6+Vl94tFFFBzBRRRQAUUU2SRIo2kkYKiglmJ4AHegRT1fVItJ097mQbm+7HGOrsegFdF4F8My6TaS6pqY3axf8AzzE/8sl7Rj0xxn/61YHg/SX8T60PEd7GRptoxXT4mH32HWQj27e/0r02ssRU5V7NfP8AyN8NT5n7R/L/ADCiiiuM7gooooAKKKKAOe1jU7y18Y+G7CGbbbXn2rz02g79kYK8kZGD6V0Ncnr/APyUHwf/ANvv/ooV1lABRRRQAUUUUAFFFFABRRRQAVyXjjwxLrFpFqWm4TWLH54GH/LRe8Z+vb/65rraKuE3CXMiKkFOLjI8u0fVItWsFuEBSQHbLGesbjqDV+q/jPR5PDuqnxPp8ZaznIXUoEHT0lA/n/8AXNSwzRzwpNE4eN1DKw6EGu+6kuaOzPNs4twluh9FFFIYUUUUAYviz/kXLj6p/wChCthPuL9BUd1Db3Fu0d0qNCcZD9KmHA46UHTOsnh4Urapyf3qP+QUUUUHMFFFFABWLJbTeLdeXw/aOy2cJEmozr2XsgPqf89DUmt6jPbrDY2Cebqd43l28Y7E9WPsP89673wr4cg8M6Klmh8y4c+ZczHrLIep+nYUTn7OPN1e3+Y6dP2suXot/wDI1ra2hs7WK2t41jhiUIiKOFA6CpaKK849MKKKKACiiigAooooA5PX/wDkoPg//t9/9FCusrk9f/5KD4P/AO33/wBFCusoAKKKKACiiigAooooAKKKKACiiigBk0MdxDJDMiyRSKVdGGQwPBBryeWyk8Ga/wD2TMzNpN4xewmY/cPeMn/Pb1OPW6yvEWg2viTRptOuhgN80cgHMbjow/z0zW9CryOz2Zz4ij7RXjuv6sclRWPo93dRXE+i6qNup2R2sf8AnqnZx65GK2K62rM4U7oKKKKRRi+LP+RcuPqn/oQrYT7i/QVU1XTxqmnSWhk8sOQd2M4wc9Pwq4BhQPQUup1TqxeFhTT1UpP5NRt+TFooopnKFVr++g02ylu7htscYyfUnsB7mrPSszQdN/4TXxB9qmXOhadJ8oPS5mH81H+eppqyTlLZC1bUY7s2/AXh+cs/ibVo8X92uLeJv+XeHsB6E/y+pruqKK4KlR1JczPRpU1TjyoKKKKg0CiiigAooooAKKKKAOT1/wD5KD4P/wC33/0UK6yuT1//AJKD4P8A+33/ANFCusoAKKKKACiiigAooooAKKKKACiiigAooooA4/xz4Zm1S3i1bSxt1ixG6LH/AC2TvGfXvj8R3rn9J1SHV7BLmL5T92SM9UYdQa9QrzPxjpD+GdXPiSxjJ0+5YLqMKD7jE8SAfXr7/Xjsw9TmXs38v8jhxNLlftI/P/MtUU2ORJokljYOjgMrDoQadWpgZfiG7nsdFmuLZ9kqlcNgHGWA71pqcoCfSszxFaz3uiTQW8ZeViuFBAzhge9aajCAH0pdTsnyfVYWtzc0r97Wjb5b2+YtFFZutaoNLsw0aGW6mYR28IGS7npxVJNuyONtJXZX1H7VreqReGtMbbNON11MOkEXfPuf6j1r1HS9MtdH0yDT7OPZBAu1R3PqT7k8msTwX4YPh7TGkuiJdUuz5t3L1+bso9h/PNdNXLXqqT5I7L8Tsw1JxXPLd/gFFFFc50hRRRQAUUUUAFFFFABRRRQByev/APJQfB//AG+/+ihXWVyev/8AJQfB/wD2+/8AooV1lABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABUc8EV1byW88ayQyKUdGGQwPBBqSigDyQ2kvg7Xv7FuGZtNuSX0+du3PMZPqM/5zxs11fiXw/beJdGl0+4+Vj80MoHMTjow/z0zXnujXtyJZ9I1RdmqWR2yA/8tF7OPUHj8/evQhP2sebqt/8AM8ypT9lK3R7f5FvVNQGmafJdtGZAhA2g4zk4q2DlQfUVjeLP+RcuPqn/AKEK2E+4v0FHU6Z0orCwqLdykvklG35sbcTxWtvJPM4SKNSzMewo8DaLLrGoHxXqURWPlNOgf+BO8hHqe3/6qy7awfxp4h/s1Cw0exYPeyKcCV+0YP8AP8favWI40ijWONVREAVVUYAA6AVNap7OPKt3+X/BMcPT9pLney/P/gDqKKK4T0AooooAKKKKACiiigAooooAKKKKAOT1/wD5KD4P/wC33/0UK6yuT1//AJKD4P8A+33/ANFCusoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuN8deGptQii1rSlxq9iMqAP9fH3Q+vfH4jvXZUVdObhLmRFSmqkeVnlVpq9hqGjrfSMiwnAkWT+BvQ/jUWsXd1NPb6LpQ3ale/KhHSJO7n04zUfxJ8Nz6M1zq2mRk2F8yi8hUcRyZyHHoCePqfcV1ngPw1NpttJrGqLnVr4AuCP9TH2QenbP4DtXe5wjH2i26ev/AOP2XNBU7+9d37W0s166/cb3h7QrXw5o0GnWgyqDLyEcyOerH6/wCArUoorzpScndndGKirLYKKKKQwooooAKKKKACiiigAooooAKKKryX9nE5SS7gRx1VpACP1oA8J+IXivxbpHxRtbO3aCSSBydMzCPmWcBcH15yv4V7zbLMlrClxIJJ1RRI6jAZsckDtzXD+I9H03VviB4X1o3VqVsTN5x81ecLuj79mya7P+09P/5/rb/v6v8AjQBaopAQwBBBB5BFLQAUUUUAFFFY/iTWn0LToLqOFZTJdwW+1jjAkkVCfwzmgDYooooAKKKKACiiigAoorz+/wDHPiC98Q6npXhTw/FqCaWwS6uLi4EYL90UevBGfb6ZAPQKK5fw54503XPB48RXDLp8EbGO5Wd+IXBAIJ79Rj6iqfhTx/b+LfFWsafp4jk06xjjaK5GQZSeG4PbPSgDs2RXUq6hlPUEZFLRSb1DhNw3EZAzzQAtFFN8xPL8zeuzGd2eMUAOoozkZFFABRRRQAUUUUAFFFYniLWZ9Hk0ZYI43F9qUVnJvB+VGViSMHr8ooA26KKKACsS88HeGtQu5Lu80HTp7iU7nlktlZmPqSRzW3RQBzv/AAgXhH/oWtK/8BE/wo/4QLwj/wBC1pX/AICJ/hXRUUANjjSKNY41CIgCqqjAAHQCnUUUAFFFFABXJfEVgnh20Y5wNUsicAk/69Owrra5P4h/8gCz/wCwrZf+j0oAxvE3xj0Lw7I0H2HU7i5HRHtmgXPuZAD+QNZfgz4yLrtxqb6vZSW0MZjFtHZ20twRndu3soPPC44HevU7qztr63a3vLeG4hb70cyB1P1B4rL0Lwnovhq5vZtHsltDebDMiMdhK7sYB6fePTigDN/4WNoP9zVf/BXcf/EUf8LG0H+5qv8A4K7j/wCIrrKKAOT/AOFjaD/c1X/wV3H/AMRR/wALG0H+5qv/AIK7j/4iusooAq6bqEGq6fFe2wlEMoJXzYmjbgkcqwBHTuK5LxDq+ifD2C6k06y83WtYnMsVnEzO9zO38RGThcnnGPau3rySGx8Z6X4+1zX/APhC11eWeYx2VzJqUMfkwLkKFUk4yME9D+ZoA6vwD4TfQvBosNXihmuruZ7q8jKh03uQcY6HAC+2RWP4VtoLT4y+MYLaCOGJba02xxoFUZRTwBXY+Hb/AFnUbCSXXNFGk3KylUgF0s+5MA7ty8DkkY9qxNF0LUrT4oeJtZnttlhewW6W8u9TvKoAwwDkYI7gUAdXfXP2PT7m6xu8mJpMeuAT/SvHvDngH/hK/AcPiQXkieLb2U3UWpPM48oiUgAAHGNoPbv7V7JcQJc20tvJnZKhRsehGDXkdrpXj/S/CR8D2WlmMrKUg12G8VFSEybi20HcDyRjrg9OOQC74l0aLXvjBoum6k8jW7aOzXEUUjIs2Hb5TjB25wce1Z3h/wAEaRf+PPFHh26FxLoWmPDNbacbhxErypktwcnGMDnvXYSeH9RX4o6VqyxNLp1tpLWsly8ilvM3HGQTuJI5zipPD+iajY/EXxbqtxb7LK/Fr9ml3qfM2R4bgHIwfUCgDP8AhA0ieFL+yaV5IrHVLi2g3nJWNduB+protW8X6Xot99ku1vjLtDfuLGaVcH/aVSKzfh3omo6FperQ6lb+RJPqs9xEN6tujbbtb5ScZweDzXYUAcn/AMLG0H+5qv8A4K7j/wCIo/4WNoP9zVf/AAV3H/xFdZRQByf/AAsbQf7mq/8AgruP/iKP+FjaD/c1X/wV3H/xFdZRQB4fpn7QAhvZrfWtIZ4VlZVntDtbaDxmNu+PcfSup1fxVp3idfC01gl6q/25bk/aLSSMfck6MRtJ+hNdNpHgfw3olw91ZaTbi6dzI1xIvmSbickhmzj8MVU8cf67wt/2HoP/AECSgDrKKKKACiiigAooooAKKKKACiiigAqjquk2us2sdvdhzHHPHOu1sHcjBl/UCiigC9RRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVUvtMs9Sa1N3F5htLhbmH5iNsiggHg89TweKKKALdFFFABRRRQAUUUUAFFFFABRRRQB//2Q==	<image>Find the area of the kite.	336	Geometry	Geometry3K	test
+451	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	<image>Find the area of the figure in feet. Round to the nearest tenth, if necessary.	34.6	Geometry	Geometry3K	test
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$x$.	\frac { 97 } { 6 }	Geometry	Geometry3K	test
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	<image>In $\odot F, m \angle D F A=50$ and $\overline{C F} \perp \overline{F B}$. Find $m \widehat{A C E}$	230	Geometry	Geometry3K	test
+454	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	<image>Find x	8 \sqrt { 3 }	Geometry	Geometry3K	test
+455	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	<image>Find the area of the trapezoid.	132	Geometry	Geometry3K	test
+456	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	<image>Find the area of the shaded region. Assume that the polygon is regular unless otherwise stated. Round to the nearest tenth.	1208.1	Geometry	Geometry3K	test
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$PR \parallel  KL$, KN = 9, LN = 16, PM = 2 KP, find PR	\frac { 50 } { 3 }	Geometry	Geometry3K	test
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$m \angle CAD$.	44	Geometry	Geometry3K	test
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rectangle is inscribed into the circle. Find the exact circumference of the circle.	10 \pi	Geometry	Geometry3K	test
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pxkrbb6dSKmIpupBxd99teh6lRXHfYvHd7/rtV02wU9reIyH/AMeH9aP+EIvbof8AEz8U6rPkcrC3lL+XIrD2EF8VRfK7/S34m/tpv4YP52X63/A6q5vrSzUtdXUECjqZZAo/WsW68c+GrMfPqsLn0hBk/wDQQar2/wAPPDUD+Y9k88mclppmbJ9xnBrZtND0mx5tdNtIT/eSFQfzxmi2HXd/cv8AMP8AaH2X3v8AyOfPxBtbjjTNH1W/z0aK3+U/j1/Sj+3PGN4cWfhiK2U9Hu7gHH1Awa7DpRR7akvhpr5tv/IPZVH8U/uSX+Zx39n+Or0fv9Z0+wU9raHef/Hh/I0v/CDT3RzqfibVrnPVY5PLU/8AAecV2FFH1qovhsvRL/hw+rQfxXfq3/wxy9t8PfDVswY2Bmf+9NKzZ/DOP0q7d+ENAvLA2baZbxxk7gYUCMD65HNbdFQ8RWbu5P7ylh6SVlFfcc7oHgnR/Ds5uLVJZbgggSzsGZQewwAB+VdFRRUVKk6kuabuy6dOFOPLBWQUUUVBYUUUUAFFFFABRRRQBj+K38vwlqxzjNpIPzUj+tHhNPL8JaSvPNrG3PuoP9az/iHcGDwXeqv35ikSj1ywz+gNdBYW4tNPtrYAAQxLGAO2ABXS9MOvNv8ABL/M51riH5Jfi3/kWKKKK5joCiiigArJ8Q6DH4isFsZ7qeC33hpBDgF8dASQeM8/lWtRVQm4SUo7omcVOLjLZnJ2vw48NW5Be0kuGA6zTMf0GBUeoy6ZoOow6Zonhq3vtWljMwhjCRBIwcbnkI4GeB1zXYV5st9q7fFLxHDo9nbT3a21siy3chSKJApY52gsSSwwB6HmtJV6tR2lJv5kQoUoJuMUvkdf4c8QJrsFyj2clleWcvkXNrIQxjbGRgjggg8EVj3p/sz4oWFweItStGtz/vqc/wBFH41d8K64+p3WqWd9p8Njq9lKqXawncsgIyjhsAkEevSofH9pK+hR6lbD/SdMnW6THoDz/j+FaYe3tOV/aVvvX+ZniU+TmX2Xf7v+AdXRVewvItR0+3vITmKeNZF+hGasVzNNOzOhNNXQUUUUhhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcb4x/wCJjr/hzRRyHuvtUo9FQf1G6uyrjNBP9t+OtX1rrb2aixtz2JHLH88/g1dnXTiPdUafZfi9f8jmoe85VO7/AAWgUUUVzHSFFFFABRRRQAVxN+l74a8b3muR6Xeahp+o20cc32JPMlikjyAdmclSD29K7aihaO4dLHI+EdOvX1nXPEV/aSWb6nJGsNtLjzEijXALY6E9cdq6uWJJ4XhlUNHIpVlPcHgin0U2xepxnguZ9KvdQ8LXTnzLNzLak/xwsc8fTP6+1dnXI+NNOuITbeJNNTN9pxy6j/lrD/Ep+mT+BNdHpepW+r6bBf2r7oZl3D1B7g+4PFdOIXOlWXXf1/4O5z0HyN0X029P+BsW6KKK5TpCiiigAooooAKKKKACiiigAooooAKKKKACiiigArB8X6ydF0CaSHJu5/3Fso6l24BH06/hW6SACSQAOpNcPpufGHi9tXYE6TpZMdpnpLL3f8OP/HfeujDwTbnL4Y6v9F8zCvNpKEd5f038jofC+jLoPh+1sePNVd0pHdzyf8PoK2KKKxnNzk5S3ZrCKhFRjsgoooqSgooooAKKKKACiiigAooooACAQQRkGuDBbwDr5yD/AMI7qEmeOlrKf/Zf6fTnvKr39jbalYzWd3EJIJV2sp/p6H3rajVUG1LWL3/rujGtTc0nHSS2/rsydWV0DowZWGQQcgilrgrC/u/A1/HpOrytNosrbbO9b/ll/sP7f56dO8VldA6MGVhkEHIIorUXTd1qns+4UqqqLs1uuwtFFFYmwUUUUAFFFFABRRRQAUUUUAFFFFABRRXJeIvEty15/YPh5fP1WTiSQcpbL3Zj0z/L8gdKVKVSXLH/AIYzqVI043l/w5B4n1K51rUB4V0aTEknN9cDpDH3H1P/ANbvx1Wm6dbaTp0NjaR7IIV2qO59SfcnmqHhvw9b+HdO8iM+bcSHdcXB+9K3r9PQVs1pWqRsqdP4V+L7/wCRFKnK7qT+J/gu3+YUUUVzm4UUUUAFFFFABRRRQAUUUUAFFFFABRRRQBXvbG21GzktLuFZoJBhkb/PB964sLq/gOQ+WsupeHs/dHMtqP6j9Pp37yjrW1Ks4LlavF9P62ZjUpKb5k7Ndf63RS0vVrHWbNbqwuEmiPXHVT6EdQau1yep+ClF42peH7ttK1DqfLH7qT/eX/I9qgTxjf6I62/inTHgGcC9thvhb3Pcfz9hWjoKprRd/Lr/AMH5fcR7dw0rK3n0/wCB8/vOzoqpYapYapD5tjdw3Cf9M2yR9R1H41brmaadmdCaaugooopDCiiigAooqOe4htYWmuJo4YlGWeRgoH4mhK4tiSo554raB555UiiQbmdzgKPUmuVvfHlvJObPQLSbV7zp+6BEa+5b0/T3qCHwpqmvTJdeLL7fGDuTTrY7Yl/3iOv+ea6VhuVc1V8q/H7v8zneI5ny0lzP8Pv/AMrjLvxBqfiqd9O8Lq0NqG2z6nICAB3Ce/6/TrXRaD4esfD1l5FqpaR+ZZ35eQ+pP9K0be3htIEgt4kihQYVEXAA+lS0qla8eSCtH8/UqnRtLnm7y/L0Ciiiuc3CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKa6LIhR1DKRgqwyDTqKAOXvvAOiXUvn2scunXI6S2b7Mfh0/ICq39j+M9MGLHXra/jHRL6LDY/3hkk/jXY0V0LFVLWlqvPU53hqd7x0floccdd8Y2nF14XiucdXtroAH6A5NOPjW/jLCXwlrII/uQlh+eK6+in7am96a+Tf+YexqLao/ml/kccPHN0ykp4U1tvpbn/AApW8S+KJyRaeEJVHZp7lV/QgfzrsKKPbUltTXzb/wA0Hsqj3qP5Jf5M4423jvUSRLeabpcR/wCeCGRx+eR+op0Hw/spZVn1q/vdWmHP7+QhAfZQeB7ZxXX0UfWqi0haPorfjuH1aD1neXq7/hsQWlla2EAgtLeKCIdEjUKP0qeiiudtt3ZuklogooopDCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9k=	<image>Find x. Assume that segments that appear to be tangent are tangent.	12	Geometry	Geometry3K	test
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$x$.	5	Geometry	Geometry3K	test
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diameter of $\odot S$ is $30$ units, the diameter of $\odot R$ is $20$ units, and $DS=9$ units. Find $RC$.	4	Geometry	Geometry3K	test
+463	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	<image>Find the area of the figure. Round to the nearest tenth.	28.3	Geometry	Geometry3K	test
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$\odot M$, $FL=24,HJ=48$, and $m \widehat {HP}=65$. Find $m \widehat {PJ}$.	65	Geometry	Geometry3K	test
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is a diameter, $AC=8$ inches, and $BC=15$ inches. Find the circumference of the circle.	17 \pi	Geometry	Geometry3K	test
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$x$.	70	Geometry	Geometry3K	test
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$x$.	65	Geometry	Geometry3K	test
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\angle BAC=38$, $BC=5$, and $DC=5$, find $m \angle DAC$.	38	Geometry	Geometry3K	test
+469	/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADtANsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKyLTxFZ3viW/0KGOc3NjGkk0hUeWN/IUHOc49q164P4cA3954n11h/wAfupvHG3rHGNq/1oWr+X+X+YPb+v66HeUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAISACT0FZPh3xFaeJtJ/tOyjmjtjI8amYAFtpwSME8cVH4w1L+yPB+r3wOGitXKf7xGB+pFeR6ZqF9/YvhPQNTtLrSvDF5+5lmD7JLqQ/Nhu6xsxx2JHPShatr0/Eb0V/60PW9K8VWWuapc2mmw3NxBbHbJfIq/Z9/91WJyx+gI963Kgs7K206zitLOCOC3iXakca4VRU9AgooooAKKKKACiiigAooooA810uy8daBa3+i2mk2l2txcTSxatLfBVTeeC0eCxI9uK7HwroEfhjw3Z6THIZTCpLyEY3uTlj+ZNbNFC0Vv60B6sxNa8TQaLeW9o2n6heTzozqlnCJCACAcjIPeqH/AAm//Ur+Jf8AwA/+yqW9/wCSh6V/14z/APoS10tdD9nGMbxvddzntUlKVpWSfbyRyv8Awm//AFK/iX/wA/8AsqP+E3/6lfxL/wCAH/2VdVRU89P+T8R+zq/z/gcr/wAJv/1K/iX/AMAP/sqP+E3/AOpX8S/+AH/2VdVRRz0/5PxD2dX+f8Dlf+E3/wCpX8S/+AH/ANlR/wAJv/1K/iX/AMAP/sq6qijnp/yfiHs6v8/4HK/8Jv8A9Sv4l/8AAD/7Kj/hN/8AqV/Ev/gB/wDZV1VFHPT/AJPxD2dX+f8AA5X/AITf/qV/Ev8A4Af/AGVH/Cb/APUr+Jf/AAA/+yrqqxtX8UaZoziGaVprxvuWluvmSv8A8BHT8cVUXCTtGF/myZKcVeVS3yRnf8Jv/wBSv4l/8AP/ALKqNz8UNKs5zBdaVrMEwGTHLbqrY9cF6teT4o8R/wCvk/sHT2/5ZxHfcuPduifhyKXVfDul6H4O1n7FbKsrWku+dzukc7T1Y81so0E1GS1fZ/r/AJGMniGnKL0Xdfp/nYj8daff+KfCNtZaXbNIl9PA0+51Qxw5DEnJ56DgZNXfGvhiPxN4RudLRQs6qHtWzjZIv3ee3p9DWvo//IEsP+vaP/0EVdrhkt4+Z3xlszG8Kvq7+GrIa7am31JI9kyl1fcRxuypI5HNbNFFNu7uJKysFFFFIYUUUUAFFFFABRRRQAUUUUAc1e/8lD0r/rxn/wDQlrpa5q9/5KHpX/XjP/6EtdLWtTaPp+rMqe8vX9EFFFFZGoUUUUAFFFYur+KdM0eT7O8j3F633LS2XzJW/AdPxxVRjKTtFXJlOMVeTsbVYmseKtL0eQW8kjXF63CWlsvmSsf90dPxrM+zeJ/Ef/H3N/YWnt/yxgYNcuPd+ifhzW3pHh7S9DjK2FqqO335W+aR/qx5Na8kIfG7vsv8/wDIy55z+BWXd/5f52MYQeJ/EI/0qUaFYN/yygYPcuPd+idunNbOkeH9M0RGFjaqkj/fmb5pHP8AtMeTWnRUyqya5Vouy/rX5lRpRT5nq+7/AK0+QVjeLf8AkUNY/wCvST/0E1s1jeLf+RQ1j/r0k/8AQTSpfHH1Q6v8OXoy5o//ACBLD/r2j/8AQRV2qWj/APIEsP8Ar2j/APQRV2pl8TLjsgoooqRhRRRQAUUUUAFFFFABRRRQAUUUUAc1e/8AJQ9K/wCvGf8A9CWulrmr3/koelf9eM//AKEtdLWtTaPp+rMqe8vX9EFFFYmreKtN0qb7Lue7vj920tV8yQn3A6fjURhKTtFFynGKvJm3WHq3ivTNJmFqXe6vm4W0tV8yQn3A6fjWd9i8TeIub+4/sWwb/l2tW3TuP9p+i/hW3pOg6ZocJj0+0SIn70nV3+rHk1pywh8Tu+y/z/yM+ac/hVl3f+X+f3GMLTxN4gGb6caJYt/ywtm3XDD/AGn6L+FbWk6FpuiRFLC1SMt9+Q/M7n1Zjya0aKmVWTVlouyKjSind6vu/wCvyCiiiszQKKKKACsbxb/yKGsf9ekn/oJrZrG8W/8AIoax/wBekn/oJrSl8cfVGdX+HL0Zc0f/AJAlh/17R/8AoIq7VLR/+QJYf9e0f/oIq7Uy+Jlx2QUUUVIwooooAKKKKACiiigArlviDrV7ofhKafTJfL1CaWK3tm2hsO7AdCCDxntXU1wnjb/iY+MfB+igZU3j30g9BEuRn8TStdpf15/gO9k2avgDV73W/BtnealL5t8GkinfaFyyuy9AAB0HauXi8Y63rPxVs9O025EWgjzVcCNSZ/LBDNkgkDedowR901T03VLmx0rWfDGnOV1W71y4tbb1ijbDtJ9FUk/XFafhHS7aH4katHaJi10XT4NOhPu3zsfrnr9apayUvK/4f8Fff5Casmv63t/XodFe/wDJQ9K/68Z//QlqxqvizTdLn+yKZLy/PC2lqvmSE++On41xnj6S+vfEEradNJDDpdsi3s0BJdFlbJwBjOFAOMjvWnong3VdOskfR/FcKQTKHEiaXExkB5BLE5P4mu72VPkjKpLptr69E+5we2qe0lGnG+u+nps2uxpCx8SeIBnUbkaNZN/y7Wjbp2Ho0nRfwrb0rQ9N0SAxafaJDn7zjl3/AN5jyaxf7B8Wf9Dp/wCUuL/Gj+wfFn/Q6f8AlLi/xrKVpKymkuy5v8jSLcXf2bb7vl/z/I6qiuV/sHxZ/wBDp/5S4v8AGj+wfFn/AEOn/lLi/wAaz9lD+dfj/kae2n/z7f8A5L/mdVRXK/2D4s/6HT/ylxf40f2D4s/6HT/ylxf40eyh/Ovx/wAg9tP/AJ9v/wAl/wAzqqK5X+wfFn/Q6f8AlLi/xo/sHxZ/0On/AJS4v8aPZQ/nX4/5B7af/Pt/+S/5nVUVyv8AYPiz/odP/KXF/jR/YPiz/odP/KXF/jR7KH86/H/IPbT/AOfb/wDJf8zqqxvFv/Ioax/16Sf+gms7+wfFn/Q6f+UuL/GsXxXYeJbHQJhceKvtYuGW2W2GnxJ5pc7du4HI4z+VaUqUedWmt/P/ACM6taXs5Xg9v7v+Z2+j/wDIEsP+vaP/ANBFc/4F1nUdeGt3t3P5louoyQWS7FG2NOOoAJyfXNamqXI8P+D7q4Zs/YbJjn1Kpx+orN+G2nnTfh9pETg+ZLD57565clv61zbyk/61f/AOraKX9aL/AIJ1dFFFIYUUUUAFFFFABRRRQAVkv4etZPFMXiF5ZzdRWptUjLDy1UnJOMZ3duv4VrUUeYHP6d4N0rTfFWoeIofOe+vRhvMYFY+mdgxkZwM5JqxpOhWXh59Uu4pp3a+uGu7h5mBwcdBgD5QBx1+tbFc543upIvDrWdu2LnUZUs4vq5wf/Hc1dOPNJRXp8iak+WLk/Uh8Fwm70i71a5TL6tcPOVcDiP7qKfbaP1qHRZG8Ma6fDlwzGwuS0umSsfu92hz7dRXU2drHY2UFpCMRQxrGg9gMCqHiHRY9d0p7Yt5VwhElvMOsUg5VhWvtVKbUvhf4dvuMfZOME4/Evx7/AH/matFYnhnWn1aweO7TytStH8m7i6bXHcex6itusZRcXys2jJSXMgoooqSgooooAKKKKACiiigArldX/wCJr440jTOsVijahMCMjd92Pn1BJNdVXK+Ef+Jhe6zrzci7ujDAc5HkxfKpH1Oa2pe6pT7L8/6ZjV95xh3f4LX87Gv4g0SDxHodzpN1NPDBcgK7wMA+AQcAkEdvSuYj+GSQxrHH4y8YJGgCqq6pgKB0AGyu6orE2uQ2lv8AZLOC2Es03lIqeZM+53wMZY9ye5qaiih6gFFFFABRRRQAUUUUAFFFFABXLXX/ABNfiDZ23WDSbc3Enp5r/KoP0GTXUMwRSzEBQMknsK5fwUpu7bUNdkXD6pdNImVwREvyoD+AP51tT92Mp/L7/wDgXMamsow+f3f8Gx1NFFFYmxyfiW3m0XUY/FNghYRKI9RhX/lrD/ex/eXr9PpXT21xDd20VzbyCSGVQ6OvQg9DUjKHUqwBUjBBHBFcjpDHwtrx0CYn+zbxml06RuiNnLQ/1H/163X7yFuq/Ff8D8vQwf7ud+j/AAf/AAfz9Tr6KKKwNwooooAKKKKACiiigDF8Wai2l+GL64jz57R+VCB1Lv8AKuPxOfwq3oenLpGh2VguP3EKoxHdsfMfxOTWJr+NU8WaHowwY4WOo3Az2ThPzY/pXVVtL3acY99f0X6mMfeqSl20/V/p9wUUUVibBRRRQAUUUUAFFFFABRRRQAUUUUAc941vZLXwzPDBj7TestnAM4y0h28fhk/hWxp9lHp2m21lF/q7eJY19wBiuf1H/ia+PdMsgSYdNha8mHYu3yoPqOTXU1tP3YRj8/6/rqYw96cpfL/P+vIKKKKxNgrL8QaLDr2lPaSN5cqkSQTDrFIPusP89K1KKcZOLuhSipKz2MPwxrMuqWUlveqI9Tsm8m7j/wBodGHsw5rcrlPE1tPpF9F4o0+NneBfLvoV/wCW0Hc/7y9f/wBVdLa3UN7aRXVvIJIZUDow7g1pUivjjs/wfb/IzpyfwS3X4rv/AJk1FFFZGoUUUUAFFFZfiTU/7H8O318Dh44j5fu54X9SKcYuTUV1FKSinJ9DK8Mf8TLXtd1tslGn+x25P/POPgkexYk/hXU1leG9M/sfw5Y2JGHjiBk/3zy36k1q1daSlN22/wAiKMXGCvv/AJhRRRWZoFFFFABRRRQAUUUUAFFFFABQSAMngUVg+Mb+Sw8L3hgybmcC3gUHku52jHvyT+FVCLnJRXUmclCLk+hU8Gj7cdV15uf7Ruj5RP8Azxj+RP5GupqnpVgml6TaWMf3beJY8+pA5P4mrlVVkpTbWxNKLjBJ7/r1CiiiszQKKKKAEIDAggEHgg1yOlk+FPEJ0SQ40q/ZpNPbtFJ1aLP6j+prr6zNe0aHXdJlspGMb8PDKv3opB91h9D/AFrWlJL3ZbP+rmVWDfvR3X9W+Zp0Vg+F9Zm1G0ls78BNVsW8m6T1PZx7MOa3qicXCXKy4TU48yCiiipKCuW8T51LXdD0RclHnN5cYx/q4uQD7FiB+FdTXK6CP7T8W65rBw0cDLp9ucdAnL/+PGtqOl59l+O3/BMa2tod3+G//A+Z1VFFFYmwUUUUAFFFFABRRRQAUUUUAFFFFABXK6x/xNPHGj6Zw0NkjahOCM/MPlj/ABySa6quV8I/8TC91nXm5F3dGGA5yPJi+VSPqc1tS91Sn2X4v+mY1fecYd3+C1/Ox1VFFFYmwUUUUAFFFFABRRRQBy3ie0n028h8T6fGzzWq7LyFf+W8Hf8AFeororO8g1Czhu7WQSQTIHRh3BqcgEEEZB7Vx+n/APFJeIv7Jc40jUXL2TdoZf4ovYHqP/11uv3kLdV+K/4Bg/3c79H+D/4P5nYUUUVgblDW9RXSNDvb9iP3ETOue7Y4H4nAqp4T05tL8MWNvLnz2TzZiepd/mbP4nH4VQ8Xn+0LzRtBXkXl0JZxjI8qL5mB+pxXU1s/dpJd9fu0X6mK96q320+/V/oFFFFYmwUUUUAFFFFABRRRQAUUUUAFFFFAGL4t1F9L8MX1xFnz2TyoQOpdztGPzz+FW9E05dI0Sy09MfuIlQkd2xyfxOTWJrpGp+L9E0fIMcBbUJ19l+VP/HjXVVtP3acY99f0X6/eYx96pKXbT9X+n3BRRRWJsFFFFABRRRQAUUUUAFZ2uaPBrukzWM5K7vmjkXrG45Vh9DWjRTjJxd0KUVJWexgeFtYnv7aaw1IBNWsG8q5X+/6SD2YVv1y/iiynsbmHxLpsZa6s123MS/8ALeD+IfUdRWtLrVovh2TWopA9stuZ1b1AGcfXt9a1nHmtKC3/AD/rYyhLlvGb2/Fd/wDMyNJ/4mnjnV9RPMVgi2EPORu+9IfrnArqawPBljJY+F7Uzg/abnNzOT1Lud3P4ED8K36VZrnstlp9w6KfJd7vX7wooorI1CiiigAooooAKKKKACuQ+IWs6lpel6fbaPc/ZtR1G/itYpfLWTYCeTtYEHgV19ea+Nra/wBf+Ivh/R9M1EWFxZ28t+bjyVm8s5CqdhIB6EfjS6pf13H0b/r+rl+bw947toJJx8QUlMaltkmjQqrYGcEg5ArY8Ca/d+JvB1jqt7EkdxKGDhAQrbWK5GfXFcP4607xjofhW4vr7xmdSs1ZEntBp8dsZUZgpUOhyM57V6jplrBZaXa21tbrbwRxKqQr0QY6VS2Yn0OK03xBbWvibW9QvrbUN8sqwW+y1dwIkGMggfxHJra/4TjS/wDn31P/AMAZP8K6WitpVKcndx/H/gGEadSKspfh/wAE5r/hONL/AOffU/8AwBk/wo/4TjS/+ffU/wDwBk/wrpaKnmp/yv7/APgFctT+Zfd/wTmv+E40v/n31P8A8AZP8KP+E40v/n31P/wBk/wrpaKOan/K/v8A+AHLU/mX3f8ABOa/4TjS/wDn31P/AMAZP8KP+E40v/n31P8A8AZP8K6Wijmp/wAr+/8A4ActT+Zfd/wTmv8AhONL/wCffU//AABk/wAKP+E40v8A599T/wDAGT/Culoo5qf8r+//AIActT+Zfd/wTmv+E40v/n31P/wBk/wo/wCE40v/AJ99T/8AAGT/AArpaKOan/K/v/4ActT+Zfd/wTmv+E30s/8ALtqX/gDJ/hXFHzrzUJPDulW13/Ymo3MczedA8f2cBt0ijI6HGRXrVFaU68ad+WP4/wDAM6lCVS3NL8PvW/U5nx9rVx4d8FX19YMI7tQkVuQoOHZgowDwcZrI/wCEe8fJaic/EBDIE3mN9HhC5xnBYHOPfFQ/FCOfVrrw14dtLkW9xe33m+YYw+xY1JyVPBwSDg+lWm8G+Kr2N7bVfHtzcWUilZYrfTobd2B6jeMkVyq7TZ1PRpGp4C8Q3Xifwhaapexolw5dH8sYVirEbh9cV0tVdN0610nToLCyhWK2gQJGg7AVaqpWvoSgooopDCiiigAooooAKyIfDtnD4pufEIkne8uLdbYqzDYiA5+UYzyeuSa16KPMDI8SeHbTxRpQ069lnih81Jd0DKGypyOoIx+FawGABnOKWigAooooAKKKKACiiigAooooAKKKKACiiigAooooAyLnw7aXXiez16WSY3NnC8MMeR5YDdWxjOe3WteiijyAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9k=	<image>JKLM is a rectangle. MLPR is a rhombus. $\angle J M K \cong \angle R M P$, $m \angle J M K=55, \text { and } m \angle M R P=70 . Find $m \angle K L P$	160	Geometry	Geometry3K	test
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$\odot P$, the radius is $2$ inches, find the length of $\widehat {RS}$. Round to the nearest hundredth.	4.54	Geometry	Geometry3K	test
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	<image>Find the perimeter of $\triangle W Z X$, if $\triangle W Z X \sim \triangle S R T, S T=6$, $W X=5,$ and the perimeter of $\triangle S R T=15$.	12.5	Geometry	Geometry3K	test
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	"<image>Equilateral pentagon $P Q R S T$ is inscribed in $\odot U$.
+Find $m \angle P S R$"	72	Geometry	Geometry3K	test
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\| \overline{DC}$. Find $AB$.	7.5	Geometry	Geometry3K	test
+474	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	<image>Quadrilateral ABCD is a rectangle. Find x	12	Geometry	Geometry3K	test
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klQ5R1DKfY0+vPPY3CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKyvE119j8M6jNnBEDKD7sNo/U1q1yHxIufI8LeUD/AK+dEP0GW/8AZRW2Hjz1Yx8zmxlT2eHnLsmcD4W8TL4anuZvsX2lplCj97s2gHJ7HOePyq3dzar4/wBbh8q18qJAEyoJWJc8lm7n/Cuy+HmnxJ4VSaSJGaeZ3yyg8D5f/Za68AAYAwB2FehXxkIVpOMPe2vf9Dx8Ll1Srh4RqVPcetrfPcbFGsMKRJwqKFH0FPooryT6HYKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//2Q==	<image>Express the ratio of $\cos P$ as a decimal to the nearest hundredth.	0.47	Geometry	Geometry3K	test
+476	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	<image>Find the area of the shaded sector. Round to the nearest tenth.	1.8	Geometry	Geometry3K	test
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y. Round to the nearest tenth, if necessary.	7.4	Geometry	Geometry3K	test
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is the centroid and $BE=9$. Find $BQ$.	6	Geometry	Geometry3K	test
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	<image>Find the measure of $\angle CFD$ on $\odot F$ with diameter $\overline{AC} $.	123	Geometry	Geometry3K	test
+480	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x.	33 \sqrt { 3 }	Geometry	Geometry3K	test
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	<image>Find the perimeter of $\triangle R U W$ if $\triangle R U W \sim \triangle S T V$, $S T=24, V S=12, V T=18$ and $U W=21$	63	Geometry	Geometry3K	test
+482	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	<image>Find the perimeter of the parallelogram. Round to the nearest tenth if necessary.	44	Geometry	Geometry3K	test
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	<image>Find x. Assume that segments that appear to be tangent are tangent.	2	Geometry	Geometry3K	test
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a Pythagorean Triple to find x.	70	Geometry	Geometry3K	test
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	<image>Find the area of the parallelogram.	552	Geometry	Geometry3K	test
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$x$.	12.5	Geometry	Geometry3K	test
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$m\angle R$	58	Geometry	Geometry3K	test
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x. Round to the nearest hundredth.	16.64	Geometry	Geometry3K	test
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is the area of $▱ ABCD$?	48	Geometry	Geometry3K	test
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	<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.	180	Geometry	Geometry3K	test
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PK3zSP9W/p0rXoqJ1pSXKtF2RcKEYvmer7v8ArQKKKKyNgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvOof+KH+IRgPyaLrrbk/uxT+ntkn8mHpXotYXi/w8niXw7cWPAuB+8t3P8Mg6fn0Psa2ozSfLLZ7/wBeRjXg2uaO61X+XzN2iuY8CeIX17QAt3ldSsm+z3aN97cONx+uPzBrp6znBwk4suE1OKkuoUUUVJYUUUUAFFFFABRRRQAVynhbx1a+K9b1nTrSzmRNLk8t7hmBWQ7mUY+u0mt3WdQXSdDv9RbGLW3kmOe+1Sf6V5t8BNPaLwhfalJky3t43zH+JUAAP/fRegD1SVGkidFkeJmGA6AZX3GQR+YrzzU/hPFqN+163iC/e5J3eZcKsh46enHtXo1FaU6s6esHYyqUYVdJq5wQ8LeN7MYsvGYlA6C4tR/XdS+V8TbTkXGiXw9CCpP6LXeUVft290n8kR9XitpNfNnB/wBv/EG15ufClrOo729yBn8NxNH/AAn+sQf8fvgjVogOrRAyD89oFd5RR7WD3gvx/wAw9jNbTf4P9Dgx8WNDjIW7sdUtG7+dbjH6NV+D4meEp8D+1fLY9pIZB+u3FdYQCMEZB7GqM+h6TdZ+0aXZTZ/56W6N/MUc1F7xa+f/AAA5a62kn8v+CVIPF3hy5x5WuaeSega4VT+RNakF5bXQzb3EMo/6ZuG/lWFceAvC1znzNEtRn/nmDH/6CRWZP8KfCspzHbXFuf8AplcNx/31mi1F9Wvl/wAEL110T+b/AMjtqK4P/hWMVv8A8g7xJrdqe2LjIH5AUf8ACG+LLXmz8cXL+guIN36lj/Kj2dN7T/Bh7Wqt4fiv+Ad5RXB/YPiXbcprGkXgHaWLYT+SD+dH9q/Ei2/1vh/TLpR3gm2k/m/9KPYdpL7/APMPrHeL+7/I7yiuD/4TfxLb8Xnga/46tbyGT9Av9aP+Fp2EHF/oms2h777cYH5kfyo+r1Oiv80H1ql1dvkzvKK4y3+KfhOb79/LCfSS3f8AoDWpb+N/DFzjy9cshn/npJ5f/oWKl0ai3i/uLVek9pL7zfoqpb6rp13j7Nf2s2enlzK38jVus2mtzRNPYKKKKQwooooAKKKKACiiigAooooAKKKKAPO9fU+C/HFt4jiBXS9SIt9QUdEfs/8AX8G9a9DBDKCCCDyCO9UNb0i313RrrTbkfu5027scqeoYe4ODXNfDzVrhrS58OamcalpLeUQT9+L+Fh6gdPpt9a6JfvKfN1W/p0/yOaP7qry9Jar16/5na0UUVznSFFFFABRRRQAVw3xR8aX/AIJ0Gzu9Ngtpbm4uhDi5VigXaxPQjnIHf1ruaxPFXhXTPGGjNpmqI5j3CSN42w8bgEBgfoT145oA5j4w6v8A2Z8M7uKSRBdXpjt1C8AkkF8D02q351t/DvSzo/w+0SzZdr/ZhK47hnJcg/i1cvp/wT0iK+trjVdW1HVY7Yjyre4ceWAOgPU49hivT8YGBQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFa406xu8/abK3mz/wA9Ilb+YrLuPBfhm5/1mh2Iz/zzhCf+g4rQ1fVLXRNIu9TvWK21rE0r46kAdB6k9APU0mjarb65o1pqlqsi291GJYxIAGAPqATVKclsyHThLdHOXHwu8JT526c8JPeOd/5EkVU/4VVpcPNjq2r2h7eXcDA/8dz+tdF4p8VaZ4P0c6nqjSeTvWNUiUF3Y9gCR2BPXoK07K7jv7C3vIQwiuIllQMMHDAEZ/OtFiKq+0zN4ai/so4r/hBPEFvzZ+OdSXHRZ1Mg/Vv6Uf2N8Rrb/UeJdPuVHQTwBf5IT+td5RT+sT6pP5IX1aC2bXzZwf2z4mWvDabo96B3RypP5sB+lH/CXeMbTi88ESyept7gN+gDV3lFHtoveC/H/MPYSW03+D/Q4P8A4WYbf/kI+F9btfX9xn+e2pYfix4XkbbLLdW57iW3PH/fOa7eopraC4XbPDHKPR1Dfzo56T3j+IclZbT/AA/4Jz9v8QPClzjy9atxn/noGT/0ICtSDX9GusfZ9WsJSeyXCN/I1BP4U8PXOfO0TT2J7/Z1B/MDNZk/w18JXGSdIVD6xyuv6BsUfuH3X3P/ACD/AGhdn96/zOqVldQysGB6EHNLXCN8JtAVi1rc6laN6w3AH8waT/hXupwcWPjTWIQOiyMXH5bgKOSk9p/h/wAOHtKy3h+P/DHeUVwf/CO+PbXi08XwTj0uLYc/oxoz8TbP+HRL7/vpc/8AoNHsU9pIPbtbwf8AXozvK4DxzazaBrFj4zsIyTbkQ38a/wDLSI8ZP8v++fSn/wDCSeO7Tm78HRTD/p3uRz+Raobrx1dTWc1rq/gnWI7eVDHIFQupBGDztFaUqU4SurNeqM6tanONndPpo9/uO8tbqG9tIbq3kEkMyB0cd1IyDU1eY/CzxAA1z4bn85ViZpbH7Qu1zHnlSPUdce59K9OrGtTdObizehVVWCkgooorI1CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8y+Kngm31TRNW12fVtVDW1sZY7NZx9nDIvB2Ed+/NdN8Of+SdaB/wBeafyp3xD/AOSd+IP+vGT+VZXhuzvtR+C9hZaZcJb3s+mCOKVyQEJGM5AJH1FAHn/xGlfxrp3iHXVdv7F0LZaWO08TztKglk9wAcD8D617N4Z/5FTR/wDrxh/9AFeL+KfDXjjw18LrrTry/wBEOh2yRq8Nsj+a2ZVwclRzuIJ59a9Y8BR6rH4L0wavNbyzmBDGYAQBFtGwHIHOOtAHSUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZ2va1a+HdDu9XvRIbe1Te4jALHkAAZIGSSO9aNeX/AB31P7H4BWzVsNfXSRlfVVy5/VV/OgDu/D+v2viLw/ba1bRzQWtwrOq3ICsACRk4JA6Z69KwtH+JWkeIfEkui6PaahemE4kvIo0+zqP724sDjPHTntmvKZ/E03i+TRfhz4evUsdMWFLa4vGyDcFE+bH+ycHA43HrgV7f4Y8L6Z4S0ePTdLh2RjmSRuXlbuzHuf5dqANmiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooArajp9rqunXFhexeba3CGOVNxXcp6jIII/Ck07TrXSdOt9PsYvKtbdBHFHuLbVHQZJJP41aooAo6xo9hr+lT6ZqcHn2c+PMj3su7DBhypBHIHerNtbRWdpDawJshhRY41yThQMAZPPQVLRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFeLfFq1Pir4i+F/CaysisrSyMgyVDnk/ULGT+Ne01zf/CE6afHX/CXPPdvqAi8pI2dfKQbdvA25zjPfuaAPP8A4l/D+00Hwpp+seGLf7Lc6E4kLoMu6ZBLse7BsH6E16T4S8RQeKvDFjq8GAZ0/eoD9yQcMv4HP4YrXngiureW3njWSGVCjowyGUjBB/Cue8HeCdP8E2t1a6bd30tvcSCUx3MisEbGCVwo6jGc56CgDpaKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD//Z	<image>Use a calculator to find the measure of $∠J$ to the nearest degree.	40	Geometry	Geometry3K	test
+492	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	<image>Find y	6 \sqrt { 2 }	Geometry	Geometry3K	test
+493	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x.	4 \sqrt { 2 }	Geometry	Geometry3K	test
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pair of polygons is similar. Find x	8	Geometry	Geometry3K	test
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MY6bhkn+LpXbUUAeefFbwZrPjW10my0uW3jhinaS4MzkAcAK2ADnHzfnXReGvCq6E0l3d6hdanqs6BZ7y5c5IHO1F6IuewroaKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/2Q==	<image>In the figure, $m∠1 = 50$ and $m∠3 = 60$. Find the measure of $\angle 4$.	50	Geometry	Geometry3K	test
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$KL$.	12	Geometry	Geometry3K	test
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parallelogram ABCD to find $m\angle DAB$	101	Geometry	Geometry3K	test
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$m \angle ABC$.	51	Geometry	Geometry3K	test
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BC	4	Geometry	Geometry3K	test
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AFFFFABRRRQAUUUUAFFFFAH//2Q==	<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.	528	Geometry	Geometry3K	test
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VJ=3$, and $ZT=18$. Find $SJ$.	6	Geometry	Geometry3K	test
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$x$.	30	Geometry	Geometry3K	test
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4bHGkUaxxoqIowqqMAD2FOoorE3CiiigDM1/X9P8ADOjT6pqc3lW8Q7cs7dlUdya4Hwzo2r+N/E1v418SQta2Vt82kacTyo6iRvfofUkA8ADOt8SfCOt+K/7G/sibT1WxuTcyR3xbZIwxs4VTkfeyDjrUdra/FUXcJutQ8MG2Ei+aI1l3FM84+TrjNAC3nw58L+IPG2paxqVx/aM7qivY+dhYCFCgkKQ2cL39TWR8Prb/AIRn4m+KPCdlJIdKjiju4InYt5RYKSBn/fx77RV3V/CPirSfGl94k8H3Ont/aKKt1aX27buAwGBH0z1HU9a0/A3g6/0K81TWtdvIbzW9TcGZ4Qdkajoq5APp27AdskA7WiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAqjrX/IC1D/AK9pP/QTV6qOtf8AIC1D/r2k/wDQTTW5pS+OPqiDwx/yKmj/APXlD/6AK1ayvDH/ACKmj/8AXlD/AOgCtWh7jr/xZer/ADOE8af8j14K/wCvib/2nXd1wnjT/kevBX/XxN/7Tru62q/BD0f5s46X8SfqvyQUUUVgbniGn+FLTxX8X/F9nqzzNYRPHM9tHIUErYwhYjnABb860vCtkPC/xC8SeDYL2VNDfTjeR+a+fsxO0E5PAHznn2XNbniLwl4itfGLeK/CFzZLeXEIgvbW9z5coGApGO/A7jp15Ip/hnwHfJNrmq+KruG61XWoTbTC2yEhhIxsUn2x2/hHXkkAxx8HfCEfgu6EDNeXPkySRal5xJDAEjAU7cD0xzzXRfCjVbrWPhxpdxeyNLOgeEyOclgrlQSe/AA/CuVt/BfxG0zQJvCVhqmkNozh40u5A4mSJicrgDgnJ9cZ4Ir0jwzoNv4Y8OWWjWrF47aPbvIwXYklmx7kk0Aa1FFFAHn2qf8AFJfEm11QfJp2tj7Pc+izD7rfjx/49XoNYXjDQR4j8M3dgAPP2+ZAfSReR+fT6E1B4G146/4Xt55iftcH7i5B6h17n6jB/Gt5+/TU+q0f6f5HPD3Kjh0eq/X/ADOkooorA6AooooAKKKKACiiigAoorjPHHxEsvBFzYW09jcXs94GKJARkYIA69ck8fSgCPxvY+NNRuUt/D9xHBYNEPMZZBHIXycjd1xjHTHeuY0Lwl4v0B/OttE0Ka6zk3Ny7SSZ9Qd2B+AFT/8AC7ov+hT1r/vgV1Hgzx2PGM93Gmi31gLZVYvcgANkngfka6I4mUYciSsc08LGU+dt3Kf2v4m/9A7Qv++n/wDi6PtfxN/6B2hf99P/APF13dFL2391Fewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdH2v4m/8AQO0L/vp//i67uij2391B7B/zv7zhPtfxN/6B2hf99P8A/F0fa/ib/wBA7Qv++n/+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/wD8XR9r+Jv/AEDtC/76f/4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/APxdRzy/Em5t5YJdN0IxyoUYB3HBGD/HXf0Ue2/uoFRad1N/eefWh+JFjZQWkGm6EIYI1jQF3OFAwP4/QVN9r+Jv/QO0L/vp/wD4uu7oJwMnpR7b+6hui27ub+88u1PSviFq2q6XqM9lpCzaa7PCEkIVi2M7ssc/dHTFa32v4m/9A7Qv++n/APi6o618ZNLtNTfTdB0281+8Q4YWg+T0OGAJP1Ax71BpPxntJNYi0vxFod7oM8pCq1wSVBPTduVSo98EeuKbxDaScVoQsMk21J6+Zq/a/ib/ANA7Qv8Avp//AIuj7X8Tf+gdoX/fT/8Axdd3RS9t/dRXsH/O/vOE+1/E3/oHaF/30/8A8XR9r+Jv/QO0L/vp/wD4uu7oo9t/dQewf87+84T7X8Tf+gdoX/fT/wDxdH2v4m/9A7Qv++n/APi67uij2391B7B/zv7zhPtfxN/6B2hf99P/APF0fa/ib/0DtC/76f8A+Lru6KPbf3UHsH/O/vOE+1/E3/oHaF/30/8A8XUXg3RPE+leKNQvdStbOK01HLzJbSfKsg5DAEk85Oee/tXoFeWXfxusIdUvbK20DUrz7LM0LSwYYNgkZ9gcUe3fK4qK1EsOuZScm7HqdFeUf8Lui/6FPWv++BXqNpObmzgnaJojLGrmN+q5GcH3FYHQTUUUUAFFFFABRRRQAV4T4x8Q6XD8fdPn1i68jT9IhUM2xnw+xnXhQTnc6/lXu1eJfDbTNP8AGPjrxhrupWNtfW32jy4FuYlkXDMxBAYEZCqoz70Adn/wuPwF/wBB0/8AgJP/APEV1+malaaxptvqFjIZbW4QPE5QruX1wQCKzv8AhC/Cv/Qs6N/4ARf/ABNbEEENrbx29vFHDDGoSOONQqoo6AAcAUASUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXmXxm8SXemaDaaHpbEX+sSmEbPveXwCB6Fiyj6E16bXi3xZlGmfE7wbq15xYRSIWc9F2SgsfwBB/CgD0Dw14e0X4eeFljaS3t1jUNeXspCeY5OMsx7ZOAO1c746l8CeOdKgs7nxXpdtJBL5kc6Txsy8EFeT0OR+QrvNS0zTfEWkPZ30Ud3YThWK7ztcAhgcg9MgGvnvxlpfhG98f6H4b8K2cKg3Kx3s0Ls6sWZRtySR8oBJx6+1AH0Vp8AtdNtbdZTMsUKIJD1fAAz+PWrNHSigAooooAKKKKACiiigCjrOoLpOh3+ovjba28kxz/ALKk/wBK8P8AhD428LeFtAv/AO2tV8jULu6Lsv2eVyUCjBJVSOpavQfjJqf9nfDTUFDYku2jtl/Fst/46rU/wT4F0CHwTowvtB0y4u3tUklkntI3csw3EEkZOM4/CgDU0D4geGPFGoNYaNqRublYzKU+zyphQQCcsoHUj866as7T/D+i6TM02m6RYWUrLsZ7a2SNiuc4JUDjgflWjQAUUUUAFFFFABRRRQAyaPzYZI97JvUruU8jPce9eV/8M/eFP+ghrX/f6L/43Xq9FAHlH/DP3hT/AKCGtf8Af6L/AON16lbW8dpaw20QxHEgjQegAwKlooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArH8TeF9L8W6S2m6tCZIt25HQ7Xjb+8p7GtiigDymH4G2MQ+znxLrP2DPNssgUEenTH6V0mnfC/wzpOsaVqVhbywS6ariNFYFZSwILSEgsx545GOK7KigAooooAKKKKACiiigAooooA5zxj4L0/xvp9vZalcXkUMEvnAWzqu5sEc7lPYn866FEWNFRFCqoAAHYU6igAooooAKKKKACiiigD/9k=	<image>Find the measure of $\angle 1$.	65	Geometry	Geometry3K	test
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the value of the variable t.	5	Geometry	Geometry3K	test
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$x$ so that the quadrilateral is a parallelogram.	4	Geometry	Geometry3K	test
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$AB$.	23	Geometry	Geometry3K	test
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AooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//Z	<image>Find $m \angle 1$ in the figure.	113	Geometry	Geometry3K	test
+508	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	<image>Quadrilateral ABCD is a rhombus. If $AB = 2x + 3$ and $BC = x + 7$, find $CD$.	11	Geometry	Geometry3K	test
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UngaJRjhcjA/LitKU1TmpGGJpUfYypr3pPr0Xp1f4L1IPDOuReIvD9pqUWA0i4kQfwOOGH5/pitavFfhTrcmkasdKuiVtdQZljJ6JOnVfqRj/AMdr2qniaXsqjS26HHha3taak9+oUUUVgdAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcN8VpnPhWGwiPz315FAB69W/mortYIUt7eKCMYjjQIo9ABgVw/jz9/4q8G2fVWvjKw/3Ch/qa7yt56UoL1f6foc9PWtN+i/X9QooorA6AooooAKKKKACuX+I+pf2T8PNcugcMbZoVPoZMIP/AEKuoryj49X7R+E9P0uLJmvr0fKP4lUHj/vpkoA4rwzp58O+JfhrfFdrX0Eisf7293x/47Ktdn8VNRufEWt6X8PtKkxNeyLLfOvPlxjkA/gC5HsvrVH4uQDwzYeB7+FN66NcLGoHGQoQgf8AkOm+CYrqy8LeJviXq/8AyEr6GZ7Yn+BBnGPQFgoHso9aYDvg7YW03jbxVqdom2ztttja+8YOB+O2NM/WvZ680+Bmm/Yvh4t0w+a+upJs9yBhB/6Afzr0ukAUVT1PVrDRrNrvUbqO3gX+Jz1PoB1J9hXFzeJfEXi0mDwnZm008na2qXQ25HfYp/nyfpWsKUp67Lv0MqlaMNN32W50fiLxfpHhmLN7PuuGH7u2i+aR/wAOw9ziuW/s/wAVeO/m1N30PRG6WsZ/fTL/ALR7fjj/AHT1rd8O+BdM0KX7bMX1DVGO57y5+Zt3qoOcfXk+9dTV+0hT/h6vu/0Rn7OdX+Jouy/VmbougaZ4fsxbabapCn8TDlnPqzdTWlRRWDbk7s6IxUVZBRRRSGFFFFABRRRQB4zNoEl5qPi/TbXKX9hdrqVjt6gnLED6grj3Ar0zwnr8fiTw5a6iuBKw2TqP4ZB94f1HsRXO2n+i/Gq/HQXemK31IKj+SmoLP/iiviJLZt8mj66d8B/hjn7r7ZJx/wACX0rvq/vI262TX3a/5nnUv3Uubpdp/fo/0PQ6KKK4D0QooooAKKKKACiiigAooooAKKKKACiiigAooooA4PxV83xK8IKegMx/Qf4V3lcH4w/dfEHwbMejSyx/+gj/ANmrvK3q/BD0/VnPR+Ofr+iCiiisDoCiiigAooooAKp3ukabqckEl/p9pdvbktC08KyGM8cqSODwOnoKuUUAVNQ0rTtXgWDUrC1vYVbesdzCsihsYyAwPOCfzpZdNsJtO/s6WytpLHYE+zPEpj2jGBtxjAwOParVFAGRqssXhvwreTadaQxR2du7wwRRhUUgEj5RwBnmvm241nU7u/N9Pf3D3Rbd5vmEMD7en4V9TTRRzwyQyorxyKVdWGQwIwQa8zuPgtp8l+ZINVnhtS2fJMQZgPQNn+YNd+Cr0qafOedjqFWq1ybEfgTw9D4ts18Q+IrifUp1kMUUM5zGgXHOO/8AL1Br1JEWNFRFCqowFAwAK89l8Eat4XkN74Mv328GXTrptyS49Dxz+X1HStTQfH9lqN1/ZuqwvpOrKdrW9xwGP+yx9fQ/hms66dV88Hddu3yNMO40lyTVpd+/zOvooorkO0KKKKACiiigAooooAKKKKAODvPl+Nlhj+LSjn/vp/8ACtrxt4f/AOEi8Nz28QxeQ/vrZhwRIvQZ9xkfj7Viy/vvjZDj/lhpXP8A30f/AIqu8rpqScHCS3SRy04KanF7Ns57wX4g/wCEj8NwXUhxdx/ublehEi9Tj34P410NeeSf8UX8SRJ9zSdf4b+7HcA/1J/8ePpXodRWilLmjs9f69C6E248st1o/wDP5mbr+uWfhvRLnVtQZhbW6gsEALHJwAASMkk1HP4isLbwuPEUxlSxNstyfky4RgCOB35FedfF/wAE28+gat4kl1bVXlhEbxWbTg26HKpwmOOMng9a9C8I/wDIl6F/2Drf/wBFrWJucl/wu/wX/wA/F5/4CtXZ+H9esfE2jQ6rprO1rMWCF12n5WKnj6g1yvxH1a6l/s3whpUpTUdckMcki8mG3H+sf8sj6Bq7HStMtNF0q202xjEdtbRiONfYdz6k9SfU0AXKKKKACiiigAooooAKKKKACiiigDgviV/os3hrVD9211NAx9jgn/0Cu9rkviXYG/8AAl/tGXg2zr7bSM/+O7q3dBvxqmgaffZyZ7dHb/eIGR+ea3lrRi+za/U54aVpLuk/0NCiiisDoCiiigAooooAKKKKACiiigAooooAKyNe8M6T4ktfJ1K1WQgYSVeJE+jf06Vr0U4ycXdEyipK0ldHnOzxZ4D/ANWX1/Qk/hP+vgX+oH4jj+Gut8P+KdJ8S23m6dchnAy8D/LIn1X+o4rZrktf8Bafqtz/AGjp8r6Xqynct1bfLk/7QHX6jB+tb88Knx6Puv1Rh7OpS/h6rs/0f+Z1tFee2/jHWfC06WXjKzLQE7Y9Utl3I3+8B3+gB9u9d3Z3ttqFqlzZzxzwOMrJGwYGs50pQ1e3foaU60Z6Lft1J6KKKzNQooooAKKKRmCqWYgADJJ7UAcHoX+mfF3xFdLyltax24PoTtJ/VTXe1wXwxBvINc1xgQdR1B2XP9wcj9WI/Cu9rfEaT5eyS/A58NrT5u7b/EwfGPh9fEnhu5sQB9oUebbsf4ZF6fnyPxqDwL4gbxB4bikuCRfWx8i6VuDvXufqOfrn0rpa87vv+KM+I0WoD5NJ1391cf3Y5+zH6k5/4E3pTp+/B0+u6/VCq/u5qp02f6M0Pi1/yS/XP+ucf/oxK2/CP/Il6F/2Drf/ANFrVzVtJsdd0ufTdSg8+znAEke9l3AEEcqQRyB3qe0tYLCygs7ZNkEEaxRpknaqjAGTyeBXOdJ5r4Sf/hIvjJ4q1mTmPSkXTrcHnbyQxH4o/wD33XqFZWjeG9J8PPePpdp5DXkvnXB8x3Lvzz8xOOp6Vq0AFFFFABRRRQAUUUUAFFFFABRRRQBDd20d7Zz2swzFNG0bj1BGD/OuM+F91ImiXmiXJ/0nSbp4GH+ySSD+e78q7mvP7o/8Iz8V4Lk/LZa9F5TnsJlwB/7L/wB9mt6XvQlD5/d/wDnre7ONT5P5/wDBPQKKKKwOgKKKKACiiigAooooAKKKKACiiigAooooAKhu7uCws57u5k8uCBGkkcgnaoGSePapqZMkcsMkcyq0TKVcN0II5zQBjzeIPD154XfWLi8tZdEdSGmkGY2G7bggjnnjGK5X/hErmxVNd8BaiYorhRL9imJ8mdTyMbumR0z68EV5v4D0qHxL4rm8JPqa3HhrSrua+hgGf9KAYKv1Xof+BH1yPowAKoVQAAMADtWkKsobbGdSlGpvv36nHaJ8QLW5u/7M123bR9VXgxT8I5/2WPr7/gTXZVma34e0vxDafZ9StUmUfcfo6H1VuorjPsXivwH81g767oa/8u7/AOvhX/Z9fwyPYda05YVPg0fb/J/5mXPUpfHqu63+a/yPRqKw/D3i3SPE0O6wuMTqMvbSfLIn1Hce4yK3KxlFxdpI3jOM1eLugrm/HuqjR/BeozhsSyR+RH67n+Xj6Ak/hXSV5/4qP/CR+PdF8Np81taH7deDtx90H+X/AAOtKEU5pvZa/cZYiTVNpbvRfM6XwjpR0Xwnptiy7ZEhDSD0dvmb9Sa26KKzlJybk+prGKjFRXQKxfFegx+JPDl1pzYEjLvhY/wyD7p/ofYmtqiiMnFqSCUVKLi9mct4B16TWvDyxXeRqNi32a6Vvvbl4BP1A/MGuprzzWf+KN+INtra/JpesYt7z+6kvZj/AD/76r0OtK0VdTjs/wCmZUJOzhLeOn+TCiiisTcKKKKACiiigAooooAKKKKACiiigArmPHugvrvhmVbYH7dasLi2K9d69h9RkfXFdPRVQm4SUl0InBTi4vqYfhHX08SeHLXUAR52Nk6j+GQdfz6j2IrcrziY/wDCAeOTcH5NA1p8SH+G3n9fYc/kT/dr0frWlaCT5o7Pb+vIihNyXLL4lv8A5/MKKKKxNgooooAKKKKACiiigAooooAKKKKACuY8c6PrviDQxpOi3dtZpctsvJ5WYOIe4QAHJPuRxx346eigDzqT4byaT4r8M6r4Za1t4NNi+zXcczMDNETyRhSGc7nPOOcV6LRRQAUUUUAcr4i8Cabrc3223Z9O1RTuS8tvlbd6sBjP14PvWNF4r17wjMlp4utDcWRO2PVLZcj23j/9R9jXodMlijnieKaNJI3GGR1yGHoQa3jW05Zq6/rZmEqGvNTdn+D9UZ7+INMGhTa1HdxzWMUZkMkbZzjt9e2Oua5n4dWFxcQ3/ifUFxeatKXQH+CIH5QPb+gWuL1/wvFqPi670PwgrpGkXmX8RmIt94OQv1z27E9sGu10Lx5bQzR6Lr9l/Yl/EoRUcYhYDgbW7D07e5reVLlpv2et/vSOaNbnqr2mlvub9TuKKAQQCDkGiuE9AKKKKAMnxLocXiLw/d6bLgGVcxuf4HHKn8/0zWP8Pdcl1TQWsb7K6lpj/ZrlG+9xwpP4Aj6qa66vPPEQPg/x1Z+JI/l07UcWt+B0Vuz/AKA/8BPrXRS9+Lp/Nev/AATmrfu5qr02fp/wD0OigEEZByKK5zpCiiigAooooAKKKKACiiigAooooAKKKKAM7XNGtdf0i4028XMUq8MOqN2Ye4Ncr4L1u606+fwfrzYv7Uf6JMelxF2we5A/T3Bru65vxh4VTxHYxyW8n2fVLU+ZaXKnBVhzgkdj+nX670pq3s57P8GYVYST9pDdfiu3+R0lFcl4P8WPq/maVq0f2XXbT5Z4W48zH8a/1x9Rwa62s5wcJcrNKdSNSPNEKKKKgsKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuU8a+KJNGtotO0xfO1u+/d20S8lc8bz/AEz39gaueK/FNp4X07zZB513L8ttbL96Vv8AD1P9azPB3hi6guZfEWvnzdbvBnB6W6H+Eehxx7Dj1zvTgor2k9u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the figure, KL is tangent to $\odot M$ at K. Find the value of x.	9.45	Geometry	Geometry3K	test
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$\triangle XYZ$, $P$ is the centroid, $KP=3$, and $XJ=8$. Find $YJ$.	8	Geometry	Geometry3K	test
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$QM$.	12	Geometry	Geometry3K	test
+512	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	<image>Find the area of the figure. Round to the nearest tenth if necessary.	2256	Geometry	Geometry3K	test
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$m \angle 6$	35	Geometry	Geometry3K	test
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$LK=4,MP=3,PQ=6,KJ=2,RS=6$, and $LP=2$, find $JH$.	4	Geometry	Geometry3K	test
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$m\angle V X W$	65	Geometry	Geometry3K	test
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the figure, $m ∠1 = 58 $, $m ∠2 = 47 $, and $m ∠3 = 26 $. Find the measure of $∠5$.	47	Geometry	Geometry3K	test
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$A B C D$ is inscribed in $\odot Z$ such that $m \angle B Z A=104, m \widehat{C B}=94,$ and $\overline{A B} \| \overline{D C} .$
+Find $m \angle Z A C$"	9	Geometry	Geometry3K	test
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$x$.	22.5	Geometry	Geometry3K	test
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$m \angle 3$.	66	Geometry	Geometry3K	test
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$x$.	1.4	Geometry	Geometry3K	test
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gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//2Q==	<image>Find y.	16 \sqrt { 5 }	Geometry	Geometry3K	test
+522	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	<image>Find the area of the rhombus.	136	Geometry	Geometry3K	test
+523	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	<image>Find x. Round the angle measure to the nearest degree	98	Geometry	Geometry3K	test
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y	6	Geometry	Geometry3K	test
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$x$.	4.5	Geometry	Geometry3K	test
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AooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/9k=	<image>Find $y$ so that the quadrilateral is a parallelogram	14	Geometry	Geometry3K	test
+527	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	<image>Find y.	\frac { 28 \sqrt 3 } { 3 }	Geometry	Geometry3K	test
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Ml3KQpPdR/wDXJr0Os7QdOXSdCs7FR/qogD7nualv9VsdLEJvrlIPOkEUe7+Nj0AoxFT2lVyDDUvZUow/rzLlFRzTxW8LTTSLHEoyzucACsGLx54VmuhbR67ZtMTjbvxz9elY+RudFRSKwZQykEHkEd6WgAorMtfEWkXurT6VbX8Mt9ACZYVOWXHrWnQAUUUUAFFFFABRRRQAUUUUAFFY0ni3w/FI0b6xZq6nBBkHBqay8Q6PqVx9nstStp5sZ2RuCcUAadFUjq1gNWGlm6jF8U8wQn7xX1q27BEZ26KMmjpcPIdRXlFhP4w8fy3mpabrY0jTopmit40XJfaerV0fgDxHqWqjUdK1kIdT0ybypZEHEg7Ghag9DtCAQQRkHqDXmXivwrd6DqH/AAkfhzKFDumhTt6kD09q9NpCAQQRkHqDW1GtKlK626ruYV6Ea0bPfo+xz/hTxXa+JrAMpEd3GMSwk8g+o9q6GvMvFXhW70DUP+Ej8O5Qod00KdvUgentXWeFPFdr4msA6ER3aDEsJPIPqPata1GPL7Wl8P5GVCvJS9jW+L8zoaKKK5DsCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArk/F3ja18OxG3gxPqLjCRDnb7n/Cs7xb47NrMdI0IfaNQc7C6DIQ+3qaXwj4E+xyjVtbP2jUXO4K5yEP8AU12U6MacfaVtui6v/gHDUryqS9lQ36vov+CZ/hvwZea1ejXfE7NI7ndHbt+mR2HtXpSIsaBEUKqjAAHAp1FY1q0qru9u3Y6KFCNGNo79X3CiiisTYKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDzj4oafJbtYeILYYltpArkemciu60jUI9V0m1vYyCs0Yb8e9M1zTU1fRbuxcZ82Mgex7Vxfwu1J1t73Q7g4mtJCVB9M4P612/xcN5w/JnD/CxXlP80eiUUUVxHcFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXls3/FT/ABcVPvW2ndfT5f8A7I16JrGoLpWj3d85AEMRYZ7nsPzxXEfCrT2NnfaxMCZLqXarHuB1/Un8q7MP7lOdX5L5nDif3lWFH5v0R6LXmlrP/wAJh8WJ2J36doCbUHZpjwT+HNehajc/Y9Murn/njC8n5AmvN/ghEZNA1PUH5lur1izHqcAf/Xrjj8Xov+Adz+H1K/xiu7m81DQfDMMrRRX8w84qeo3AD+tamsfCfwsvhe4ht7BYrqKBmS5BO/cBnJNd7PYWlzPHNPbRSSxfcd0BK/Q1w/xJ8cQ6Lp8mjWANxrF6hijhj5KBuMn+lS9ItLd/0ilrJPoiH4M6vc6n4NaC6kaR7OdoVdjklcAj+ddF438SDw14dlniG+9nPk2sY6tI3A/KqPw18My+FPCEcF3gXUzGef8A2Se34CsbSQfHnj+XWJAW0bR2MNoD0kl7vVzXNLl+/wDUiGiv936HJ/CqwutN+KWqW19JvultmMrf7RIJr3SWaK3jMk0iRxjqzsAB+JryTwr/AMl58Rf9cm/mtem69pUet6De6bKBtuIig9j2P54pN/u4tdv1ZVvfafcvRTRTxiSGRJIz0ZGBB/EUyO7tpZmhjuInlT7yK4LL9RXg3hbx5c+FfCWo+HSjyazDcmCzixk5Y9fwOa9M+Hvg8+G9La6vm83V70+ZcytyQTzt/Cna+q2E9NHudnRRRSA5weM9PPjVvC2yX7YIvM34+XpnH5Gujrxxf+Tjn/69x/6AK9joWsE+4PSTQVFdSiC0mmPSONm/IZqWs3xAs8nh3UUtY2lne2dY0XqzFSAKmfwscd0eRfDbwFoninR73VNYtWmkku3CEOR8o/8Ar16PoXw+8O+HNRF/plm0VwFKbi5PBrznwt8O/F954ejgvNXm0aGNmMdsg+YknJZsVp+DPEGveHvHEng3xFdm8Drutrhup4yPwIrTrZf1oS9m2bfxQtpbC1sPFVkCLrSpgXI/iiY4YH/Peu10+9h1XS7e8hIaG4jDj3BFUfFtot74R1a3cZDWrn8QMj+Vcx8G7973wBbxyElraR4efQHj9KmOqcfn945dH8igvhTxn4WvLyLwpdWcum3UhlEVzwYSeuPWuk8EeE5vDdrdT39yLrU76TzbmUdM+g9q6uihaA9QooooAQgMCCAQeoNeZ+KvC134f1D/AISPw7lNh3TQr29Tj09q9NpCAwIIBB4INbUa0qUrrbqu5hXoRrRs9+j7GB4U8V2niawDoRHdIMSwk8g+o9q6CvMfFPha88Pah/wkfh3cgU7poF7evHpXXeFfFVp4msBJGRHdIMSwk8g+o9q1rUY8vtaXw/kZUK8ub2Nb4vzOgooorkOwKKKKACiiigAooooAKKKKACiiigAorF8V65L4c8P3GqxWhuhBgvGDg7fWqfgjxjb+NNFa/hhMDpIUeItkqaFre3QHodNRSEhVLEgAckmvPbL4oLq/jNtA0jTHukRyr3O/CgDq30oWrsHS56HRRUF3eW9havc3UqxQoMszGmlfRCbSV2Su6xozuwVVGSScACvNPEfjK916+OheGFZyx2yXC+nfB7D3qpqWt6t8QNROl6Krwaap/eSnjcPU/wCFd94c8M2HhuyENqgaUj95Mw+Zz/hXaoQwy5qmsui7epwSqTxT5aekOr7+n+Zn+EvBVp4dhE8uJ9QcfPKedvsK6qiiuSpUlUlzSep2U6UaceWCsgoooqDQKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAqhqGtaZpTol/fQWzOMqJHxkVfrn/EXgrQ/FM0MurWzTPCpVCHIwDS1GiX/hMPDn/Qas/+/oq3Za5peorK1nfwTrEN0hjfO0e9cB4h+HfgPw7olzqd1YMEiXIXzTlm7AVY+Fvg9NL8P3V7cQmJ9VBJgz/q4j0H1xTWt/IT0sdYfGHh0HB1mz/7+ilHi/w6SANZsyT0/eiufPwg8GsSTpz5PP8ArTXD6n4E8PX/AI5tfD2g2hjFsRNf3G8tsHZR70LdIHs2d5488S6jYHTNJ0MoNQ1STZHM/IRfWufvLjxh4BurG+1TWhq+m3Eywzo64MZbuK6jxl4Pl1yzsJtLuRa6lprBrWRuRwMYNc//AMIr4y8UX9mviy5s4tOtJBL5NryZWHTNEd/n+A3t8vxPTUYOiuvRhkV5broPhP4l2upoNtren95jpzwa9SUBVCgYAGBXI/EfRv7U8MSSxrme0PmrjrjvXVhJqNTle0tPvOPGQcqXNHeOq+R1ysGUMDkEZBpa5rwJrP8AbPha2kZszQjypPqK6WsKkHCTi+h0U5qpBTXUKKKKgsKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKRmCqWJwAMk147N8dkF3NDBoM0yxuV3K+cjPWlfWw7aXPY6K8a/4XuV5k8N3QXud3/wBauw8HfE3RfGFwbSBZLa9A3CGX+Iex71SVxPQ7WiiikBwHxV1JodFttMiOZbyXlR1Kjt+JI/Kus8PaaukaBZWKjmKIBvdu5/OuAvP+Kn+LcUA+a20/r6fLyf8Ax416lXZX/d0oUvm/mcOH/eVp1fkvluZ2vRNN4d1KJPvPayqPrtNcH8DnB8Ezx/xR3bg/pXpjKGUqRkEYIrzD4cRHw74w8SeGZflHm/arcH+JD6fhiuOPxPzX5M7pfCvJm98Q/GEvhbSoYrGPzdTvn8m2T0Pr+oqj4F+Hw0iU65rkn2zXLj53kfkRZ7D396PH3gLVPFmsadf6dqsVi1kvyb0JIbOcjH4Vl/8ACDfEb/ofT/3waUdLvr+g5a6dD0HxDZXWo+Hr+yspBFczwskbk4wTXl+k+C/iToenx2On6xZQ26ZwoHc9TXfeD9G1/R7W4j17W/7VldwY3wRsGOnNdLTtZivpY+dPDth4ub4qahBDqEK6rHzdyno6ZGQK9313W7Xw5oc+pX8gWOFM47u3YD61z2keCbnTfiJqfiZ7yJ4bxCqwhTuXJHU9O1J4r8E3vi3X7GS8v4l0W1YObNVO6Rvc9KNeWMf6Q9OZs8jsbm+sPiDpHi/WbGOK11admQFfugnAP15Br6RUhlDA5BGRXJeO/BKeLvDsOnW8sdrNbuGgkK5CAcEcV0GjWt1ZaNaWt7Mk9zFEEeVAQGIHXmmrctu23oJ3vfuM13T59V0S6sba7e0mmTas6dUNeXf8Kh8Sf9DlP+b/AONexUVNtbjvpY+Zh4K1Q/E9vD/9uSfbRHu+25bONoOPWu3/AOFQeJP+hyn/ADf/ABqRbaf/AIaIeXyX8v7MDv2nGNg7169TXwJg/ia/rYz9D0+bS9FtbK4u3u5oYwrTP1c+tN1/WI9A0O71SWF5ktk3sidSM4rSqC9s4dQsZ7O5QPDMhR1PcGiTbu1uKNla+xneGPENv4o0G31a2jaOObPyMQSuDjmvNfERW++PujRW5y9vEDKV7cE8/mKlh+HfjLw1JNB4W8QImnysWWKXqma6HwN8Pn8OX1xrGrXv2/WLnh5eyg9cU1bmUuwO6i49zq9fcR+HdTdugtZD/wCOmuD+B0TJ4JmkI4ku3Zf5VvfE7VBpngS/2n99cgW8SjqWY/4Zq54D0Q+H/BmnWDjEqxh5P95uT/OlHeT9F+oS2S9To6KKKACiiigAooooAQgMCCAQeCDXmXinwteeHdR/4SPw7lAp3TQL29ePSvTqQgMCCAQeCDW1GtKlK626ruYV6Ea0bPfo+xgeFfFVp4msBJGQl0gxLCTyp9R7V0FeYeKfC954c1H/AISLw7lVU7poF6D149K7Dwr4qtPE1gJIyEuUGJYSeVPr9K1rUY8vtaXw/kZUK8ub2VX4l+Jv0UUVyHYFFFFABRXkur/GyLT9bvNOg0aW5FvIU3o/3sd8VWX48RxsDc+HbpI+53Y/nSTurobTTsex0VzHhPx7onjCMiwmKXCDL28nDD/GunqmrCuFFFFICvfWcWoWE9nMoaKaMowPoRXh/wAL7mXwn8RtT8MXRKpMxVAem5en5iveK8P+MmnTaF4l0vxZYrh9wWQj+8vTP1HFJPlkm9noO3NFr5nR/Fzxo2j6auhaaxbUr4bSE6oh4/M1pfDDwSvhTQRNcoDqV2A8zHqo7LXG/DPw7d+LPEE/jXXl3guTbow4Leo9h2r22qS5VruxN8zstkZ+sa1ZaFYPd3soRB0Xux9AK8luNYm8fa0Ir2/j0/S4zkIz4yP6mvU9X8NaVrjq+oW/msowp3EYrCm+F3hyXlI54z/symu7C1aFJXd+bvbY87F0cRVlaNuXtff1NvRV0PS7BLXTri1WNR2kXLH1Na6SRyD5HVvoc159L8JNNJzBqF1EfYA1Wf4XX8X/AB6+IJl9N24fyNS6dCbv7TXzRcauIgrey08memUV5h/whfjO0/49fEG7HT5yP50fYfiVadLtJwPVw1L6rB/DUX5D+tzXxU5fmen0V5h/bXxGtP8AW6WsyjuIh/jR/wALA8UWvF14dJ9SFb+lH1Ko/hafzD6/TXxJr5M9PorzVPis8f8Ax9aFcJ67Tj+dW4fi1or/AOttrmL8Aal4KuvslLH4d/aO/orkIfiX4amx/pUsf+/GRWhD418OT/c1a3B9GJFZvD1VvF/caRxNGW0l95v0VQh1vS5/9VqFs3/bQVbS4gk+5NG3+6wNZOLW6NVKL2ZJRRRSKCiiigAooooAKKKKACiiigAooqG8uFs7Ke5f7sUbOfwGaTdlcErnmPiqZvGHxK07wvGSbGwP2i7A6EjoDXqaqqIqKAFUYAHYV5P8HIm1O91/xHP80t1cFFY/3etes1SVopfP7wesn9xjeKtcj8OeGr3U5CMxRnYPVj0Fc38K9HktPDr6veAtf6o5nkZuuD0FYfxkvHvLvQvDcRP+l3AeQDuM4r1O0t0tLOG2jACRIEAHsMUo7OXy/wAwl0Xz/wAiaiiigApksazRPE4yjqVI9QafRQB5b4Nkfw1461DQJjiGdiYs9M9R+lepV5r8TLKSwv8ATvEVsCHhcJIR7dP8K9A069j1HTre8iIKTIHGK7MV78Y1l139UcOE/dylQfTVejLVFFFcZ3BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGJ4w1AaV4Q1a8zgx2z7T7kYH6mvOPgRpMbaJqWpTwo5nnCKXUHhR/iTWz8btS+xeAzbK2Gu51THqByf5CuL8KeHvidZ+HbX+xbi2gsJl86NGlUHDc88UoPWT+X6jktIr5nurWFmww1pAQexjFeCPa2sX7QMEWhoqxJOC6xfdU7Pn/XNaGs6Z8YF0+UzXnmRBTuW2lUsR+FXPggNDka8YRS/wBvJ/rnnOSVJ/h/HrVQ+Pm7Cl8DXc9nqnq1+mmaTdXrkYhiZ+e5xwPzxVyuB+K+q/ZPD8VgjYe7k+Yf7K8/zx+Va0KftKkYdzHEVfZUpT7Ff4VWDyQahrU4JkuZdqse4HJP5n9K9Grzrw7468M6LoFnYefNuijAfER5bqT+dan/AAs/wz/z8T/9+jXRiaNapVclF29DlwtahSoxi5q/qdjXJ+I/DN3deJNK8QaS0aXtq3lzq5wJYT1H1FRf8LP8M/8APxP/AN+jR/ws/wAM/wDPxP8A9+jWH1Wte/I/uOj63QtbnX3nYjpz1orjv+Fn+Gf+fif/AL9Gj/hZ/hn/AJ+J/wDv0aPqtb+R/cH1uh/OvvOxorjv+Fn+Gf8An4n/AO/Ro/4Wf4Z/5+J/+/Ro+q1v5H9wfW6H86+87GiuO/4Wf4Z/5+J/+/Ro/wCFn+Gf+fif/v0aPqtb+R/cH1uh/OvvOxorjv8AhZ/hn/n4n/79Gj/hZ/hn/n4n/wC/Ro+q1v5H9wfW6H86+87GiuO/4Wf4Z/5+J/8Av0aP+Fn+Gf8An4n/AO/Ro+q1v5H9wfW6H86+86/y4/M8zYu/GN2OcfWnVx3/AAs/wz/z8T/9+jR/ws/wz/z8T/8Afo0fVa38j+4PrdD+dfedjRXHf8LP8M/8/E//AH6NH/Cz/DP/AD8T/wDfo0fVa38j+4PrdD+dfedjRXHf8LP8M/8APxP/AN+jR/ws/wAM/wDPxP8A9+jR9VrfyP7g+t0P5195Nr3hq68QeKdLmumT+yLDM3l55kl7ZHoK6vpXHf8ACz/DP/PxP/36NH/Cz/DP/PxP/wB+jR9VrWtyP7g+t0L351952NFcd/ws/wAM/wDPxP8A9+jR/wALP8M/8/E//fo0fVa38j+4PrdD+dfedjRXHf8ACz/DP/PxP/36NH/Cz/DP/PxP/wB+jR9VrfyP7g+t0P51952NFcd/ws/wz/z8T/8Afo0f8LP8M/8APxP/AN+jR9VrfyP7g+t0P51952NFcd/ws/wz/wA/E/8A36NH/Cz/AAz/AM/E/wD36NH1Wt/I/uD63Q/nX3nYEBlKsAQeCD3rzHxR4XvPDeo/8JF4dyqqd00C9B68elb3/Cz/AAz/AM/E/wD36NIfib4YZSrTzEHggwnmtqMMRSldQduqtuYV6mGrRs5pNbO+xp+FvFNp4m08SxkJcoMSwk8qf8K368J1fWNL03X49X8LXUkbM2ZIGQqvv+Br1fwt4ptPE2niWIhLhBiWEnlT/hRicK4L2kV7r/AMJjFUfsptcy/E36qapdrYaTd3bHAhhZ/yGat1xXxX1L+zfh7qBDYefEK/if8AAVwTdos9GCvJHCfA/T11DUtb1i4jWTc4RS4zySSf5ivZZtLsLiNo5rK3dGGCGiBrh/gxpv2DwDBMy4e6kaU+46D9K9DrSat7vYiLvd9z568a6VH8O/iTpupaRmC2uGEnlqeAM4ZfpX0FDIJYY5B0dQ35ivC/jhOL3xXoumw/NMFGQOxZuK9xtEMdlAh6rGoP5VMfg+bKn8XyJqKKKBBXjXx7vybTSdJjOXlkMhX17D9a9lrzvxd8ObzxT4ysNYbUIEs7XZ+4ZCWIByeenNJq7Se1xp2TZ13hjT10rwxptkox5UCg/XFa1IoCqFHQDApaqTu7kpWVgooopDCiiigAooooAKKKKAIntoJPvwxt/vIDVSbQ9KuP9bp9s3/bMVoUVSk1syXGL3Rz83gjw3P97SYAfVQRWfN8M/DU3S2ljP8AsSEV2FFaLEVVtJ/eZSw1GW8V9x5/N8JdGf8A1V1cxfiDVV/hTJH/AMeuu3C+m4EfyNelUVosbXX2jJ4DDv7J5h/wgPim15tfERPoCzD+dH9jfEe0/wBVqazKOzSj/CvT6Kr67UfxJP5C+oU18La+bPMP7Q+JVp96zScD0jBo/wCE28ZWn/H14e346/IR/KvT6KPrUH8VNfkH1Sa+GrL8zzNPilexf8fXh+ZfXbkfzFWYvi3pZOJ7C6iPfJBr0B4o5Pvxq3+8M1Wl0nTphiSxt2+sQo9rh3vT/EPY4lbVPvRy8PxQ8Ny4DSzxn/aiNaMPjzw1N01SJD6PkVYm8H+HrjPmaTbH324rPm+HHhmb/lyKf7jkUXwj/mX3BbGLrF/ebEPiLRrj/ValbN/20Aq4l5ayfcuYW/3XBripvhRoL58qS5j/AOB5qm/wmiTm11m5j9AR/hR7PDPabXqg9rilvTT9GekAgjIORWb4g06fVtAvdPt5lhluIjGsjDIXNcGfhx4gtzm08RsPQMzUn/COfEG0/wCPfWRIB2MuP5ik8LSkrKovxQ1i6sXd0n8rM6fwF4Uk8H+G10ya4jnl8xnaRFIBz9a6ivMPN+Jdn/BHPj2DUf8ACV+O7T/j50Lfj/pnj+VU8JKWqkn8yVjYL4oyXyNXWvAl1q/xD07xG17CLWzC4typ3HHv0ruq8xX4m6vCcXfh2Rcddob+oqxH8W7NeLnSrqI+uRU/Ua6VkvxRX9oYdu7lb5M9Gorh4fir4ek/1n2mM+8ea0IfiF4Zm/5iKp/vqRWbwtZbxZpHF0JbTX3nUUVjw+KtCuP9Vqts3/A8Vfj1GylGY7y3b6SCsnCS3RqqkHsyp4j0tdZ0C7sWGS6HZ7MOlcn8LdUaTTbnR5ziezc4B/u5/wAa79XVxlWDD2Oa8s1AHwj8UIbsfLZ3/wB7054P6114f95TlR+a9UcmJ/d1YVlts/RnqlFAORkdKY0sasFZ1DHsTzXEdw+iimPLHGQHkVSfU4oAfRR1pryJGMu6qD6nFADqKQEEZBBB7iloAKKKKACiiigAooooAKKKKACiiigAooooA8P+OVy2oeINC0OI5ZvmIHq7BR/KvaLC2Wz0+3tkGFijVAPoK8x8b/CvV/FXit9Yt9Yt7ZQqLErI25No9R781l/8Ki8Y/wDQ5f8Aj0n+NKOkbeY5ayv5Hr2p6rY6PZSXd/cxwQxqWJdsZ+nrXiXwhik1X4jazrVvGUsisnbjLsCB+QrUg+CF7eTKdc8SzXMYOSqbjn/vo8V6joPh/TfDWmpYaZbiKFeSepY+pPc1UdHzMUndcqNSs/UdC0vVpEkv7KK4ZBhS46CtCihScXdMUoqStJXML/hDPDn/AECLb/vk0f8ACGeHP+gRbf8AfJrdoq/bVP5n95n7Cl/KvuML/hDPDn/QItv++TR/whnhz/oEW3/fJrdoo9tU/mf3h7Cl/KvuML/hDPDn/QItv++TR/whnhz/AKBFt/3ya3aKPbVP5n94ewpfyr7jC/4Qzw5/0CLb/vk0f8IZ4c/6BFt/3ya3aKPbVP5n94ewpfyr7jC/4Qzw5/0CLb/vk0f8IZ4c/wCgRbf98mt2ij21T+Z/eHsKX8q+4wv+EM8Of9Ai2/75NH/CGeHP+gRbf98mt2ij21T+Z/eHsKX8q+4wv+EM8Of9Ai2/75NH/CGeHP8AoEW3/fJrdoo9tU/mf3h7Cl/KvuML/hDPDn/QItv++TR/whnhz/oEW3/fJrdoo9tU/mf3h7Cl/KvuML/hDPDn/QItv++TR/whnhz/AKBFt/3ya3a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BCD \cong \triangle WXY$. Find $x$.	3	Geometry	Geometry3K	test
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$WXYZ$ is a rectangle. Find the measure of $\angle 2$ if $m∠1 = 30$.	60	Geometry	Geometry3K	test
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to the figure at the right. Find x.	5.17	Geometry	Geometry3K	test
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8Q2fkXkfzrzFMnDxn1B/pXRCtGUfZ1duj6r/geRhOlKMuelv1XR/8HzNWuV8c6ZLPpkerWXy6hpb/AGiJh3Ucsp9RgZ/D3qlY69qHha7j0rxOxktnO221MD5W9A/off8AP1rtQUljBBV0YcEcgg0cssPNT3Xfo0F44iDhs/xX9dCppGpQ6xpNtqEH+rnQNjP3T3H1ByPwq7XGeD92ja7q/hpz+7if7TaZ/wCebdR+GR+Oa7Oor01Co1Hbdej2KoTc4Jvfr6rcKKKKxNgooooAKKKKACiiigAooooAKKKKACuJvvibp1nq97psOja5fS2cnlyyWVqsiBsdM7s/mO1dnLIsMLyucKilifQCvGPh/wDETw1otjqc2q3skd9f38ly6iB3wp6DIH1/OnFXb/r+uoPa521l8R4L6+t7RfDHiWJppFjEk1iFRcnGWO/gCuvuriO0tJrmU4jhRpHPoAMmsfw54v0bxWlw+kTvMtuVEhaJkAJzjqBnpVb4gXjWng298v8A1k22FR67iAR+Wa1p0+epGFt2ZVJ8kJT7Ig+Hts50OfVJx/pGpXD3DHvjOAPp1P411tcNput+ItN0y1so/Bk5S3iWMH7YozgYz92rX/CUeJf+hLn/APAxf/ia6K9CpUqSlpr/AHo/5nPRrQp01HXT+7L/ACOvorkP+Eo8S/8AQlz/APgYv/xNH/CUeJf+hLn/APAxf/iay+q1PL/wKP8Ama/Wqfn/AOAy/wAjr6K5D/hKPEv/AEJc/wD4GL/8TR/wlHiX/oS5/wDwMX/4mj6rU8v/AAKP+YfWqfn/AOAy/wAjr6K5D/hKPEv/AEJc/wD4GL/8TR/wlHiX/oS5/wDwMX/4mj6rU8v/AAKP+YfWqfn/AOAy/wAjr6K5D/hKPEv/AEJc/wD4GL/8TR/wlHiX/oS5/wDwMX/4mj6rU8v/AAKP+YfWqfn/AOAy/wAjr6K5D/hKPEv/AEJc/wD4GL/8TR/wlHiX/oS5/wDwMX/4mj6rU8v/AAKP+YfWqfn/AOAy/wAhujf8lO8Sf9cYP/QFrsa8ssNe1mDxtrN4nhqaW5mjiWW1WfmEBRgltvOQM9O9dB/wl3iP/oSrr/wJ/wDsK3xGGqSkrW2j1XZeZjh68FB6PeX2Zd35G7rv/MM/6/4v61rVwN74g8R35tQPB10nk3CTc3Gc4zx93jr1q/8A8JR4l/6Euf8A8DF/+JrF4WpZbf8AgUf8zrni6fJFa6X+zL/I6+iuQ/4SjxL/ANCXP/4GL/8AE0f8JR4l/wChLn/8DF/+JpfVanl/4FH/ADMvrVPz/wDAZf5HX1yXjSzurrUvCz29tNMsOrJJKY0LCNdrfM2Og9zTf+Eo8S/9CXP/AOBi/wDxNH/CUeJf+hLn/wDAxf8A4mhYWomnp/4FH/MTxNNprX/wGX+R19Fch/wlHiX/AKEuf/wMX/4mq9z40121aJJvCUkck7+XEGvFyzegG3mj6pVfb/wKP+ZSxEJOyT/8Bl/kbHiWRL6EaDFBFcXd4vKyLuWFB1kb6du5P41z6jVfh84BMuo+HSeTjMlt/wDY/p9O6aVqniXT1mll8JXFzeXDb57hrtRuPYAbTtUDgCr7eJvEboUfwVMysMEG8Ugj/vmuiFOpBcjs49VzR/DXQWJq0JWVO6a+1yy1/Dby+ejKuuX1qmv+HPE9jOkttPJ9jldDwVbOM/TLce1d3XhHiWK+04yKNKl0izvGDm1e4Eil1OdyDAI/+vj2r2rSL3+0dGsr3/nvAkh9iQCf1oxtDkpwkndar9emnc58HW56k4tWej/Trr2Klt4ks7vxRe+H4o5zdWcKyzSbR5Y3YwM5znn0rQv72HTtPub24JENvE0rkddqjJ/lXkHhfx/4d0nxR4q1HVrxo57y92RBYWceUmQpyAf8irfjb4o+HdX8IX+m6PeSzXt2ohRDA65DMA3JHpmvPcW0uXd/qeirKTvsemaFrEGv6La6rbRTRQXK70ScAPjOOQCR29a0Ko6LYLpeh2FgowLe3SL8lAq9TlbmdtiIttJsKKKKkoKKKKACiiigAooooA5r4g6j/ZfgLWbkNtY25iQj+8/yj+dWfBunf2T4N0iyK7WjtULj/aIyf1JrUvLG01G2NtfWsF1ASCYp4w6kjpweKnAAAAGAOgFNOyaB62Frj/HQNxceHrEcibUo2Yey9f0NdhXH+JB5njvwoh6Bp2/8dB/pXRhP4t+yb+5M58V/Dt3aX3tHYUUUVzHQFFFFABRRRQAUUUUAFFFFABRRRQByGjf8lK8S/wDXK3/9AWuvrkNG/wCSleJf+uVv/wCgLXX104r4l/hj+SOfDfA/WX/pTCiiiuY6AooooAKKKKACq1/p9tqdo1tdxCSM8jnBUjoQRyCPUVZopp21Q4ycXeLszn4r+50CRLXV5TNZMQsOosMYOeFl7A9MN0PfBrS1fV7TRdMlv7yQLEg4A6ueyj1JqxdG3FpMbvy/s+w+Z5n3duOc57V57oOkDxTqYvHM58OWUrfYrac5Ejd+v8IPY9OnrXRSpxnec9Et/PyXmxYmvFpcq/ePp0fn5W69+li5o+hXXiFbzxBrkeZ7uB47O3bkQxMpAOPUg/rnvw/w7rH2L4TtqDn5rO2m/NS20fyrua4rwFbW134XvtPubaOW3jvpYXhmUOhHBxg5BHNXUqOtQnfSzVvJao5IQVKtDrdO/m9Cb4X6edP+Hulq3+snQ3DH13kkfpis34hf8TLxN4Q0Ecia++1Sr/sxjP8AU130UUcEKQwxpHEihURBgKB0AA6CopLCzlvYr2S0ge7iUrHO0YLoD1AbqBXM5Xnzef8Awx0pWi0WKKKKgoKKKKACiiigAooooAKKKKACiiigArkPEP8AyP8A4W/7eP8A0AV19cf4uxD4l8K3Z4C3jQnj+/tA/lXThf4lvJ/kznxP8O/mvzR2FFFFcx0BRRRQAUUUUAFFFFABRRRQAUUUUAcho3/JSvEv/XK3/wDQFrr65DRv+SleJf8Arlb/APoC119dOK+Jf4Y/kjnw3wP1l/6UwooormOgKKKKACiiigAoorkPFOs3V3ep4Z0Vj9vuFzcTDpbx9yT2OP5+pFaUqTqS5V/wxnVqKnG7/wCHKmq3M/jXW20OwkZNHtWBv7lf+WjD/lmp/wA+vYZ7W3t4bS2jt7eNY4Y1CoijAAFVNF0e10LS4rC0XCIPmY9Xbux960KutVUrQh8K/q7Io03G85/E/wCrIK5D4eZOl6rJghZNUmZSe4wtdbI4iieRuiqWP4Vynw3Vv+EOhmc5aaaWQn1O4j+lVDShN+a/UU9a8F5P9P8AM62iiiuY6AooooAKKKKACiiigAooooAKKKKACiiigArkPiMjR+HYL9BlrG8iuBz15x/MiuvrN8QWH9p+H7+yAy0sDBP97GV/UCtsPNQqxk9rmNeDnSlFb2NBHWSNXQ5VgCD6g06uf8E6h/aXhDT5ScvHH5L565T5efqAD+NdBUVIOE3B9C6c1OCkuoUUUVBYUUUUAFFFFABRRRQAUUUUAcho3/JSvEv/AFyt/wD0Ba6+uQ0b/kpXiX/rlb/+gLXX104r4l/hj+SOfDfA/WX/AKUwooormOgKKKKACiiszXtctfD+lSX123C8IgPMjdlFVGLk1GO7JlJRTlLZFHxV4ibRbWO3s4/P1W7Pl2sI55PG4+w/z3p3hbw6NCsXe4fz9SuT5l1OTks3oD6D9etUvCuiXT3UviPWgTqd0P3cTdLePsoHY4/z1rrK6KslTj7GHzfd9vRfiYU4ucvaz+S7efq/w2CiiiuU6TI8U3f2HwrqdwG2sLd1U+jMNo/UimeErT7F4S0uErtP2dXIx0LfMf1NZPxCkNzp+n6LGf3upXaR4HXYCCT+B2116IsaKijCqMAegrpl7uHiu7b+7T/M54+9Xb7JL79f8haKKK5joCiiigAooooAKKKKACiiigAooooAKKKKACiiigDjPDB/sbxbrWgvxFK/221HYq33gPpwPwNdnXHeN4ZdPm07xNaqWk0+TbOq/wAULcH+f/jxrrbeeK6t4riFw8Uqh0YdCCMg11Yj31Gquuj9V/Vzmoe65Uu23o/6sSUUUVynSFFFFABRRRQAUUUUAFFFFAHIaN/yUrxL/wBcrf8A9AWuvrkNG/5KV4l/65W//oC119dOK+Jf4Y/kjnw3wP1l/wClMKKKK5joCiignAyelAEN3dQWNpLdXMixwxKWd26AVxmjWk/jDWV8RalEyadbsRp1s/8AFz/rGH4fp6DmOeR/H+tm0hZh4esZB50inH2qQfwg+n9Oe4ru440ijWONQiIAqqBgADtXY/8AZ42+2/wX+b/BHIv38r/YX4v/ACX4sdRRRXGdYUUVm69q0eh6JdahJj90nyKf4nPCj88VUYuUlFbsmUlFOT2RzsH/ABPPiZNN9620aDy19POfr+mR/wABrtK5zwTpMumeH0kusm9vHNzcFuu5ugP4Y/HNdHW2JknPljtHT7v82Y4eLUOaW8tf69FoFFFFc50BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBFc28V3ay206B4pUKOp7gjBrkfB11LpN9d+FL5y0tqTJaSN/y0hPP6f4jtXZ1zHjHRLi9gg1XTPl1bTz5kJH8a/xIfX/ACO9dNCSd6U9n+D6P9Gc9eLVqsd1+K6/5o6eisvw/rlv4g0mO9gwrH5ZY88xuOoP+elalYSi4ScZbo2jJSSlHZhRRRUlBRRRQAUUUUAFFFFAHIaN/wAlK8S/9crf/wBAWtPXPFNlodzBZtb3l7fTqXjtLKHzZCg6sRkAD3JrM0b/AJKV4l/65W//AKAtaGoQaVoOp3fiy+uJ0Y2yWz/KXVUDZGFVS2STzXTifjjf+WP/AKSjnwvwP1l/6Uy5oevWPiCya5smkHlyGKWKVCkkTjqrKeQa064vwC8epXGv+ILd1Nnqd4GgUMCdqKF3MB90k84PPTNdpWElY3QVxfiTUbrXdU/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\angle 2=2 x, m \angle 3=x$ Find $m\angle 3$	30	Geometry	Geometry3K	test
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parallelogram ABCD to find $m \angle AFD $	97	Geometry	Geometry3K	test
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the pair of similar figures, use the given areas to find $x$.	8	Geometry	Geometry3K	test
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square is circumscribed to the circle. Find the exact circumference of the circle.	14 \pi	Geometry	Geometry3K	test
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$\odot R$, find $TV$. Round to the nearest hundredth.	18.44	Geometry	Geometry3K	test
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area of trapezoid $JKLM$ is 138 square feet. The area of trapezoid $QRST$ is 5.52 square feet. If trapezoid $J K L M$ $ \sim$ trapezoid $QRST$, find the value of $x$.	1	Geometry	Geometry3K	test
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mq1n4b0LTrlbmx0XTrWdchZYLVEYZ64IGa06KAKL6LpUmoDUH0yza9XpctApkH/AsZpp02BNZk1iaRmkW38lA2NsSZ3MR7k4yf9kVoVzPi+4luY7Xw/aMVudTfZIw/wCWcA5dvy4/E1pSg5zUf6S6/gZ1J8kXL+vL8RvhpTq2o3viSVTtnP2eyBH3YFPX/gRya6iora3itLWK2gQJFEgRFHYAYFS0VZ88rrbp6BThyRs9/wBQooorM0CiiigAooooAKKKKACuQl/4rDXjAMnRNNk/eHtdTj+H3Ve/qat+JNRuJ7iHw9pb4v7tcyyj/l3h6M59z0H/AOqtnTdOttJ06GxtIwkMK7VHr6k+5PNdMf3UOf7T28vP/L7+xzy/ey5Oi38/L/P7u5brifBlla3tl4msb62huYTrdx5kU8YdG5VhkHg9jXbVy3hxPsfizxRZHjzJ4rxB6h4wpP8A30hrnju/T9UdD2+f6MwdTGg2t5qa2HgHSb200oA3s/lQxlTt3EIpQ7yF5PIrpFh8M6Dok2v2VjYadE1rv+021oiPsYAgfKMnJ28dziqWttJrd7e+G9HhSBZQBqt+EAEasv3B/ekK/kD9BW7qGgWOpeHn0OZXWzaJYgI2wyhcbSD6jA/Kh/D/AF8/+AH2l/X9eZ5rZ2DW/irwy0eiX9je3FyzzajeXKme6RUJcOiscA8cHGOAK9Q1aXUobB30q2guLsEbY55DGpGeeQD2rFtfA9nbatY6q+p6rdX1nuCy3FyHLqwxtYbcAf7oHvmunpyd0hLe7PLLu98Xn4i6dI+j6YL0afMI4heNsKb1yS23g5xxivQdFm1ie1dtZs7a1nD4RLeYyKVwOSSBznNJLokE3iO21sySCeC3e3VBjaVYgknvnitOi/upf1uwe/8AXY4jxZHJqvjHQ9Is5vsV9FHLeLqCrueJBhSiqeDuzznIwOlV/CzNYHxfpN0/2i8tJDNPfYwbjzI9wLDoCAMYHHTium1zw1Z67JbTyT3VpeWpJgu7STZKgPUZIIIPoQax9U0m08J+Bdee1eea4ngkeW4uH8yWaVl2gsfxAAAxU/Ya8n+ZS1kvkXfh+hj+H+hqev2RD+fNdJXNaHcyWt9aeHbZIzBpunxfanIJIcgBFHPorE5z29a6WrqaybIh8KQUUUVBQUUVU1PVLHRrCS+1G5S3to/vSP8AoPUn2FAFuisfTPEem+Iba5/sW9jlnhGCssbqUYj5dyMFbH5Zqrb65ean4Pkv7OADUUDRSwqu7y5Uba4A74IJA78etOzQHQu6xozuwVVGST0ArlvC8batqN74mnUgXJ8iyDDlYFPX23Hmsi41LUdVtx4eWa7lOoTbEurm2+zy/ZgAZWZNoxzlQSozz9T3tvBFa28VvCgSKJQiKOgAGAK3t7On5y/L/gv8jn/iVPKP5/8AAX5klFFFc50BRRRQAUUUUAY/irXT4a8N3mrra/avsyq3k+Zs3ZYDrg4656Ual4ht9K8KvrtyhEa26zCINyzMBhAfUkgVnfEePzfh3ra8cWxbn2IP9KxLdv8AhKtW0HSQM2GlWkF9ejs0xQeVGfpyx/CnFXTX9dQbtZ+v6W/M6bwp4lXxL4Yh1qS2+xh9++JpN2zaxBycD0z0qPw54luPEug3OqW2m+VH5kiWavNn7Qq8BjwNoJ+tef2t7OfBEnhmwci/1PWLmxTHVI/MJkb6BT+tes6dYQaXp1tYWqbILeNY0HsBiq0+K39b/wBfMT7ev+RxmiPrmiS3lzqPhu5ub26lLzXUE8b7gPugLnIAHQVrjxpbJn7XpOsWmDgmWzYj81zxXS0VtOvCo7zh9zf/AATCFGUFaMvvS/4Bz0Hjnw3cEgarEjA4IlVoyD/wICkhk0+78Tx6vY6rZSI1qbaeNJVYthgyHg9st/31W7LbQXAxNDHIPR1B/nWZP4U0C4yZNHssnqVhCk/iMVN6N76r7n/kV++XZ/ev8ytceCtBvL24vXguRNcv5krRX88YdsAZwrgdAO1btvBHa20VvEGEcSBF3MWOAMDJJJP1Nc8PAmhxEm0jurMk5zb3Ui8/nSL4Uu7fP2TxPrCegmkWYD/vodKOSk1ZT+9f5XDnq7uP3P8AzsdNRXNLpniy3H7vxBa3XoLiyC/qpoFx4ytx+9sdIu8f88JnjJ/76Bo9in8Mk/w/Owe1fWLX4/lc6WiuaXxDrcQ/0zwpdrjvb3Ecv9RQvjWyQf6Xpur2fr59k39M0fV6nRX9Gn+Qe3p9Xb1TX5nS1l67pT6za21r5ipCt1FNOCPvojbto+pA/DNVIPG/hu4+5q0Cn0lBj/8AQgK07fVdOvBm2v7WYf8ATOZW/kaiVKpB3lFr5FRqwl8Mk/mc74OYy634tmf/AFh1Tyz/ALqxoF/SqGr+L9e02X7Y0Glw2X2tbdLGd2+2SqX2bxg4Gc5AweK0Hsb2w8R62ljlBrFp50E2CVjuUXYcntkbCPoa5ODwnq5tdEC+ELS2mtbyGW+uWuYnuLnacs+/+7u5IJyfSlGzcb+X+T/IuWz+f+f6nqlxcQ2ltLc3EixwxKXkdjgKoGSTXnvinx3oUt94eNh4gtzGmpI1z5U2AItrZ3Y/hzjrXozKrqVZQykYIIyCK5PxT4fN7feHnstOidLfUkluCqKNsYVgSfUZI4qY/Er90D+F+j/I2dK8SaNrkkkel6lb3bxgM4hfdtB9aTW9Dt9abT3uZWRLG6W7CjG12UHAbPbnP4VoQ2tvbkmGCKMnqUQDP5VzPju11e/0y1s9MspruCW4H26OGdIXeEA5UMxHU4Bx2zR1Vhrrcp6BIuu/ELUtfsMnS4rNbBZ8YW4kDlmK+oXpmrHhOVYNY8XozBbeLUjJknhd0Ss3681d0bUb+GL7NceFptIsLaAlGE8MigL0ULGxPTPbtXNpaXb6VHpBDQ6j4jupLy7GPmggJ5B99oVfrmtaUOeXL0t+t/0ZnVnyx5ut/wBLf5G74VjfVL298TTqQbs+TaKw5S3U8fTcefyrqajt4IrW3it4UCRRKERR0AAwBUlTVnzyutunoFKHJGz3/UKKKKzNAooooAKKKKAMrxLpkuteGdS0yBo1lurd4kaTO0MRxnGeKoeCPDMnhfQFtbqZJ7+VvMuZlJIZsYABIBwAABx2rpKKadr+YnrY4bwp4FudF8W6vrV/cQzLPNK1jGjE+UsjbmJyAAxwo4z0613NFFF9Euw+rfcKKKKQBRRRQAUUUUAFFFFABRRRQBDNaW1x/r7eKX/fQN/Osubwj4en+/o1kP8AciCfyxW1RVxqTj8LaIlCMviVzml8C6NCuLM3tmO32e7kGPzJ/wAmkXwtf264tPFOrL6faGSb+YrpqK0+s1erv66/mR9XprZW9NPyOaXT/F1uuE12xuyO9xZ7M/8AfB/zigXXjKBf32maVdH/AKd7h48/99Culoo9vf4op/K35WD2Nvhk187/AJ3OaXxJrES5vPCl8h7/AGeaOb+RFA8baei5u7LVLP1+0WTjH5ZrpaKPaU3vD7m/1uHJUW0vvS/SxgQ+NfDdwm5NXtwMZ/eEofyYCq/hRJNTuLzxJcoVe9Pl2qsOUt1Py/meTWjr93omlaZLqGtrAtohAd5IfM6nA4AJPX0rnY/ix4DhiWKLWVSNAFVVs5gFA6ADZT54KLVNPX5/ogVObknN7eVtfvZ3FFUNG1rT/EGmpqGmTme1ckLJ5bJkg4PDAHrV+sGrbmoUUUUhhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAjMFUsxAUDJJ7VwdzcXPxEvJLCwkkg8LwvsurtDta+YdY4z/c9W79BWd461rVL3WxoR0PxA+hJg3k2nWTO11wD5atwAnYkHJ5FbOleNIFa00y18GeKLSDKwx79NCRRDpkndwB3NVFX1Bux11nZ2+n2cVpaQpDbwqEjjQYCgVPRRU7iCiiigYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/2Q==	<image>Find $m \angle Z$	110	Geometry	Geometry3K	test
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EFG$ is equilateral, and $\overline{E H}$ bisects $\angle E$. Find $m \angle 2$.	30	Geometry	Geometry3K	test
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$A$ has diameters $\overline{D F}$ and $\overline{P G}$
+If $D F=10$, find $D A$"	5	Geometry	Geometry3K	test
+540	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the area of the triangle.	285	Geometry	Geometry3K	test
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the length of $\widehat {JK}$. Round to the nearest hundredth.	1.05	Geometry	Geometry3K	test
+542	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$LMN$ is equilateral, and $\overline{MP}$ bisects $\overline{LN}$. Find the measure of each side of $\triangle LMN$.	10	Geometry	Geometry3K	test
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the figure, $m∠4 = 101$. Find the measure of $\angle 6$.	101	Geometry	Geometry3K	test
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	<image>In rhombus $A B C D, A B=2 x+3$ and $B C=5 x$. Find $m \angle AEB$.	90	Geometry	Geometry3K	test
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$\frac{I J}{X J}=\frac{HJ}{YJ}, m \angle W X J=130$
+and $m \angle WZG=20,$ find $m \angle YIZ$"	50	Geometry	Geometry3K	test
+546	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x. Round to the nearest tenth if necessary. Assume that segments that appear
+to be tangent are tangent."	5.6	Geometry	Geometry3K	test
+547	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$m \angle B G E$	60	Geometry	Geometry3K	test
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the figure, $\overline{CP}$ is an altitude, $\overline{CQ}$ is the angle bisector of $∠ACB$, and $R$ is the midpoint of $\overline{AB}$. Find  $m∠ACQ$ if $m∠ACB=123-x$ and $m∠QCB = 42 + x$.	55	Geometry	Geometry3K	test
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x	10 \sqrt { 3 }	Geometry	Geometry3K	test
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$m\angle CAM$	28	Geometry	Geometry3K	test
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	<image>Triangle $LMN$ is equilateral, and $\overline{MP}$ bisects $\overline{LN}$. Find $y$.	18	Geometry	Geometry3K	test
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	<image>Find x in the figure.	34	Geometry	Geometry3K	test
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y	23.4	Geometry	Geometry3K	test
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	<image>Find the area of the shaded region. Round to the nearest tenth.	10.7	Geometry	Geometry3K	test
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	<image>Find x. Round to the nearest tenth.	18.8	Geometry	Geometry3K	test
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	<image>Find the measure of $\angle 2$.	28	Geometry	Geometry3K	test
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the area of the rhombus.	264	Geometry	Geometry3K	test
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the value of x.	23	Geometry	Geometry3K	test
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the area of the parallelogram.	315	Geometry	Geometry3K	test
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and $\overrightarrow{QR}$ are opposite rays, and $\overrightarrow{QT}$ bisects $\angle SOR$. If $m \angle SOR=6x+8$ and $m \angle TOR=4x-14,$ find $m \angle SQT$.	58	Geometry	Geometry3K	test
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$m\angle W$	76	Geometry	Geometry3K	test
+562	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the area of the trapezoid. 	180	Geometry	Geometry3K	test
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$\triangle CDF$, $K$ is the centroid and $DK=16$. Find $CD$.	18	Geometry	Geometry3K	test
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PQ	6	Geometry	Geometry3K	test
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the area of the parallelogram. Round to the nearest tenth if necessary.	169.7	Geometry	Geometry3K	test
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In RSTV, RS $=6, V T=3$ and $R X$ is twice the length of $X V .$ Find $X Y .$	4	Geometry	Geometry3K	test
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trapezoid $ABCD$, $S$ and $T$ are midpoints of the legs. If $AB=x+4$, $CD=3x+2$, and $ST=9$, find $AB$.	7	Geometry	Geometry3K	test
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	<image>Find $x$ for the equilateral triangle $RST$ if $RS = x + 9$, $ST = 2x$, and $RT = 3x - 9$.	9	Geometry	Geometry3K	test
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	<image>Find x. Assume that any segment that appears to be tangent is tangent.	10	Geometry	Geometry3K	test
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\| \overline{DC}$. Find $x$.	9.5	Geometry	Geometry3K	test
+571	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	<image>Express the ratio of $\cos X$ as a decimal to the nearest hundredth.	0.28	Geometry	Geometry3K	test
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$\odot X, A B=30, C D=30,$ and $m \widehat{C Z}=40$
+Find ND"	15	Geometry	Geometry3K	test
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$CW=WF$ and $ED=30$, what is $DF$?	15	Geometry	Geometry3K	test
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	<image>A square is inscribed in a circle of area 18$\pi$ square units. Find the length of a side of the square.	6	Geometry	Geometry3K	test
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the scale from $B$ to $B'$.	\frac { 4 } { 3 }	Geometry	Geometry3K	test
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$m\angle H$	97	Geometry	Geometry3K	test
+578	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	<image>Find the area of the figure. Round to the nearest tenth if necessary.	35.7	Geometry	Geometry3K	test
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x. Round to the nearest tenth, if necessary.	3	Geometry	Geometry3K	test
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	<image>Find the area of the figure.	60	Geometry	Geometry3K	test
+581	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	<image>Find the area of the figure.	144	Geometry	Geometry3K	test
+582	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	<image>If $A E=m-2, E C=m+4$， $A D=4,$ and $A B=20,$ find $m$	4	Geometry	Geometry3K	test
+583	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	<image>Find y	\frac { 5 \sqrt { 2 } } { 2 }	Geometry	Geometry3K	test
+584	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	<image>Find the perimeter of the figure. Round to the nearest tenth if necessary.	24	Geometry	Geometry3K	test
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the measure of $\angle 2$ if $\overline{A B} \perp \overline{B C}$.	68	Geometry	Geometry3K	test
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x	9.3	Geometry	Geometry3K	test
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$\odot B$, $CE=13.5$. Find $BD$. Round to the nearest hundredth.	4.29	Geometry	Geometry3K	test
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$\overline{PR} \| \overline{KL}, KN=9, LN=16,$ and $PM=2KP$, find $KM$.	15	Geometry	Geometry3K	test
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$m \angle ABC$.	22	Geometry	Geometry3K	test
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H/viqHwUnl07VfE3hfMU9vp9yfLuY4wpchmQ5I652gjOcc1Ym8J/FvUY2t77xnp8MDDDNaptfHsViU/rXY+B/A2n+BtKktbSR57idg9xcuMNIR0GOwGTgc9TQB1FFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//Z	<image>Express the ratio of $\cos A$ as a decimal to the nearest hundredth.	0.60	Geometry	Geometry3K	test
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$AD$.	7.5	Geometry	Geometry3K	test
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LMN \cong \triangle QRS$. Find $x$.	20	Geometry	Geometry3K	test
+593	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	<image>Find the circumference of the figure. Round to the nearest tenth.	19.5	Geometry	Geometry3K	test
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$sinS$	0.6	Geometry	Geometry3K	test
+595	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	<image>Find $BC$ if $AB=6, AF=8, BC=x, CD=y$, $DE=2y-3$, and $FE=x+\frac{10}{3}$.	10	Geometry	Geometry3K	test
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$x$ so that each quadrilateral is a parallelogram.	34	Geometry	Geometry3K	test
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is the incenter of $\triangle AEC$. Find $m \angle DEP$.	28.5	Geometry	Geometry3K	test
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$x$.	5	Geometry	Geometry3K	test
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\angle 4=42$. Find $m \angle 7$.	138	Geometry	Geometry3K	test
+600	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	<image>Find the measure of $∠Z$ to the nearest tenth.	33.7	Geometry	Geometry3K	test