index int64 0 1.35k | question stringlengths 6 657 | A stringlengths 1 149 | B stringlengths 1 140 | C stringlengths 1 159 | D stringlengths 1 274 ⌀ | answer stringclasses 4 values | image stringlengths 368 601k | category stringclasses 7 values | question_type stringclasses 1 value |
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200 | 如图,$$Rt\triangleABC$$中$$\angle C=90^{\circ}$$,$$AB$$的垂自平分线$$DE$$交$$AC$$于点$$E$$,连接$$BE$$,若$$\angle A=40^{\circ}$$,则$$\angle CBE$$的度数为() | $$10^{\circ}$$ | $$15^{\circ}$$ | $$20^{\circ}$$ | $$25^{\circ}$$ | A | ["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"] | math | multiple-choice |
201 | 如图,已知$$AB$$、$$CD$$、$$EF$$都与$$BD$$垂直,垂足分别是$$B$$、$$D$$、$$F$$,且$$AB=2$$,$$CD=4$$,那么$$EF$$的长是(\quad) | $$\dfrac{1}{3}$$ | $$\dfrac{4}{3}$$ | $$\dfrac{3}{4}$$ | $$\dfrac{4}{5}$$ | B | ["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"] | math | multiple-choice |
202 | 如图,已知四边形$$ABCD$$内接于$$⊙O$$,$$\angle B+\angle AOC=230^{\circ}$$,则$$\angle B$$的度数为() | $$130^{\circ}$$ | $$115^{\circ}$$ | $$100^{\circ}$$ | $$90^{\circ}$$ | A | 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"] | math | multiple-choice |
203 | 如图,在正方形$$ABCD$$中,$$E$$是$$BC$$的中点,$$F$$是$$CD$$上一点,且$$CF=\dfrac{1}{4}CD$$,下列结论:①$$\angle BAE=30\degree $$,②$$\triangleABE$$∽$$\triangleAEF$$,③$$AE垂直EF$$,④$$EF^{2}=CF\boldsymbol{⋅}AF$$,其中正确结论的个数为(\quad) | $$1$$ | $$2$$ | $$3$$ | $$4$$ | C | ["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"] | math | multiple-choice |
204 | 如图,在平面直角坐标系$$xOy$$中,菱形$$ABCD$$的顶点$$A$$的坐标为(2,0),点$$B$$的坐标为(0,1),点$$C$$在第一象限,对角线$$BD$$与$$x$$轴平行,直线$$y=x+2$$与$$x$$轴、$$y$$轴分别交于点$$E$$、$$F.$$将菱形$$ABCD$$沿$$x$$轴向左平移$$m$$个单位,当点$$D$$落在$$\triangleEOF$$的内部时($$不包括三角形的边$$),$$m$$的取值范围是(\quad) | $$4<m<6$$ | $$4\leqslantm\leqslant6$$ | $$4<m<5$$ | $$4\leqslantm\leqslant5$$ | C | ["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"] | math | multiple-choice |
205 | 如图,$${OA}{=}{OB}$$,$${OC}{=}{OD}$$,$$AD$$与$$BC$$相交于点$$E$$。图中全等的三角形共有(\quad)。 | $$2$$对 | $$3$$对 | $$4$$对 | $$5$$对 | C | 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"] | math | multiple-choice |
206 | 如图,数轴上的点$$A$$所表示的数为$$x$$,则$$x^{2}-10$$的立方根为(\quad) | $$-2$$ | $$-\sqrt{2}-10$$ | $$2$$ | $$\sqrt{2}-10$$ | A | ["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"] | math | multiple-choice |
207 | 如图,$$\triangleABC$$与$$\triangleDEF$$关于直线$$MN$$成轴对称,则以下结论中,错误的是() | $$\angle B=\angle E$$ | $$AB \parallel DF$$ | $$AB=DE$$ | $$AD$$的连线被$$MN$$垂直平分 | B | 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"] | math | multiple-choice |
208 | 如图,$$AB=DB$$,$$BC=BE$$,欲证$$\triangleABE≌\triangleDBC$$,则需补充的条件是(\quad) | $$\angle A=\angle D$$ | $$\angle E=\angle C$$ | $$\angle A=\angle C$$ | $$\angle 1=\angle 2$$ | D | 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"] | math | multiple-choice |
209 | 如图所示,三个正方形中有两个的面积分别为$$S_{1}=225$$,$$S_{2}=144$$,则$$S_{3}$$等于(\quad) | $$9$$ | $$18$$ | $$81$$ | $$90$$ | C | ["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"] | math | multiple-choice |
210 | 观察下列图形,它是把一个三角形分别连接这个三角形三边的中点,构成$$4$$个小三角形,挖去中间的一个小三角形($$如图$$1);对剩下的三个小三角形再分别重复以上做法,$$…$$将这种做法继续下去($$如图$$2$$,图$$3…),则图$$6$$中挖去三角形的个数为($$ $$) | $$121$$ | $$362$$ | $$364$$ | $$729$$ | C | 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"] | math | multiple-choice |
211 | 给出下列命题及函数$$y=x$$,$$y=x^{2}$$和$$y=\dfrac{1}{x}$$的图像,如图所示.①如果$$\dfrac{1}{a}>a>{{a}^{2}}$$,那么$$0a>\dfrac{1}{a}$$,那么$$a>1$$;③如果$$\dfrac{1}{a}>{{a}^{2}}>a$$,那么$$-1\dfrac{1}{a}>a$$时,那么$$a则正确答案是(\quad).$$ | 正确的命题是①④ | 错误的命题是②③④ | 正确的命题是①② | 错误的命题只有③ | A | ["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"] | math | multiple-choice |
212 | 如图所示,下列说法错误的是() | $$\angle 1$$与$$\angle 2$$是同旁内角 | $$\angle 1$$与$$\angle 3$$是内错角 | $$\angle 1$$与$$\angle 5$$是同位角 | $$\angle 4$$与$$\angle 5$$互为邻补角 | B | 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"] | math | multiple-choice |
213 | 如图,在矩形$$ABCD$$中,$$AB=2$$,$$BC=3$$,若点$$E$$是边$$CD$$的中点,连接$$AE$$,过点$$B$$作$$BF垂直AE$$于点$$F$$,则$$BF$$长为(\quad) | $$\dfrac{3\sqrt{10}}{2}$$ | $$\dfrac{3\sqrt{10}}{5}$$ | $$\dfrac{\sqrt{10}}{5}$$ | $$\dfrac{3\sqrt{10}}{5}$$ | B | ["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"] | math | multiple-choice |
214 | 下面是一天中四个不同时刻两座建筑物的影子,将它们按时间先后顺序正确的是($$ $$) | $$③①④②$$ | $$③②①④$$ | $$③④①②$$ | $$②④①③$$ | C | 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"] | math | multiple-choice |
215 | 一把直尺和一块三角板$$ABC($$含$$30^{\circ}$$、$$60^{\circ}$$角$$)摆放位置如图所示,直尺一边与三角板的两直角边分别交于点$$D$$、点$$E$$,另一边与三角板的两直角边分别交于点$$F$$、点$$A$$,且$$\angle CDE=40^{\circ}$$,那么$$\angle BAF$$的大小为($$ $$) | $$40^{\circ}$$ | $$45^{\circ}$$ | $$50^{\circ}$$ | $$10^{\circ}$$ | D | 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"] | math | multiple-choice |
216 | 已知在正方形$$ABCD$$中,对角线$$AC$$与$$BD$$相交于点$$O$$,$$OE \parallel AB$$交$$BC$$于点$$E$$,若$$AD=8cm$$,则$$OE$$的长为($$ $$) | $$3cm$$ | $$4cm$$ | $$6cm$$ | $$8cm$$ | B | ["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"] | math | multiple-choice |
217 | 如图,直线$$y=x$$与抛物线$$y=x^{2}-x-3$$交于$$A$$、$$B$$两点,点$$P$$是抛物线上的一个动点,过点$$P$$作直线$$PQ垂直x$$轴,交直线$$y=x$$于点$$Q$$,设点$$P$$的横坐标为$$m$$,则线段$$PQ$$的长度随$$m$$的增大而减小时$$m$$的取值范围是($$ $$) | $$m-1$$或$$m\dfrac{1}{2}$$ | $$m-1$$或$$\dfrac{1}{2}m3$$ | $$m-1$$或$$m3$$ | $$m-1$$或$$1m3$$ | D | ["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"] | math | multiple-choice |
218 | 如图,在$$\triangleABC$$中,$$\angle C=90\degree $$,$$\angle B=30\degree $$,以$$A$$为圆心,任意长为半径画弧分别交$$AB$$、$$AC$$于点$$M$$和$$N$$,再分别以$$M$$、$$N$$为圆心,大于$$\dfrac{1}{2}MN$$的长为半径画弧,两弧交于点$$P$$,连结$$AP$$并延长交$$BC$$于点$$D$$,则下列说法中正确的个数是(\quad)①$$AD$$是$$\angle BAC$$的平分线;②$$\angle ADC=60\degree $$;③点$$D$$在$$AB$$的中垂线上;④$$BD=2CD.$$ | $$1$$个 | $$2$$个 | $$3$$个 | $$4$$个 | D | 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OD355HHQ0UUAUtN8J6PpF6L21t5nuki8lJrm6muGjj/uqZGbaPYYooooA//9k="] | math | multiple-choice |
219 | 下列图形中,既是轴对称图形,又是中心对称图形的有() | $$1$$个 | $$2$$个 | $$3$$个 | $$4$$个 | B | 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"] | math | multiple-choice |
220 | 如图中实线所示,函数$$y=|a(x-1)^{2}-1|$$的图象经过原点,小明同学研究得出下面结论:①$$a=1$$;②若函数$$y$$随$$x$$的增大而减小,则$$x$$的取值范围一定是$$x1$$;④若$$M(m_{1},n),$$N(m_{2},n),$$P(m_{3},n),$$Q(m_{4},n)(n>0)是上述函数图象的四个不同点,且$$m_{1} | $$4$$个 | $$3$$个 | $$2$$个 | $$1$$个 | C | 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"] | math | multiple-choice |
221 | 如图,某同学把一块三角形的玻璃打碎成了三块,现在要到玻璃店去配一块完全一样的玻璃,那么最省事的办法是(\quad) | 带①去 | 带②去 | 带③去 | 带①和②去 | C | ["R0lGODdhgABbAHcAACH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACwAAAAAgABbAIf///9SUlre3t6tra3ezsVzc3OUnJS15sXFxcW9zuaMYzpjYzqMYxBjYxCMnM5jnM6EhIStpZTm71q175S171rm75Tmc63mc4xjjJzm7+Y6rd46rVo6Kd6M75yMMRk6axmMrRmMa5yM7xk675w67xk6a5yMKZw6rZw6rRk6KZxj795jMVpj75xjMRljrVpja95j71oQ794Q71oQa94QKVpjKd4Qrd4QrVoQKd4QaxljrRlja5xj7xkQ75wQ7xkQa5xjKZwQrZwQrRkQKZyMSt6Mzlo6zt46zlo6St46CFqMCN46jN46jFo6CN46ShmMjBmMSpyMzhk6zpw6zhk6SpyMCJw6jJw6jBk6CJxjjFpjSt5jzloQzt4QzloQSt4QCFpjCN4QjN4QjFoQCN4QShljjBljSpxjzhkQzpwQzhkQSpxjCJwQjJwQjBkQCJxaY1pja2sxMTHv7/fm5sXmQu/mQmvmQq3mQim1Qu+1Qmu1Qq21QinmEO/mEGvmEK3mECm1EO+1EGu1EK21ECnmc+/mc2vmcym1c++1c2u1cymEUmPmQs7mQkrmQozmQgi1Qs61Qkq1Qoy1QgjmEM7mEErmEIzmEAi1EM61EEq1EIy1EAjmc87mc0rmcwi1c861c0q1cwi1vb2MnO/mpa297++1e61jnO/mpYy1e4yMjJRCQkJjrZzmpe/mpWvmpSm1pe+1pWu1pSnmzim1zinmpc7mpUrmpQi1pc61pUq1pQjmzgi1zgjmzkq1zoS1zkrmzoQICAg6ECmMzu+MEGuMzq2MECljzu9jEGtjzq1jECk6EAiMzs6MEEqMzoyMEAhjzs5jEEpjzoxjEAjm7ym17ykQa2sQSmvm7wi17wgQa0oQSkoQKSnmzmu1zqW1zmvmzqWEjGuM7++Ma++M72s6a2s67+8672s6a++MMWs6KWuMrWuMKe8QCCnmxe8QKQiMjEqM786Ma86M70o6a0o6784670o6a86MMUo6KUqMrUqMKc46MRCMc2M6Smv/1u///+YI/wABCBxIsKDBgwgTKlzIsKHDhxAjSpxIsaLFixgzahQoZ0AEORtDihyJsCO4AHFCkVzJEqMcBKkCwEmlykDLmxfl/MsoAIKqNwMAyIFQAAHOoxFDBbBpcagqOAME7ASgNCjSqwnlGAiAsoAAikNlGiBQUE4ccFjTEhSQCg6cAhEgwFEZUWuBNxDoGnwDB6TaqwgMFAigyCqCmRAFDBhcQO/BCFD/4pRDYLGqogT9vSng8KXPNwj8JhSAV3JLAQZUqYIgQPRArgz/JQD3NPTUhW9WmCbZ86mB0AgLLHBtkO3lqBAhBPi6WyOCwTONKtwq/WDPAKnIJoXDtHlFOaHk4v+trnAA94QECsABq9w7RQHh36xm3vA5hNEFChB/CCHOfvcJ/eOZKgF8VJdy/wl1UoIMDRDAAAwCONBLcDwVCn0HyaHhbQP1xyFBYek0UXoQRCihACcVMIB2CSEQx4tWEZRaAgn5ZOJ0qswhoUJyFICPYwdtxZ0BcgVw30ADAFWjKhlUFEoc5O1Y3BvdHZRkAHDZ5GCBfj2XSoIGBINhRAQsdaN7ckAWY1nKfJlKMHEYANIAwDDXk1cIGeBfRf4QxaKUB6nnj3VxDGDAcACcRRWUIGmlyphIQmkRAqqsCWhBh6GFaaEaMrfNfeClJNAAwfwpoypRRiRAnJcm5KClCAD/U50cRjInBzARCOQikAOFogqvEMkBB2utZigXhrFKh8Bm9AmgjFUEUPmfr6GcWZIBcxV7EAFviSbAsALcmZkB5EjXUQDALmtgRQKspu1BVYkmxzYRpLINAvjOWSdBlOZq0LIQfhgRlu8alCZoBMWRSirAbBOHMnJGsA2GQ2FWELcQDGqRXKm++y2xAs3xhjJQ4vvGNgGYStVSBiVQAARNWrRYlQXryvJAgaXyxhtGpmIpR90WdCekde1cs0EGIJyZTG+oLGNkaxFFdEQ+HV2Wchqr+lZBGcQ0NURJ/lxzKAXIOZFPFEfwKEbpcWb1QP8M8OtEXsord8cS+ZT12/4k//11VjRxOEAcfz+UGt4FkwYy2JWK9iSwEh1m9tschaJkRF2/QR8C7DgtUZ9wFK5tKhZD5GJ1BLgDuUSDI14wAZdJxG0qzLkodoYCINDaQZTeXjDZcejH+twArOr7psFsMzlBGYD7tlZcQYCc7HEciQCXC/UH1QCLxbEeiBEE4PqOPblVtujFLfYGPv4KYOZ0BcQBTAGpgJNffhiuSvOloQgWwOUPkU291CMTCAnkY38DBu0CoApgsMMooQDGn+TgrmIJADKXGZ/BLuiTnxiwIK9qUU1GtQBlNY4gRNGgaeJHO2vxKwD4KMruBNauVCDEdgLx1ZoIwCokARBQPlld9v8WEIqYKYR0wBIAMKzSEeIJhR00e4oFX+bCCcnEIXMwEu9kRZAQCgVXBWFWsdTmOYWE4jwOuQukKoYvGwLAHQEoXgoLoiaJ6KSKFHGZ8CCCv4eYx40GgeL1IhDCCEJKcdralcAQIqAKPuQu/1lAASrjsNAQ4HCBUoW2BPAy9I3qQREJH3CEBodtqIIArYEAMJaDkJiokCAC4ohQJgS3WYLIlrRMUO8MEktZCiU/2rEWJ/dYEH94RBUvagziyLa8usCSlgW5DYemskih1AqaAJAmABKgCn/5kiERiEMZhwKBxSHEH+rBo7x4ZEvX/Gc//7geILOyq2jeyH3NrEg4dQT/EW1+EyTVxOWZIDmVdR6wkxNJE6oycrcqurMh/8kdjb5ZELId6ZY4O6FfXMjN4z2Ek+a0Y1l4aZAzxqFpB7lNjwLAIEetsTMccwl1GrKT/dgUl7781gJ8hi29cMgvltvfQAhAlI3C8kyw8+akRLURlQpNLtwZlByQiM0J0cQAAwgFKkUEALmFgpoUZYiwQjoR932JIgEtC9mwhKGuNUYhnNzMW/JTzpioAo9BGmFO5riSlwipY12Dg+sUM0A4yCcOphTqQ/xRmcF4lKY6jEhNFyIgBy3ggxnSmRBBpCE5+GMOeBWKX1ECldAazJEhud5SCiegCPwwNuxKjW90t5Ee/+FpI5wMADgwuxBjqugmvRnWb0yrkAj8lidJQ2Ow2vJYmX2quexCLUUyEB4jDYp7v4GIa3mrEQHRhLgP4UtTAlOblzxpG8Eoyis7AhrwIqQnikirRiCA0oRuyYAGcBgqu+YwT3YVKO7917ACzJDDzPMhlluKdu6CLwBAJQOjwKRDFgNdP0JFvhlZaUSe8xbMxkGTAAgAMI6UgSU6RDEwCkn4NrsRtJ0YWzMxYkegkh4RM2WYHZPDHLh3P/Uobb6sPEqSWAwe5dx2IBlo038zgNrgDSR33EtFkVQDFwTsLSMFuCtShtlS1NQmQ8qbUDCq9CmhDAAc8jFl2azcEjjEEf8pU2VSSRwElKnJIRgXNctFE3WfJxVoAO1oDYHh6hastI53FcoOj5blxnm50axfcdFZAfMyrKhrP5RapfRGeZAPD8QdblOiVUBqRCG/QamTaYvKFKOznb0sFRGwzdNgDYDs3AkO2onbQq9C1avo2nXG9EkcZLJpAsRscJVCAPC0/GT2YYW+/tWI/iBKXZ29CDsXCpeL4AQODZXFSFw1mEjeoIhBLxahNJVD7vqX5Q/nZQD4ujJHXMvijUgxLeeqMIiUHRf68kV6UimOdFnij4EfZdoXqQxU3fKW4Q4kaDgp056xQjDcLoYrm4EAVjn8SrCM6sdYkYP9Oh6s6n74LqqeOPBKUrHTBOguXII29w1vNpKawkdnem2JVuSnigUQW+OhCIXu5JCBzm4owxW/ibrnIG+SvAQBA0gFkfLzhgWoJg5wcrXGDSB0Tk9EjZSrS7gIkADuGaqcRLnfznbGwKfkx2dZDVeEzKPvsC+k6FCOMlHWbliGm2+u9DNABLqeu63Zfcu5i8AAB/MiAnHlfgZIzRsODyB8sVs5yQRAQAAAOw=="] | math | multiple-choice |
222 | 如图,在梯形$$ABCD$$中,$$AD \parallel CB$$,$$AD=2$$,$$BC=8$$,$$AC=6$$,$$BD=8$$,则梯形$$ABCD$$的面积为(\quad).$$ | $$24$$ | $$20$$ | $$16$$ | $$12$$ | A | ["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"] | math | multiple-choice |
223 | 有理数$$a$$、$$b$$在数轴上的位置如图所示,则下列各式成立的是() | $$a+b0$$ | $$a+b0$$ | $$ab0$$ | $$|b|a$$ | B | ["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"] | math | multiple-choice |
224 | 已知函数$$y=a{{x}^{2}}+bx+c$$的图像的一部分如下图所示,则$$a+b+c$$的取值范围是() | $$-2a+b+c0$$ | $$-2a+b+c2$$ | $$0a+b+c2$$ | $$a+b+c2$$ | C | ["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"] | math | multiple-choice |
225 | 如图,少年宫在电影院的(\quad) | 东北 | 西北 | 西南 | null | C | ["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"] | math | multiple-choice |
226 | 计算如图平行四边形的面积,正确算式是(\quad) | $$5\times 10$$ | $$10\times 8$$ | $$6\times 8$$ | null | A | ["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"] | math | multiple-choice |
227 | 如图,这个圆的面积是(\quad)平方厘米 | $$3.14$$ | $$6.28$$ | $$12.56$$ | $$75.8$$ | A | 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"] | math | multiple-choice |
228 | ,如图,$$\angle 1=\angle 2$$,则有() | $$EB \parallel CF$$ | $$AB \parallel CF$$ | $$EB \parallel CD$$ | $$AB \parallel CD$$ | A | ["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"] | math | multiple-choice |
229 | 如图所示,两个长方形的面积相等,两个阴影部分面积的大小情况为(\quad) | $$a>b$$ | $$b>a$$ | $$a=b$$ | null | C | 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"] | math | multiple-choice |
230 | 如图:如果高是$$6cm$$,那么对应的底是(\quad)厘米. | $$10$$ | $$4.8$$ | $$8$$ | null | C | ["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"] | math | multiple-choice |
231 | 壮壮在圆板上画了三个叉,其中一个在$$R8$$区域,其他两个叉所在的区域分别是(\quad) | $$P8$$和$$P5$$ | $$Q2$$和$$P5$$ | $$P2$$和$$Q5$$ | $$Q5$$和$$P8$$ | C | 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"] | math | multiple-choice |
232 | 如图中,甲三角形的面积是$$20$$平方厘米,乙三角形的面积是(\quad)平方厘米. | $$10$$ | $$16$$ | $$20$$ | null | C | ["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"] | math | multiple-choice |
233 | 下列四个图形,按对称轴的条数从多到少依次排列,顺序正确的是(\quad) | $$dbca$$ | $$cabd$$ | $$bacd$$ | $$acbd$$ | D | ["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"] | math | multiple-choice |
234 | 有一块边长$$1$$米的正方形地,在它的四周铺满面积$$1$$平方分米的正方形砖($$如图$$).$$需(\quad)块正方形砖. | $$36$$ | $$40$$ | $$44$$ | $$100E.104$$ | C | ["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"] | math | multiple-choice |
235 | 如图,用同样的小棒摆正方形,像这样摆$$16$$个同样的正方形需要小棒(\quad)根。 | $$64$$ | $$48$$ | $$46$$ | $$49$$ | D | ["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"] | math | multiple-choice |
236 | 若路灯的杆子距离某物体$$bm$$,则下列说法中正确的是(\quad) | 若$$b$$越大,则物体的影子越短 | 若$$b$$越小,则物体的影子越长 | 若$$b$$越小,则物体的影子越短 | null | C | ["iVBORw0KGgoAAAANSUhEUgAAAJ4AAABACAYAAADrsc4kAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAArfSURBVHhe7Z1ljBTNFob5AQkkuLu7uyzu7rK4/MAdEgie4C7BAwR3gru7E1yCu7v7ufc5mSF7gc0M99thq+6tN6lMd03Pdm/1W8fq9OkI4uAQDnDEcwgXOOI5hAsc8RzCBcYS7+PHj/Ls2TN5/PixvHjxQr59++b5xuF/AcYRD4KdPn1a+vfvL8HBwVK1alVp0qSJrFixQl69euU5ysF2GEU8SHfq1CkpWLCgpE2bVlq0aCHVq1eXYsWKSebMmWXw4MEqAb9//+75hYOtMIp4ly9flqJFi0q1atXk4MGD8uXLF+1/+/atLF26VMk4ZMgQ+fTpk/Y72AujiDdhwgQl3rlz536x6d69eyc9e/aU0qVLy9OnTz29DrbCGOK9fPlSVWvv3r1/q0rpO3DggGTLlk3Onj3r6XWwFcYQD4nWtm1bGT9+vKfnV0C43Llzqx3oYDeMUrV9+vSRBg0ayNevXz09/4l169ZJihQpVBU72A2jiDd58mRJnTq1OhY4ECFV7p07d6Rx48YaXnn+/Lmn18FWGEE8CPbmzRu5fv26lCpVSnLkyKGOBgS8f/++HDlyRBo1aqTSbvbs2RpQdrAbRhCPVYqRI0dK165dlXQRIkSQqFGjSoYMGaRkyZKSKVMmiRQpkkSJEkXy5MkjLVu2lDNnznh+7WAjjCAeEowYXdmyZdXGq1+/vowaNUrWrFkjffv2lc6dO8vq1atl06ZNMnz4cA0mX7lyxfNrBxthDPGQZNu3b/f0hA4kXVBQkKpgB3thHfFwLCDehg0bPD0ONsI64u3Zs0dtv507d3p6HGyEdcTbv3+/HutUrd2wjnj37t2TfPnyyfr16z09DjbCCOKRZ1e+fHm/iLd7925JmTKlLF682NPjYCOMIB4JAsWLF/eLeCyXsV576NAhT4+DjbBO1eLVFipUSNauXevpcbAR1hFv165dunQ2f/58T4+DjTCGeCyVbdy40WdaOzl5JBI44tkNY4iXKFEiGTt27I9099Dw+vVrKVCggCOe5TCGeOnSpVMyhZaL58Xt27clZ86cjniWwxjipUmTRlOefBGPFYvkyZM74lkOY4gXL148GTp0qHz+/NnT+3scO3ZMMmbMqNkqDvbCGOKx/jpz5kyfEo9gc1BQkKZMOdgLI4gHmcjFI+PEl1dLVrLzau2HMRIvWbJkMnr0aJ+qliUzF8ezH9bZeDyb4cIp9sMI4hGb4yGfadOm+YzjUUGK7BRHPLthDPFYf504caJP4t28eVOyZ88u8+bN82kPOpgLY1RtnDhxZODAgT5VLYCkPP7oywN2MBdGEA+vFjLNmDHDJ5nev3+vNh7HumKN9sII4uEwEE6hkoCz8fwDZgbagRJuaAzapUuX1BRhjKjEYPLEtE7VPnr0SBNBZ82aFRAbj4fLTZekTNR9+/Zp+Klhw4Y6EQsXLixZs2aVLFmy6HPHVN3iOWSIaSKMIB4ZyMTmwtPGu3Hjhjo3XAM31mRQGRWyUUuQh93HjRsnc+fOlVWrVsmUKVOkS5cuSkJyHCGfiRPJCOJht1GizJ9wCtKRQZ8zZ06YSrzjx49r1gsJCJzDVPBAO5k8bdq0UbWKREOtMgkZD7a5fupIU+SoUqVKWgLONBhj4zF7/ZF4d+/eDUhaFH+3cuXKUrt2baO95W3btkncuHElV65cam5s3bpV1e7evXtlx44d+j1lPpjIMWPGlBIlSjjihYY/sfGwwYKCgsKceCdOnNCsF4oHmQyIRQoZhYsoUo6EZj9VqlRqrmDrYee1a9dOqlSpInXr1tUxMw1GEI8ZScFtf208pGNYEg8VRbZLtGjRZMGCBTJgwADp1KmTFg4iuI00PHnypDx8+FCuXbumUubChQtqIqDSSG5ABf6NG4xUQ+I/ePBAH2rn3LyKgUaqGNfBs8eoYI6l2hZermkwgnjcMFRDeBEPu6hjx44SI0YMvVEY7K1atdL140mTJum5SNsqU6aMShpq9aHqqGRFZaumTZuqtORZ30Ab8tiixDH9cYBQxUhFE98PYiXx6tWrJ2PGjAkzWwzpQA2+6NGja4gCCYzNlDBhQiUWkg4pA/mQMBSQpPo8+9RygQx4kZA20PYU14W36g/xmDQ4F0hm02Al8YoUKaLvu/DlAfsLYoMY4qh71BRSCwLGihVLDXXUKjZUrVq1VPXykhdIhgQkFOR9yNxfQvwTYOMxCfw5DyYBEvrDhw+eHnPgVO2/gW2Ec0MsDCnKezSQdIkTJ9ZUe6QYj18iaZEeSDzsQY6BANh9TAbiZ4H2iP+EeCtXrtTQk7PxQgE3lqLa/hIPz23q1KlhZk/16NFDY2M8swsOHz6s+zgZ3uvJmzfvD+IRP4OUqDHsJyQiN7hOnToBdzD+hHioWo5FKpsGI4iHKsCY95d4kIAlIZyCf4onT55oeIZ8QCrLU+i7Q4cO0qxZM90H2IDcQFQrfRCtYsWKOgHwePkNIQxsvlu3bgVkKc+LPyHekiVLdEnNqdpQEJ6qloX1mjVrqs3G+ZkA06dP/0E6QKiCY3iZH+/aINaHdCMvkJAFdVzKlSunwdply5aFme35O0Dy/Pnz+0U8Chtx3SauxFhJPNRyWBGP82Gj4S2ialGjP6vwq1evaj+xPAiJDcgnKhkCoG4pBg6JcT4CKfF42AmJ7w/xSJZlcjgbLxT8KfGIyLMwbvLSVqCAqsX+5NMXCIbz2tVAh3j+G1hJPAKow4YNC6hKMxUQjpgjKya+gBmA7Um4yDRYSTxCF4HKxzMdf+JcECZKkCCBkfWirSQe66i8Ot6fY8MKnAvvEPXONteMxGUfuw4Pmz7sPVSbt599+vmefQjD9/SH1lgp8X56t3EQsEWXL18u6dOn1+Aw8UQKVWJ/Xrx4UQsakVeIrclLpwmyR4wYUe1XfosdSj/2KXYrv/m54bGT7cLn+fPnlbxIToLkrGdzfmxdJsCiRYs0uYLVG6pAbN68WVdx6F+4cKHawGzjcPE/hESYEo94kdd1Z4AZFG4Sxi3/LANOHyEHwhjcONQAA9KkSRPp3r27DhAzlEVwjvM2XhXKd2yjask1YxCPHj2qD3kz2FSEZ72Uf55B4x9mn4FkqWvLli366lH6CTVwPEW8OSZkI6GSfo7x9mFTDho0SJ/1YBtVT/4gkpdMEEqs0de6dWvp1auXesb0sz9ixAhNOCCHjnVgXvhM/+8aKw3YZWyzkkKjr3nz5ro6QggncuTIEj9+fI0dsk5MOIjqCnjd3tfqcyyOBYFuPvG6K1SooJ+EikgBo/zvz42/gfPCJw21joQlksA29iXnI6BOVgxJuZyLB/J5lzD79HM9eN9sc/zPb9z8hXiQhEHnFZ4EVkM2lo+YRWyTBcs+g+j9Pjg4WAeJbYjBEhMxsRo1augF8SJk+rgg/nEkF0W3GUAGMmnSpLpNaIO1UI7zNmwVBoRt3mnGSgP7xM74JxkcBjx27Ng6QAwMeWvs058kSZIfg0O/9/f8jgEOOfjE67iukH3cUK6NG88218GAovb5m94+tr0EYZtGP5PFe1y3bt2UpBCTcWQ7rBsTgomBg8FE454igcKjITSQ+iHxC/EIKTAzWPSmMdiQiEFq3769tp+3vQ11SfvdNrPd2+fd5rt+/fopeZEmqARiT3+rISVRTV5V+LcaapiQjVdVsx3Ihi1smj38C/G4UBbBUWte1WZi5NvBbhjhXDj8/8ERzyFc4IjnEA4Q+Re4TM/tgpf72gAAAABJRU5ErkJgguiPgeS8mOe9kQ=="] | math | multiple-choice |
237 | 一个图形被信封遮住了一部分($$如图$$),下面说法正确的是(\quad) | 可能是平行四边形 | 一定是梯形 | 可能是锐角三角形 | null | C | 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r6HnNONKVTp07RVYO0goEgAVkz1hpmQfhv/PjxkUH07t07AbHw0a9fv/gZq+dXRtcvW5tPMfsY6Ec5pTPE559/npGObhvHC4hsbNO+fftw5plnJnvQifjRgGu77bbLyIXk5pkoxMKYMWPiDUuMsKcdXNS5Y+6AhLthcMK5qOpjPXgdPnx47CDM/PMeQIR7SsKhOgFgOCTq1NChQ5Pt9HgfZ7c2S2f9OE4khkI8RH22wZQTGK3xYZNmIU6O6c7eICqysrqH1TkIER133HGhadOmMTJj9U3OzZNIYiafsYkVtOvdZJNNIhel4xVPmJ48UtwdjFUzYn766acIQKuLs55EzqZNmxbnf968eWGjjTaKvmObFkhZKrXvlBqwNwxMQeeAM9K6RudlnQE1Eg4pZvXSKnFGsVxrbUHoih06dIg/BrDZZp9WTANGRG6TJk2iHxL9gvYmgwcPjiDkfURxeXl5fNKsWKf8cYsttoj6isT07bffHvWY008/PW7V4WI6N66YDQgxDoqq2rZtG8HDWgI05p62yfoMa4WYbtasWdxolPbXqGiIcEQ2XBW8iHkBRjjuDTfcEO0AeU+qDMZsC0vtdOFi7CfH3iAoqffdd1/MXRQA+YzcPACofv36sS8LXvmHH344uoJ23HHHCES4XsOGDaOibLnvE088EbbddtvYw5HzcmPkypHEKcPGR+WH9eGKyUiduv7666OkE1ho6tSiRYtoVNpwL90j6tWrF8Uv4IITsj60yEN0S0ryihqHTdG6devIHQGtbQCQs5jOLk3kdcKECRFMpAlxAZ6QPn36hO7du4enn346cZaqHmLAgAFh8803T5IuOc/cuXNDo0aNoi8KTtegQYMIRuvO4VzoKDyN2U5Vm6zrIzdAWsbCK+uIXsc6SnVCerVs2TIxICFEO9ILMH7yyScZayJfpLJ3ZsyYEUOC6KGzZ88OvXr1isandZjnDEZFPnQjtCahLBG2Lr2AHwIAydiBW3JTcl7zwwYOHBi22WabZP8QiFpqMsFbtWoVfyRiGv3TghHQA2LEtJ5muQ08Na1qEZjsoji5ecg/RTcX8FCjttxyy7jO1vmNUYnKBWe0Pl8FLvAfw2GRmIBQOQoYPRTmVdY/XLY2XUM/HhEJym3Bts3iwZpCN+TJ0Xv33ntv2HjjjSM3lCWOEo2OAQvnO1hucFfAqx8LCDFgADHfU5xT4tmbi+YORusN0UAikZkv6QdRWMWawVjsZqN0BWGtsMgFLG1KhBGEfog6xvpaDvzZZ59F5gPgqwRG29NZm9LAeinKX5NTFeLpgfSUYcA0btw4Gjv6gXBGRP1FF10Uz4s/qk2bNhmsHk6Ju0chQR/54YwSqfINk+6F20wPN6+467CmcakJUKwTeuQll1ySYRNIauHcxlfMthzZFQCcg0YO1FbLtZezmLYNPUeNGhWOPvroNSJbTwoObJ4CxagBEz+C/V6woDmOToGTFVbONShnRefEtSAL/KCDDorWnPf6zh8Yre7P2iCtKKIi7U+gEjPAogZAgJA1ItgAV1Qfdpvcwvs40jGEhAObc8C1Efl8pjKFWmUVgUsOT54UniDCfpVxHxBpgSXrB+H+Ia0IqxvA4b/CYWotO54o3uc4TyQ/XpaZgzE/QyJV8WV0OaSStQ/EzXDzwDER2Xg20P2RbtbvLKBxPtZc4UL7njCAOxDJSj19lTij2DruGZyasNi1mebS57DG+I6MET0hWN/cJOfRj1YGiG4K605Po3QVH/lxeMsTofnG4EC/E3BsOpic4XwGJzfc037fpgeyrkTjpNpZf6b+5jjWuHCRs84IEEA0vkRtNLkm/551F6BXoMzaDBA9eTJSbONJTYY+pwhBvppP+vj/NcpO15MaJq5oE1tsppRdI7vjLcexrlHNdG6bUiZQ8lkiMWAJP3HO1jQnxczHXJczO9sHaUN4uhm+Q/zTJnFmuxWy49n/9Tmn6lM2t8reH9Dmilpg2vezcxOVUYWvMjvv1Cbu8oq6huFKuNEGOLLtggp1RtwqbM0Fm5YVZt0CFYl1ToyVTGzZOVrdGOQckPlj/Y7WKW4TYIjKkFdgN7fPFturgRFWSgyYi2BZDRs2LFrFELHGNRF+K56SHj16xC3Z1vZZp9pBuOEIbLD2wgf6IetPFIZj/M0r2T3kNWDsCIRSGdYIRjghMp6TQvgOASRtS4hRZhNohyNycf7ms3ynos861S4CjACN9ed/1h4CC5dddll8H0zwCpaUwmYrCq0UrdCahq3a/s0KAdqwXXb6ujX7bTDeqfaSLZjLXn9rvUs/lLpnSyD+E4zWj2RPuiblWLqmVU7dcKgbhpF1gFuQ2ldr7FrrPLscoawycU0fPiobA1/b8Zyd3j58pDUcjD5KZvwfIEkp72H3PSIAAAAASUVORK5CYII="] | math | multiple-choice |
238 | 如图中有(\quad)个平行四边形。 | $$4$$ | $$5$$ | $$9$$ | null | B | ["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"] | math | multiple-choice |
239 | 图中有(\quad)个锐角. | $$10$$ | $$4$$ | $$9$$ | null | C | ["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"] | math | multiple-choice |
240 | 如图从甲地到乙地有$$A$$、$$B$$两条路线,这两条线路经过的路程相比较(\quad) | 路线$$A$$远 | 路线$$B$$远 | 同样远 | 无法确定 | C | ["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"] | math | multiple-choice |
241 | 周日小明从家步行去成都市少年宫,下面说法正确的是(\quad) | 向南偏东$$60\degree $$方向步行了$$300$$米 | 向西偏南$$50\degree $$方向步行了$$300$$米 | 向北偏东$$30\degree $$方向步行了$$300$$米 | 向南偏西$$40\degree $$方向步行了$$300$$米 | C | 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wEEt+flq1EQqFFmZ2bknD4eK8fuk2yLxF7Gq2shE6QGKKzHQubjKVy+xOL9IElb1KIj7xbWxu6JQoJGYlKyc3NdfEO9EpXd6vM+aZkPxpKgpjsnsD2J+yuwN6yMzPTeo49gyA0G3uxSRiba3PM4nbBkjcpHKq3mQyryzppsNNeYXG++OcT21ia3QhraitV3Q6tLB8Rn1tIWVlZrttTshcvm5DV1lbrRtGrq6va9zkc3jIjrCROxx3pLZKDJW9ScBxWJGns7Z8veUl3bGsnKaMioVY51Pe2tTfKs+ePjGT1qursgm0yy8tLdd9cvgOg13Nh4Vvz3AHdrGxmZkoTQmgpOzk5ptLX4nbBkjcpHGqv5cJCqorOJyakysp6qXvrJoL5Bb88/O2+/PrwnuZB9/V7ZHJqVEm8tLwob/KydSd6FysrQck3NnVzs6OazwfmDIEnDXHHZXp6Qu1ji9sFS96kcDl5IVFvr0d+/fUX3cIElZZc5njs3tHRYfnxnz9ITu4rle4UL2RlP1cbe2Z2Ul6+eqJbobjAribejBZAA/j9g12jUgfMWLT27i2FJW9SuJy82KOcKyoqkPr6WikrK1HCsRPgVaDI/6f//FP6+3vUpt3cWtf+0C9fPVXn16Mnv5r3aoo+26jSm+tSZOxqwlZutheLRDwLhUVmwpI3KVxOXo+nS37//aFK0e3tiAwO9qtTaWJiPPqMi8FODL8+/PlEi5yh4T6tAc5/myOPnzw0KnJD9ExMcX9NuVGtbTP8uwBL3qRwMXmJr3IclbmpqUG361xdDWktb6zz6SJgq+Ks8g70RY+IjI+PyouXT1TyQuDa2sojyUo/LCSvp6dLH1vcfljyJgGSH9h6E7UYz24sKKxnk2zIjd3LPkQVFWVxh2xowE5SR2trQ5Sgh1p+WFJaIIFFn25whhrthpCmZyalqtq8//yc8wYWtx6WvEngJHmPvbmbmxtq47a1NetzsFnJhMLm5bkkU1xli+7t78rwiFdaDHlXVpdke2dTvIM9mh8NkVGTPT0d4vNPy/pGSGuEx8aGrI17h2DJmwQgZnd3h6rH2LQupqenJDf3tUrfWJDf3N7eqjHa8fGxK4nG+7MQBEMLsrG5IuEIqY7H9iwLxs7ulp4LLM4l1IrHIvNhyZsEsF1dyevavJCY5AkIel6IhniraydD8nhAd8nLiO6csxL3rsGSNwmgDpN8EWvzLi4GlLiXeZQheEdHm1RVlWvs18LiOrDkTQIkXEBC9tVFCiMh+/p6NCHjtAPrNILBZSkuLtDXWzvV4jqw5E0CEJYURcgLkKJVVRVa6XMVICzPw4kVDC5Fj1pYxA9L3iSATYsDihAQNifVO2/f5mmecTwIhUKatDEw4I0esbCIH5a8SQC1uaWlSd69y5epqUkt0SMhI17nEdKXUr6Ghror1ex0BN5wUkDJICOphGomi5uDJe81AfFQk1GZSYEkNPTmzWstxUsEJG1A+oWF+eiRxEC/aLZKuS5YNMj6StTuhrgsPPzuhw8fyLNnT3ThIrMsnYGzMBze1IU302HJew0wcSEpk5UOFu3tbSp9c3Oz1ducCJaXl5W8FNdfBz7/nPT2dRoSns2tjgdzc7NGe2hUCRovIDrdOwiJUWhRXFyo5kN3d6cxAfq1CUC6or+/T169eqG+CTY2T3TRSidY8l4DVAWRQYW6yAruqI+L6mX2evujz4oPFNajNhP7vQ5oI0unjetK39HREU3jpO44XtAvi+wxtIZAYEHq6qpVc0DqkgpKamd6wSEoRG1sbJBvv/1avvnmL/Ly5XPp6/NoOWUmktiSN0FAVnpHkZwBaWPh8/mUiInYfkz46uoKaW5u0gl09XASNhh8PrsUlpUXSTC0pI8vH/vR4TwmTj00NCh5eTlaOMFjznMbO04f4/ezUJExNjlJDne+JpzQVwtpPDTk1Q4eV43d3V0dOP7c+87YkZ2dy0ZEVX1Ix/+3tkbrn5A6Clk4AoF5s5j4dfh8s9qGCClLYcerVy/lyy+/kE8//Vhv//b3v0pOziuZnhmXgwzbajVl5HUu8F70AnN7epjj5oJdNI4vqnMxYx+fvLCJjJ2jcf4kOG9sn3mMjcRgwjARamoqzQQ+q+YSu8UGphSQxnE8ZtIgnZhISDceM2gQNz/vUzXzubEXsZcnp0dlanpMJqecMT4xLGPjQypdR0cHtQMl+c7cco6a37fvcuX3Rw+kobFGHw8M9mkBA6Pf22PUxF79DMJSSHe+G7fufaTu/fs/q+rrnmNhIvkENRhJyujp8Zjz3dLR0S7Z2a/UzsXLjrlA5RSvr66ulMePf1fzobm5UVVp1GruMzAzuMXJF/uY53CMx2g0dXU1RwNvPLccZ2F0z3O8trZKFxEG9xl8B1RihvsenOd1fN979/4rX331Jx2ffPKR/O8f/0d+/NcP2q1kJ8N2aEwJeSGZ28GQi+4OEhAYXWb0tLdLV4s539yst562NulubZWu1hbpMMfaGhqkqbZW6qN/OBeK4f755w33wjK4z4XDfuQicfG47w6OcUv2ExlRpCfm578xq262PuY8MVfO8zze6/j9So/eEwfN06ePlBSnger44sUzbXsDKRgkYlBRBKkZ7mdwjPfj8evsLCVvWUWRlFeY55aZ15hBYzs6Y5QwSgtUwrqDPYE5l/smS15lPZN3BW+0nresvFirjXgfvV9Rrv+V+z/G/hfuY74Lt7H/I+diCeOShsf8dxD+t99+1ddBPF6HGspx/k+97mYR4BafAIP7LA78dwwWFKQ45gdSEQcYjfPwXONTQGoyWORY8IiHI12RskhbijNYJFlYt7fD6oxyxraOk4vwjpo7/Nbvv/9OPv/8U1WdqYumwAM7HW0mk5Ay8rK6c2EhsLtyt3e0Og4dQ9BOQ9j2piYdHUZFdEnb2eIM7rc3Oasyo9WcZ7Ayo4qxKutK3eI8h/d2pQMTAumA5Dg+1mWOOcfdiYJTiMF9jkOmJ08e6WcwaZg8k5MTWlCAhGUwiXiMWsktk82Z0DVq+7ngP+B9mRw8lwkHmZlsa2sho96taZHBVngjqvI50hwVkInHjgvbjO0tY7+umbFh7jMpt/Q8k9LRCpzhTFJex+MtiWyb9zXPPz1h3eFqI+cd47u7951xfO68wWeTScb/NzwypGYC5GNRaDW28Jp57GpcjvbkjCMNLDpiVXh3HJsHECn1ZGIR+cc/fpAff/yHLjyYG5gimYiUqc1cDC5s7MV6nyN2Epw3nIlxdnLEDr/frxOOFTx20pycPGePQ1qkKhIGkiIJWLCQVnhv7wIoWZyamZROs1B2drVLk1lUe/t7ZMMsUOkMHHRcJzpqYpJlMu60wyoYdLzGkDcREFZBfUY9xuZ7/TpL1UaI65D+boDfumXUzdBqUDaNJsGime5wnW+3AXeevNh3iUhLVETX9kPqQv7s7JdabH+XiGvx4XGnyUuYAXuawH08wNajYyO2Hp5kQFM5HmMnWljcJO40eVGfHEcbjcovV6VQt3B2UXiA3eQCZxj2byRy9RafLuiGwe4J2N3XARIee23f2J28ByEOumzQq/ky4KENhZav/bkW6YU7TV5AOiMxyqu2A5mbmzb2bZ6QQeVOfkiEhxtC40GOF4Q86E0157v8M/E+b2yuGpLu6fsHQwEj4beNuu6XuoYqjQGvrC5rMzrCRJNTZxsA8F35ngwWKr4roRg32YPzLDwMHltkDu48ebe2ttRuRX1Gup6HlRWnTre9veWU1DqMhkwKE1Kb2cqEOO3E5Fj0yFkgVdnEjI6QJGx0dbdrQ3Ua0JGAQetXnyE/34fkDOKVA0aFdwE5F5fmdVEiFopTjvAYjjY8405GUkhjrGgO2PD8FxaZg4wjL5PVjReeJhuSwz0HsU7jJPFcHGrwnvAB8WFisbFxP+xiyN3UVH8uQb3eXiktLTJqbPzkXQjMq+QMBC7OJyZ+29hUKzW15fqbyMgqryjSDKyJyRFN1AgGnRxiYtRv8rNVogL+h8mpEamrI3TF9p7EdYkTR5TISHEGCRD8NmLTxGkzNd55V5FR5IU8g0O9ZlLXaTrb2NiQOeqQlMnO/rXjEyNmcg9LYNGvkxhAciQPBCAf9zz1kAweN+sJ2xbJtLm5qQn4ZEFx/jR4HxJBULuRlJcBYkAiFhA806jNSEbn3NnvQwJGc0udJj0APr/eEH6BDcRmJzSjCiIfGDu3p6dTsl4/P5LkW+FNTZekKTu/m+/G+6GuLy0taE4w991kGkobLXEzDxlFXgiJuonUYeMt8n0BxO3salNCbG6tyezcpJm8tUoOiIv0mTTSCUKSJXVR2R5St7fXyRx68yZHHj36TW1Ep9b2LMEAWVWkO17l8PL7ZzRtcXFxXj3VENHvn1WpurK6aOzbkyorkpHnkOZIX2YKEEiHhLyQNjc3SzcdW1qe19/KTgquzcv2oEvLfmGjMYhJXjW2OamgZBVRAYUURtry/fndFpmHjCEvDhUI2tHZaibbmpmgeFodwpA0kWMmMxMRoOpWVJYJ/aXIcUUaI3HAQsBnpPfFbWeQjHhkyXv+179+VDvxMgwN9Rvyllzq6YWgNEVnW05SJal8YfHBZgX++ZmoFD2WfqRPUgBRbOzpUGjJfI7X3C/Q15AdVF1drqmXvAbvN8UAE1G1ORZ8NgsWySTPnz812sqoHkfaz87OqKYRbwtai/RCxpAXVfPFy2fy9OljrUKJ7ROllTnPn+hzAGma5CsjPSEtuwpAWuK07HGLA+gyQBBSH9vaWk8Q6jwMDPYYUr29dONsyFdbZzSFsWElDSpwXX3lEXmRsn193Wb0Hi1IJMo3NtRrLi6vgfD8psXAQrSyqUqlKiAfOz8/V29jwetIJHGLCShCZzEizIQ2gspM3610Lp63uBgZQ17ISmYTKYm//HJP1VkmL84pChWQKthyAMJ1drRrqRoEIXEf0hJaoW5zw0jui+C2toEcqONXwTvghGku6mQBgfjs5hYcXs77sciwWdjM7LHEmzIqL2rt8DB2/LEXnOIM3oM8bKQkKjyOppKSYnVQQXwcbVT0sAuDC16DBoE2QuEGRR08h6onbHv+S97H2rqZi4whL5ORggTUZ+xSqoEgGJU53DIxue+CSQt58cQC1EcnMeJi2xQJhHTDexxvWxi24sQOv0htXltflZ7eTpnzTUePOJuIoTaj/rpA1Ue1zcvLVXuU70IpIkRjUaJoHlWeKidI68ZrOUflFlKVJngucO7hrGKhQNq6dbXU29Jzy9FejquiLDIPGeWwcoFazIRlMqsX1kgoJEpsBws8xk+e/H5CGl0GJrvGUgveJmQD4kjCqXRweJa8SDXs2fFxR112gcOMEND0zEk1l3JDqpxwIEUizrYp1MDyWmLNnOf3EltuaKjVhYxz7M7w9u0bvXXB8bW1NTUpiOUiZZG2LGio0BCa98O2tshMZCR5AXYf6i11skhZbF43nIMqzaRHGrs5yFcBh1Fefo4MDQ6cINpVIGFCJe/+2TgvJJzzTRpJejJ1ku9J36nZGLUZQEYnbOPEq4kD4xl2gTmg9rIhoet4AhRWkGgRu1Bh37v1yEhfCI8KTiEGUpf3xQNNtwvi3FfZ9hbphwwjr0sqpM2YluEx0XHKoDbifAFMXFRpyB2PTbccXNAwztkMqqtB3LmgMO9MqAcQX6U162kQuqmoNDbrFY4z5/ceLyRIYxYqiMhvBPw+HFWo0bGSF/KjfuMrIP8aCcxrIHhnZ5uaD5CW1jHF5n8aHRsx2sPl4S6L9ELGkBf7jZxepKpj93pOOHdQMemxBPl4Lo/jUZlDZnIXFL6R+oZqfe9EAXnZBHsrHF+/YgjV1t5spHy2kZjHdvBVgIx4iFmgjlXdQ9UsSCLJynqhEtgFpCau7XQHoSG6k6TieNFbos9ywmyt5vHAkFfjwxaZg4wgL6QioQCvMqogNiM2XKyUdBIwpjRzCEns882pVL4MSKLO7lZN+nCznRIFucZkO4XD8SU6UNmDlK+tq9TCg3iAlIR8eI9Pp2hi5+NJRhWOJbWbRcVCx//klj/iJzgdUuL/ZRzGSHmL9EfGSF6cVE7KIhtMn79fLcfdcRVxUWmpxsFedSTg9SYu4ScKBuIlrxJxI6jVQvECKYrkPe83ccxtCxQLjseaDDzGnrYlgbcHGeuwShazc8ZOfJdr7EfPuaSIF6NjA2rzxkteC4tU4U6SN7SyJNU15Rp/vSzuGw9GRr1KXnKqLSxuEneOvNiI2Jwk8ydLXIDaTMEALV0tLG4Sd4q84ciWtLU3alNzKpRSAWpraYjupmZaWNwU7gx5Scbv9jjdKOYX5syR69u5sSC5g9zm9Y3E2sdaWCSLO0NeCtjZPmQkWgOcKkxNj6rNu7Ia3274Fhapwp0gb2DRp8QdGOg9ET5JBWZmxuVdQa6srMSXhmlhkSrcevKS3EDvJ82gOkh9BtHMDC1pLHktbh63mrzaB6q1wXEoxZm+mCioDya90pLX4qZxa8lLGqGnt0PtUf/8+9v8i0J70iODoXTbDd7ituOWkvdQN6DOy38twyNnN8FOJSAvPZSXls92l7SweJ/IaPKSz4tNS58qcnY1uf7wUPdcLSx865T4pdhBdRqEikizTFXc2CKdwVxKTYgxFchY8tJfik4QlLdReN/S0qy9muigQStWmq5RfPC+AXlRmxcuaaBucVuQPsQFGUleqmhGR4e0+yGlblQc0SAdEtOjyekaeX5v5lTDcVjlaXdKC4ubREaSd90Qlq02TxOU/XbpKEE3xZsC1UmQ1+e/fNMwi/hwWYUX55xyxvSSgB8KGUletiyh+bpjgxwjHA6r9HU7Rt4E6FFFnHd2zjYuvwqQb3NrQ8KRs00IMINo2UOLIMd/sRc947yO3HHOcW25jT1/V5GR5N3YYFuSbtk71VWCdjiQlx0CbgpsY4LDamrqZHcKi7NYNJpSYXGBtLa36I4XLuhoQl8uGuLhx2hubhDa4rpVXzMz06pN0QWT/ZXwZywv27h6RpJ3K7wl3Z4ObYlzDKefE7v50XHjpkBfqPx3OXE0k7Pw+Wfl8dPfpaaObLfjckw6YdIRk/ZG+DOc1rZ12rqW7h/06MIZSTSBnls0nx8eTqzL521ERpIXlWlsfFh7WmH3shMBPa1oKs7KfZMXlc3C8t++tuSNAzSgz3+XZ8hbdSR5I0bqllc40QEcj4D+YzSbp+MlEje2ofzBwZ5KZggc26f7PNz2nlwZSV5ABhWdFGmqRu9hVm5anKaiwD4RsJ0KySBT02c3+bI4iW2zyJZXlulAewJ073yTl3OioyURBNr2soMEg+hBIHCcBAOhX7/OUs2L3tjYytjMbP0CoZkbke2w+I1t7F/w6bnbiIwlL8DzyBYnqFI0pjvdhO0mgOTFYXV69wOLs6C1bEVVuZSWl8hmtNNlwKjK2YaI+CpccC1LSgrl2bMnus0qHS/pMe1iYMCr5HW3cYHchA2R1MT4WcgHBvulpa1ZSsqKZXKaa3P7pHBGkzcdgM1LkoYl79XYimxKQeFbKSx+JxvRPYEDSwuSk5stnV3t+hggPQsK8+XFi6eGvA8NObPVn+Fi0JAXaT1k7F40r6fGjh4Y6NPikDJD1pycV8aMGZepmUlj0uRKl6fzhI19W2DJmyTYta+wKE/3ALa4HPT5opMJ7XbZvR8sLQd03+KubkJ/Dja31vU5mCM5ua8kNy/raCsb0Nvn0dfQYKGzq1XeFbJnFTH/Q2M71xjJXqiq93JwUSMBXd1tsncD2XY3DUveJIEtxv68lrxXgybz1FazMZvb8ws7lab3rW0NR9ut0FKosqpUGptqdWtUSMxuES7YZJ33Ca0sKjHLzH280sT9eU19Q5U2m19dC+kiwGZwtxEZQ163mfrFwKY5bdfQePz92jqs+HTpYONsi8vBvk3s0US3TTaIc9HZ2aJkXV1zNllj32JIR8XW4pJfyU6VGOd297Z1t4me3g59jBTmPbGJD2Vfydva1qhOqvX1FX1fOnzeRqQNeWlPw2ZdLkEJ/+C4ADs7O1pwwL4754HY4EJgTpZPleVFtrd0i829/ffnbSTxAMk7NOyNHrG4CPT5wsRw6p+Pbdg1IyHZbXHON2XU6TXd87jP263Sk3DP+MSwDI94jTq9KvMLs9pI0LWB+/o92g3Uuc4RJW5be5MmfhDvb2quU/X6NiJtyEt3Ry4SJIXI2Dhk0+zt7RyFDmI9krFgI+qm5lq9qLEgjNDcUqdN51il8Uan2iON5C0qzpfBwdupmqUSxHl7+7p0bJzqtolKHVwJKEHXN0Ia6nHBfGAhjmxvyMbmip5zFSpU48DinHk9uyYe6gLBos/1ZiAQbqO9C9JKbV5cZOvLMk24IHZHZg2bhrFhFmEBSHoaXCDIXVlVInX1VRKOrJsLtmlIv61hpPaOZmMjtZiLvKybglHCx0VOFXSXPmNzEZqwuBxcK+LwDO6fhku4i8G51F27TEfakBeJyGpMltTw8KAW2ZMmx/aUlP8RkOfCshMe4RnUa1Zk1CzsoVdZz9SxgdrENiY+o4L5/NOqMhHGQd3icTCY2lLBZbOwlJUXWvJa3DjSgryoSn393eqxHRkZ1CR/QjB4GNljl4wapDEEpuTv+fOnKpEBdg420r37P2nzc0jKDnzU2aJG7+3vSMSoVJA4GFxMudqM5MXz6fX2Ro9YWNwMPjh5t7e3paOzRdVbbBpsX+xcd9tKUt2wYfBOQl72ou3oaNXOkA4O1Sv5fz/9qHW1bPiFrYvTwjvgEMooazI7N6lSeWJyVI+lCpSv4Q3t9/ZEj1gkiqvV5auRivfINHxw8kYiEfH0dKi38OBgR21dig1w/bMR9ezsjBYgVFdX6gbb7mbRLnYNySH+f3/+tzx+8lBDA+5YWXU8kryGz6iqLpP+fo8eSxX4noQq8HpaXA/0HKMe+nhBTgyEoPxG43KjE3cFH5y8rJZIWHfVpGKI3lNUj3AxKTYgd5V8VaTcaUB+YnvZr1/otp0trQ0aBxwc6j3awHpsbFhzZQMBv0r2VILkgKrqUrM4dEWPWCSKkdFh7YyC4/E64HX9/T2a436XkBY273nQ0JGRtFQMTU9PabkYEhd1muHgUNbWQ2ovI1WxfbGB8Ta7MUGarTMxkN7vA4Q/6upJGuiOHrFIFAODXi0JvKrE7zRcVZnXEY1YWrpbvbPTQPIeqD1LQJ1UOQapc3iZc3KyVV1GjSZMxMWhesTjcTbFRkKTIrccXFAbNzZRggoWtt9saqkz71GhrVPeB/gc/8KMJmtYXA/Dw0NSXFyoLW7QtvBZEG1Aq2FexA4chOQA4MBkjtA1hTlRUVGmMfe7hLQgLxdqeXlRSUxsFluXcFFW1ktdkV0bmNuZmSm9cNFXm9fva/sbnFEDg33R4w4I3mMHU9jN894XzLdQCWBxPRD6Kyh4p2V+RUUFOqjjpRSwoCBfH3MNKffjlvg/g/uVleU60NDW163Ne+Ng4jtxW4cEjJWVkK7Gg4MD0XPuOEsUYr9sJEaSugvUbuK/VJ9wkQktuaq3RXqBa0JTQXdhZpFmIGFJ0EHiohqzsDvaWVijFAxSZxn4Sk7Pi9uOtLR5UYmxdwsK3hpV6uoOFajUOK3aO1r0ApKUPjk1oskaxHtxWNXX1+o42ffKwiJzkYbkPVSvck1NlapRqFRXgRXYO9CjDqud3S0tUqCf8s4OObBOSp7f79NcaewkHltYZDrSUvKiAuFgQvrGq+bu7oaN+rxmyLpnXsM4/br3U5hgYfGhkJbktbCwuBqWvBYWGQpLXguLjITI/wfs8FLXNkkqRQAAAABJRU5ErkJgguiPgeS8mOe9kQ=="] | math | multiple-choice |
242 | 下面交通标志中,轴对称图形有(\quad)个. | $$4$$ | $$3$$ | $$2$$ | $$1$$ | C | 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"] | math | multiple-choice |
243 | 小明用一张梯形纸做折纸游戏.先上下对折,使两底重合,可得图$$1$$,并测出未重叠部分的两个三角形面积和是$$20$$平方厘米.然后再将图$$1$$中两个小三角形部分向内翻折,得到图$$2.$$经测算,图$$2$$的面积相当于图$$1$$的$$\dfrac{5}{6}.$$这张梯形纸的面积是(\quad)平方厘米. | $$50$$ | $$60$$ | $$100$$ | $$120$$ | C | 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"] | math | multiple-choice |
244 | 已知邮局在学校东偏北$$30\degree 600$$米的位置,则学校在邮局(\quad)的位置. | 南偏东$$30\degree 600$$米 | 北偏东$$30\degree 600$$米 | 南偏西$$60\degree 600$$米 | 西偏南$$60\degree 600$$米 | C | 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"] | math | multiple-choice |
245 | 一个长方体,如果高增加$$2$$厘米,就变成棱长为$$6$$厘米的正方体.原长方体的体积是(\quad)立方厘米. | $$24$$ | $$72$$ | $$96$$ | $$144$$ | D | ["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"] | math | multiple-choice |
246 | 如图中有(\quad)个直角。 | $$2$$ | $$3$$ | $$4$$ | null | A | ["iVBORw0KGgoAAAANSUhEUgAAAGwAAABLCAYAAACVz2JDAAAA2ElEQVR42u3dsQ3AMAwDQe2/dFK5SU8glO8BD2AdVGseVTVGAEzAVA02M1e9VRv2/dC6jdoEth0LGDBYwGABAwYLGCxgwGABgwUMGCxgwFaC3Y5VBQYLGDBYwGABAwYLGCxgwGABgwUMGCxgsIABgwUMFjBgsIDBAgYMFjBgnWCwisBgAQMGCxgsYMBiYLCKwGABA5YCg1UEBguYUmCwisBgAVMKDFYRGCxgSoHBAqYUGKwiMFjAlAKDVQQGC5hSYLCKwGCVgN12/W7FhT7b9eONMwJgAqbTC2SSsAMMPCjmAAAAAElFTkSuQmCC"] | math | multiple-choice |
247 | 这支铅笔长(\quad) | $$1$$厘米 | $$6$$厘米 | $$7$$厘米 | null | B | 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"] | math | multiple-choice |
248 | 如图中涂色部分的面积和空白部分的面积的关系是(\quad) | 涂色部分面积大 | 空白部分面积大 | 面积相等 | null | C | 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"] | math | multiple-choice |
249 | 如图$$ABCD$$为长方形,$$EFCD$$为平行四边形,比较阴影部分甲,乙的面积,(\quad) | 甲大 | 乙大 | 甲乙一样大 | 无法确定 | C | 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"] | math | multiple-choice |
250 | 在如图中,平行四边形的面积是$$20$$平方厘米,那么阴影部分的面积是(\quad)平方厘米。 | $$4$$ | $$6$$ | $$8$$ | $$12$$ | A | 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"] | math | multiple-choice |
251 | 杯中原来盛有$$900$$毫升水,将杯中的水倒出一些,情况如图。求杯中倒出了多少毫升水。正确的列式为(\quad) | $$900\times \dfrac{5}{9}$$ | $$900\times \dfrac{3}{8}$$ | $$900\times (1-\dfrac{3}{8})$$ | $$900\times \dfrac{3}{10}$$ | C | 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"] | math | multiple-choice |
252 | 用$$151$$根小棒可以摆(\quad)个三角形. | $$50$$ | $$65$$ | $$75$$ | $$80$$ | C | 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"] | math | multiple-choice |
253 | 如图是在平行线间的五个图形,它们的面积(\quad) | 都相等 | 都不相等 | 有的相等 | null | A | ["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"] | math | multiple-choice |
254 | 甲、乙两只蚂蚁以同样的速度,同时从$$A$$点出发,甲蚂蚁沿着正方形走,乙蚂蚁沿着圆形走,(\quad)先到起点. | 甲 | 乙 | 同时 | null | B | ["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"] | math | multiple-choice |
255 | 图中共有(\quad)个角. | $$4$$ | $$9$$ | $$10$$ | null | C | ["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"] | math | multiple-choice |
256 | 从下面的扑克牌中任意摸出一张,摸出“$$A$$”“$$2$$”“$$3$$”这三种扑克牌的可能性相比,摸到(\quad)的可能性最大。 | $$A$$ | $$2$$ | $$3$$ | 无法确定 | A | 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"] | math | multiple-choice |
257 | 用一张长方形纸剪同样的三角形($$如图$$),最多能剪成(\quad)个这样的三角形。 | $$12$$ | $$24$$ | $$25$$ | $$10$$ | B | ["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"] | math | multiple-choice |
258 | 如图中各图阴影部分面积与右图中阴影部分面积相等的有(\quad)。 | ③ | ③和④ | ①和② | ①②③ | B | 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"] | math | multiple-choice |
259 | 如图有甲乙丙三个面积相等的平行四边形,它们阴影部分的面积相比较(\quad) | 甲大 | 乙大 | 丙大 | 相等 | D | 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"] | math | multiple-choice |
260 | 如图,用直尺度量线段$$AB$$,可以读出$$AB$$的长度为(\quad) | $$6cm$$ | $$7cm$$ | $$9cm$$ | $$10cm$$ | B | 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"] | math | multiple-choice |
261 | 如图,阴影部分面积占整个图形面积的(\quad) | $$12.5%$$ | $$\dfrac{3}{8}$$ | $$\dfrac{1}{2}$$ | $$\dfrac{1}{4}$$ | B | ["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"] | math | multiple-choice |
262 | 如图,已知线段$$AB=10cm$$,点$$N$$在$$AB$$上,$$NB=2cm$$,$$M$$是$$AB$$中点,那么线段$$MN$$的长为() | $$5cm$$ | $$4cm$$ | $$3cm$$ | $$2cm$$ | C | ["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"] | math | multiple-choice |
263 | 如图,把一个高为$$4$$厘米的圆柱切成若干等份,拼成一个近似的长方体,表面积增加了$$40$$平方厘米.圆柱的侧面积是(\quad)平方厘米. | $$40$$ | $$20$$ | $$40$$ | $$160$$ | D | 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"] | math | multiple-choice |
264 | 如图,比较图形$$A$$和图形$$B$$的周长,(\quad) | $$A$$的周长长 | $$B$$的周长长 | $$A$$和$$B$$的周长一样长 | 无法确定 | C | ["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"] | math | multiple-choice |
265 | 小方可能跳了(\quad)下. | $$26$$ | $$62$$ | $$88$$ | null | A | 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"] | math | multiple-choice |
266 | 用一样的小方块拼搭成如图甲、乙两个的几何模型,这两个几何模型的表面积(\quad) | 甲$$>$$乙 | 甲$$=$$乙 | 甲$$<$$乙 | 不好比较 | C | 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"] | math | multiple-choice |
267 | 数一数,图中一共有(\quad)条线段. | $$4$$ | $$6$$ | $$8$$ | $$10$$ | D | ["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"] | math | multiple-choice |
268 | 如图图形沿虚线折叠后能围成长方体的有(\quad) | ①和② | ①和③ | ①③和④ | 四个都是 | C | ["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"] | math | multiple-choice |
269 | 如图,求梯形的面积,正确的列式是(\quad) | $$(4+7)\times 9÷2$$ | $$(4+7)\times 8÷2$$ | $$(8+9)\times 9÷2$$ | null | B | ["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"] | math | multiple-choice |
270 | 用火柴棍按如图所示的方式摆大小不同的“$$H$$”,依此规律,摆出第$$n$$个“$$H$$”需要火柴棍的根数是($$ $$) | $$2n+3$$ | $$3n+2$$ | $$3n+5$$ | $$4n+1$$ | B | ["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"] | math | multiple-choice |
271 | 一位同学在一个正方体盒子的每个面上分别写上:我、喜、欢、数、学、课,其平面展开图如图所示$$.$$那么在该正方体盒子中,与“我”相对的面所写的字是 | 欢 | 学 | 数 | 课 | B | 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iflM17pAwpB2UYXilPyuKco9QBkR9enHyxW4OwxaHc2f4/crGA205s1M4KQNna35MpMdez6RgTCntMMa9wzpFEHnuIOMfEI0fhxXjJNe6B5HtSDke5z15ZeEjsrICXe/DwHnmXlA0/fPIO+L31wIHHfY7kyd7ZvGw0TBz/3C+/UJ5rgtx2xqimMgdQjikyQOmSa+o0pqtckmtuB5ADyAHkAHLkAHIAOYAcQA4gB5ADyJEDyAHkAHIAOYAcQA4gB5ADyAHkAHIAOXIAOYAcQA4gB5AD6CQEyFFu6H+jA60yLX29MAAAAABJRU5ErkJggg=="] | math | multiple-choice |
272 | 某物体的三视图是如图所示的三个图形,那么该物体的形状是() | 圆柱体 | 圆锥体 | 立方体 | 长方体 | A | 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RB9Ymk+yOLdsRIZU+1StyOR5mVXnOMZz1rCsntovAUNxJe3MxhmumZGkxHZjz3yVUJl8/7wI7EV2mkzQP8S7COHU7jUSmkTlprhQH5ljwOFUY/CvQ6KKKKKKKKKKKK/9k="] | math | multiple-choice |
273 | 如图,数轴的单位长度为$$1$$,如果$$P$$,$$Q$$表示的数互为相反数,那么图中的$$4$$个点中,哪一个点表示的数的平方值最大($$ $$) | $$P$$ | $$R$$ | $$Q$$ | $$T$$ | D | ["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"] | math | multiple-choice |
274 | 如图两个椭圆重合的部分应是(\quad)角形. | 直角三角形 | 等腰三角形 | 等腰直角三角形 | null | C | 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gGjgLIRDNRzX3ZR1vYfx2LTZsGfF1AywtqVJTWBsTWi7TxorExgDpo4D/hYGKtTkCIKBlbLJBrAxBg9el/wAskvvs9VpkOpoAOilT2sfk7XlDj0zHh+IBMm62COlbwVVnrwgZQiIIcl+8cWawu7hOIg7EAkd/k+j7D6Yl+m230TgVflSoVfFWqVPBVqVJlAPkXAL6WpCdDjrMAAAAASUVORK5CYII="] | math | multiple-choice |
275 | 下面两个立体图形,它们的表面积相比较(\quad) | 甲比乙大 | 甲和乙相等 | 乙比甲大 | 无法确定 | B | ["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"] | math | multiple-choice |
276 | 比较如图中平行线间的两个图形的面积(\quad) | 它们的面积相等 | 梯形的面积大些 | 平行四边形的面积大些 | null | A | 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"] | math | multiple-choice |
277 | 如图所示,两个相同的平行四边形中的阴影部分面积相比,下面说法正确的是(\quad) | 甲$$>$$乙 | 甲$$<$$乙 | 甲$$=$$乙 | 无法比较 | C | 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"] | math | multiple-choice |
278 | 关于如图的说法,不正确的是(\quad) | 平行四边形的面积最大 | 三角形的面积最小 | 三个图形的面积一样大 | null | C | 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"] | math | multiple-choice |
279 | $$3.$$如图,$$O$$为直线$$AB$$上一点,$$\angle COB=28^{\circ}34′$$,则$$\angle 1=().$$ | $$151^{\circ}26′$$ | $$161^{\circ}26′$$ | $$151^{\circ}34′$$ | $$161^{\circ}34′$$ | A | 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CBSUh4nLmOiQ9vM2fMnhAIIBlQqiKTYOdnu2cmWNE50Emgq7GhDtN8GWmqYr3TkWFtbJ0p0sa2bdsUDMRvIXox9wjzL5bA4cOHp8zhcaBPXqHyVJ6QCiYPmX4CUDi4B2PQIyCfcybVqVMnldeIGgeCWFnDnnGQ4WFGxMh3eaGw34hifgMIZUPcprMglo+OEysWRg38Z3Qg/GaOv60QE3w2yryRF0ii2DhepuhRgA4SfQTpAhETHdY6ViQMm1wVZUBkoqqDJBNV/JpTIECBvBT3QH7/6RRIHAUcJIlrcq9wWAo4SMJSzPMnjgIOksQ1uVc4LAUcJGEp5vkTRwEHSeKa3CsclgIOkrAU8/yJo4CDJHFN7hUOS4H/AXRlZ5dtLR+XAAAAAElFTkSuQmCC"] | math | multiple-choice |
280 | 如图,测得$$BD=120m$$,$$DC=60m$$,$$EC=50m$$,则河宽$$AB$$为($$ $$) | $$120m$$ | $$100m$$ | $$75m$$ | $$25m$$ | B | 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FnLDT6JsZToav4xs17VmiUU0zxvpCs9hxXZrljS8jhfYhjBCtg1iHksqwIQMnsmk1TFg1YdQRZOqhHbaiWERoBmywUgEMBWCssEIUe2lLpGcwWja33vZmGFPDgicFLGgx++cH7IScl56FLfKt+cEyx8YI75iDz1KpJKJBWEMbxCyAA9OzHjQPrWAGARttHPcCxFChaADYgT1kwBdbQ6Bnt9CklIkMsMGvsU1hHi58x90VzuC+Zwe+Z2apf1RXo9IUaepITE2vVpAWEUrpK5jHrUmyN+wi3dnqBYQmEw33CmkSlflLn3tTQSiyq/cVWZY81CC0ecnSV6MWyqQYAAE6xL1lH89XM+LOzY62apNxKCoQe5egE/jfeeMOSqXm/Namcaxirxwz1mWeemZ/xZxLhfOC3336b799oyQ96ZOsF8bLPq4YOrCKD2psSSh6IJIZU0BAvOdVaQuXhCGK92yy9cc2Yo4LDPuCVA4GOOeaY2b333uuEV91jyg+SPmmpNqoBY0gZwFOt5Zlnnrlw5mMdF///dGmiqJjb49JdeUJMdgggryWEkHvuuWd+ckMNs6HALeFrmQiX4mE6poOYVCecck+VOzXLfTW8MRB1Mhmyba24KfWpbZvEpQAPnryHtYd5vhq+4mdlEePcZ6xPFwhpXB+VIbaxLCFChmlOzUqtE49hLPWumCK206lfHjACXtXIxTGMYhuvS2nhCeurihvtq/Yu/MeKVLFufFhnTWzWwoP1jmfVpAjCmFFNCgAh7oTAVu4VZlGcAt3W/R4WU9b9cF8LMzXiTxV9qiI5VHypSkYj2VNqZtFl3ddpsEqLACb6pXYvnIBBk1IlGARtnOLYEx0fYgHZ8iwWrbX3lazO5Y8XjgEp1eqJeECIOwmrlhnJKL01JSElaK2TPghux7QJ8zr/mvJ3nfEsFxgKM6cYTvnSV4q++OKL+fEcSoDrTGmemerwIUCEBxHtWhFBJoBU1c2klwCqx+rXAkfPx4lzVdOL79y3/FIhD/Sm5LxgCRlNVg2d5Y5rGNY2S7kjRjnnNHNhAQASqyZHHXXUwnftcv14RrrnGbUPIBD64YcfPsyeoVFuTgcTAYbwu3DWfugaGZWereHD02e8PZS6T8CjBL3iO/GtraTIR6FXLU0LIFTVDCcdxFdoCT0MlZ5RiRWKy8Ut4exL8ZM2bPP7VAF0jk7Apu+3QCODgiOOraIA5d+oUlZKplYx0NTyToteYuDJunmWX8P8rw5CrbXMyZhQqZkUEGFyjCWEQFwsZfMtQT+0EW8Cjv3797fIPPlOqHCEjyJYK+UwpPDCSqv83XLnYUqmJkZeFfiw3lolgV/v3vCS0JWOq9FtMVmtXWkLU+rG8n6Vg02xx1fJams9uVah3uNFSst9sZKULdD6eG251mQj7d+GmOhwfJ/WuGsXDjzyhD8GqheIxdmxavCoDQyv2BJaiWXcU3hguocRr+BVQzi2YEDWr+b8aywJ7tmbBonzg9auwKnkpBO3NJkgdps6B5rKpIRALPHiyhNq1GsEe92xFrUhRoryCNbzTAhS6NJOLy8gwveJTxkknslETJsscjiZs+gP41vcYS7sqYkL4z4ZlGHOkMHaYoHDdnN85f6ufUocrlW6XCCkAUa9JgUWCHUKgo4NsZTitXrWLFFgogzJA0biF84QJOxoUZDoiXf31fCDO9S+auJGrwuL+4Bflb3hamkz9amzGtrGPoveASLxe2mSU9zoFBOhSQEgZJRpMzTP4XLD2j+ramQMMMNZc0pQSvuoXhDaEAaK4v9sOWCAjNmwneqXDeJYfc+sMn4f+jThIh0Vnuog+pVs53d9Y08fVoQfJhc6S7wGQMvOMmiyYiarIQTgeFwSIKQKW0te/I7wJYQaNyJhKa2hyl3aVAzT6ko+++yzIcdFm1hxfRCS1R6PpYwVGdJI4ltV5YCZr4ViebBs1u4+CyAoKzzVQfQr2c7v+rAjblfl/7Xu0qKD+0xkGBwUHodJc1V4a/Jq1UwCRNcHFumUxLAFRG8Bg8UkhAMwPmmFYFltCXNwSojqgKPWAgWLjtJ90aiVCmSjZUC9p6S6YjD2sJxyyimz559/fmW5vpAHy8uU7oe79GRcAA88x/WbhA6pw6Vq5Z10x9aqiRUTeoiQywRg3uSm4lIrLePp33oGRSldk6Mxp0yUc+edd84OO+yw4SsEP//8s9Xdpt7nUHmMARacwebdpRcSre29eJtaL5NNVpeAOAaEmk3iur3gi5U9VVomB6IwXeOlMYUiTVhwo4AyN/mxLJcHobVtaJVErh7gtU6KQvqk39Kq0kLeOceglu9wkfHVAkKVzDNSpijLV1oGMI+Z2aZSG950TQkcYbuffvrp7Nhjj52fPBYDuxZAHlDmngndJ7KzliBb+iJGrflygZmi0Xc7QkHVghDGMfOtB6aXBCG3bsWxljA9yeqWWaTeoX2WAW+66aZBFsS3sjwpEE4JTOSf+sbdlH3E8rX2KYXPmyDkYVUay9d7JyYIWUlkVcZYYGgJsAWgcPNUTT/a+zIWyJ4+lfjnQ0GstujkBWt26bW6PEdbFPiGwPOWmU0JTPRCnGmFNC4QwlgYpFuWELCSMLbOoJmSYWjEtZBGYP9vzuWHfWqXHbPaMS69BiA8q49xqzIHsFBxAx2ty4/wS6xMLE8MOmV9o2dw5Z7RqkkJiAMIa8Cg8n7lBMNTVfXV7yliKg/jObq1WR06sOJKqivJG6Z8WuPTGpmleFEAr8oVrAYWGc/BINdRwPGpsPAAUEmMsxFfeVUsKny1frRnTEhgyUIl/jkgui3hBh/+r5C0OqIqX5KZJIFbDr70AK7lGe0yC89axkK0Jr9zNFhKyL2n2TPgiS8dih6ej61jOARQfWuuRTapd1r48L6jjVepfptBOBXjvZ3ZMCg8y31eha9apmPpcoFwIa/TWE+4auFsp/5Uxd0aHmwnXmNaXSBceKmDcCk6VxC/im2yS2GgsdEOwkbBLes10ivEgS2fbF0WTctut4Nw2RJubB9rSJxo5dgam99Sr1WBULFhWMakcqb+7455adfUsti5c+fS2p6CVkruxlxVIBzTUX+3TQJa/priTMY2Cuy3GCRjLjcIx07DxxDZ350NieiWryWtQnbWCppFgwuEHYCWGKe9b60EkYTfSjqxQGitxrhAOK2Ie2stEpAitdy3ikOavHRaILTaSYLw2muvXQiE9+3bZ7XV7zdKANmmJgjs40ldxIm7d+8ePtdRulZlLT0ghJaYT2jnkx5ZS7hr167hJS69fODAgUYx99csCSBjFKILWRPw7927N/uqd7nP6nvsfQ8IeQZMhRd/2wDC0tIcAuGFDsKx6lp8X3IHbLG3KQ1+vafTLTZzuc8CIeCLAYgk4JmfHSmTHY9KGghH6fSq6C1ed911C4Ncg98KhXT2y2Yt95VAWBpI3Bvup9Q/oPNfy6cfhLGq+GId4Yh8ZSlSHskCITLbzOW+Egg9Bmxe1Boyz4tyvQJkd8XLGR7IXW4p7qElDNIXlla53FcCIffiuHZhoKUYTwWQpQB5OepZn1YJdVKDnL+HukB5Ho9EAWnqQ0DLkmgtCGM6FtxxPCq9ccmyGFyHdlNKVCzFvx7gxXLScl/u6I0p5drqjmXYNoAQZkNXDKGKC6cket3aKoHo5ZdfXpj0DWmLf93Yhx9+OFpUfHZ32ct9nolJ6Ell2MTcHIS5hGnsmltG5WhJ/kcbQLapCplUOkMiiOXv0Yc2ftUez+EVu5WiEehk0BbCPQ8TXmL6c1tXAgCQOHEZy30WCC2MNa8dWw1vXXVsfcqWJVsd/5za3TemTwuElsTnIBxDhNVJv785Egh1Gv5/z549Q9X2VBv+SyD04CppCT0vbo5Ye69TSAD9Trm7bzJLOAVzvY2tLYHYuEy13NdBuLX1vuWpO3jw4PA5YE6m8BzKlPKSHYRbXs3bg0Ad0tSy3NdBuD10vC2o1HJfeJ6QZ37QQbgt1Lt9iGS5j1NWa5b7Ogi3j343hVKPJUsRBgj5CKa+PVJaqekg3BTVbq9OW4Go5T7rQPUOwu2Fh02jthWIud19YVlZB+GmqXV9OraW+zoI1wcLm84pu/s4Ezxe7usg3HTVrBcB7OqjGmf//v1zxjsI1wsDm84tsaCW+3RIUwfhpqtl/QgAiMSJ+iZLB+H6YWClHFuzapb7OK+SfKL1bI7w5qLWlUqid7alJUAax1P80EG4pdW49YlrtXIezrol9EipPzNKAhaAOwhHibe/PIUEOginkGJvY4ME2NIZnmWU2+qplzoIO4CWIoH4EIX4pLew0w7CpahgfRtV/BducNfpC7nzjDoI1xcvS+McqxcCzzrOpINwaapY34ZT51uWpNFBuL5YWRrnYTxYOlenT0yWpoL1bjg8dRZJeM617JZwvTEzGfeakKROneVe6czzDsLJ1NAbQgJxakZ/K1nEDsKOnUkkkDvfMjx8P9fR/wEH0ajKU2XbXAAAAABJRU5ErkJgguiPgeS8mOe9kQ=="] | math | multiple-choice |
281 | 如图,已知$$A(0,0),$$B(3,0),$$C(0,\sqrt{3}),在$$\DeltaABC$$内依次作等边三角形,使一边在$$x$$轴上,另一个顶点在$$BC$$边上,作出的等边三角形分别是第$$1$$个$$\DeltaA{{A}_{1}}{{B}_{1}}$$,第$$2$$个$$\Delta{{B}_{1}}{{A}_{2}}{{B}_{2}}$$,第$$3$$个$$\Delta{{B}_{2}}{{A}_{3}}{{B}_{3}}$$,$$……$$则第$$n$$个等边三角形的边长为(). | $$\dfrac{3}{{{2}^{n}}}$$ | $$\dfrac{\sqrt{3}}{{{2}^{n}}}$$ | $$\dfrac{3}{{{2}^{n+1}}}$$ | $$\dfrac{\sqrt{3}}{{{2}^{n+1}}}$$ | A | 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"] | math | multiple-choice |
282 | 如图,二次函数$$y=ax^{2}+bx+c(a\neq0)的图象与$$x$$轴交于$$A$$,$$B$$两点,与$$y$$轴交于点$$C$$,且$$OA=OC.$$则下列结论:$$①abc0$$;$$②\dfrac{b^{2}-4ac}{4a}0$$;$$③ac-b+1=0$$;$$④OA⋅OB=-\dfrac{c}{a}$$.其中正确结论的个数是($$ $$) | $$4$$ | $$3$$ | $$2$$ | $$1$$ | B | 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jPGySZfVC+uvcC1EUy3EigO0tinOSvmdiQjMT1gh4g9ATp3NnkkQwd4Gh8jZo4RYqVVcEASdYcEMl0ysQjGWZHlgldliVqBEnWHNCvjdTqx48fYkswHslwRfn48WOxll9IsuaBGZ0a3XVelQx9UpjesQiQEM3j+fPnDe9eq0qGahLPBi8CJJkdwlIozKERNRk1lwyJPhL+PDdbqJBk9ggSDePM2tvbxVo9XDIcEDzJLQ9XjjqQZGaJ8kG+h1QrbFLqEurSefPm8SuFomBDMhI3mqj7P0roBEc3UpEgybIFry7zcheSLiRZtqheXRYJEiJbkGSEdUgywjokmQZ5b9KZXBj7PwgsMbPqzFf+AAAAAElFTkSuQmCC6I+B5LyY572R"] | math | multiple-choice |
283 | 小东家与学校之间是一条笔直的公路,早饭后,小东步行前往学校,途中发现忘带画板,停下给妈妈打电话,妈妈接到电话后,带上画板马上赶往学校,同时小东沿原路返回,两人相遇后,小东立即赶往学校,妈妈沿原路返回$$16min$$到家,再过$$5min$$小东到达学校,小东始终以$$100m/min$$的速度步行,小东和妈妈的距离$$y($$单位:$$m)与小东打完电话后的步行时间$$t($$单位:$$min)之间的函数关系如图所示,下列四种说法:$$①$$打电话时,小东和妈妈的距离为$$1400$$米;$$②$$两人相遇后,妈妈回家速度为$$50m/min$$;$$③$$小东打完电话后,经过$$27min$$到达学校;$$④$$小东家离学校的距离为$$2900m$$.其中错误的个数是($$ $$) | $$0$$个 | $$1$$个 | $$2$$个 | $$3$$个 | A | 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"] | math | multiple-choice |
284 | 如图$$5$$,在平面直角坐标系中,点$$B$$的坐标是$$\left(-2,0ight),点$$A$$是$$y$$轴正方向上的一点,且$$\angle BAO=30^{\circ}$$,现将$$\triangleBAO$$顺时针旋转$$90^{\circ}$$至$$\triangleDCO$$,直线$$l$$是线段$$BC$$的垂直平分线,点$$P$$是$$l$$上一动点,则$$PA+PB$$的最小值为($$ $$) | $$2\sqrt{6}$$ | $$4$$ | $$2\sqrt{3}+1$$ | $$2\sqrt{3}+2$$ | A | ["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"] | math | multiple-choice |
285 | 如图,正方形$$ABCD$$中,$$AB=6$$,点$$E$$在边$$CD$$上,且$$CE=2DE$$,将$$\triangleADE$$沿$$AE$$对折至$$\triangleAFE$$,延长$$EF$$交边$$BC$$于点$$G$$,连接$$AG$$、$$CF$$,下列结论:$$①\triangleABG$$≌$$\triangleAFG$$;$$②BG=GC$$;$$③\angle EAG=45^{\circ}$$;$$④AG \parallel CF$$;$$⑤S_{\triangleECG}$$:$$S_{\triangleAEG}=2$$:$$5$$,其中正确结论的个数是($$ $$) | $$2$$ | $$3$$ | $$4$$ | $$5$$ | D | 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"] | math | multiple-choice |
286 | 如图,平行四边形$$ABCD$$中,$$AB=8cm$$,$$AD=12cm$$,点$$P$$在$$AD$$边上以每秒$$1cm$$的速度从点$$A$$向点$$D$$运动,点$$Q$$在$$BC$$边上,以每秒$$4cm$$的速度从点$$C$$出发,在$$CB$$间往返运动,两个点同时出发,当点$$P$$到达点$$D$$时停止($$同时点$$Q$$也停止$$),在运动以后,以$$P$$、$$D$$、$$Q$$、$$B$$四点组成平行四边形的次数有($$ $$) | $$4$$次 | $$3$$次 | $$2$$次 | $$1$$次 | B | ["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"] | math | multiple-choice |
287 | 如图,圆内接四边形$$ABCD$$的边$$AB$$过圆心$$O$$,过点$$C$$的切线与边$$AD$$所在直线垂直相交于点$$M$$,若$$\angle ABC=55^{\circ}$$,则$$\angle ACD=$$ | $$20^{\circ}$$ | $$35^{\circ}$$ | $$40^{\circ}$$ | $$55^{\circ}$$ | A | 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"] | math | multiple-choice |
288 | 如图,以直角三角形$$a$$、$$b$$、$$c$$为边,向外作等边三角形,半圆,等腰直角三角形和正方形,四种情况的面积关系满足$${{S}_{1}}+{{S}_{2}}={{S}_{3}}$$图形个数有 | $$1$$ | $$2$$ | $$3$$ | $$4$$ | D | 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"] | math | multiple-choice |
289 | 数轴上表示$$1$$,$$\sqrt{2}$$的对应点分别为$$A$$,$$B$$,点$$B$$关于点$$A$$的对称点为$$C$$,则点$$C$$所表示的数是($$ $$) | $$\sqrt{2}-1$$ | $$1-\sqrt{2}$$ | $$2-\sqrt{2}$$ | $$\sqrt{2}-2$$ | C | ["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"] | math | multiple-choice |
290 | 下图给出$$4$$个幂函数的图象,则图象与函数的大致对应是($$ $$) | $$①y=x\;^{\frac{1}{3}}$$,$$②y=x\;^{\frac{1}{2}}$$,$$③y=x^{2}$$,$$④y=x^{-1}$$ | $$①y=x^{2}$$,$$②y=x^{3}$$,$$③y=x\;^{\frac{1}{2}}$$,$$④y=x^{-1}$$ | $$①y=x\;^{\frac{1}{3}}$$,$$②y=x^{2}$$,$$③y=x\;^{\frac{1}{2}}$$,$$④y=x^{-1}$$ | $$①y=x^{3}$$,$$②y=x^{2}$$,$$③y=x\;^{\frac{1}{2}}$$,$$④y=x^{-1}$$ | D | 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"] | math | multiple-choice |
291 | 已知函数$$f\left(xight)=\dfrac{d}{a{x}^{2}+bx+e}\left(a,b,c,d∈Right)的图象如图所示,则下列说法与图象符合的是() | $$a0,b0,c0,d0$$ | $$a0,b0,c0,d0$$ | $$a0,b0,c0,d0$$ | $$a0,b0,c0,d0$$ | B | 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"] | math | multiple-choice |
292 | 已知函数$$f(x)=A\sin(ωx+φ)(A0,ω0,0φπ),其部分图象如图所示,且直线$$y=A$$与曲线$$y=f(x)(-\dfrac{\pi}{24}\leqslantx\leqslant\dfrac{11\pi}{24}$$$$)所围成的封闭图形的面积为$$π$$,则$$f(\dfrac{\pi}{8})+f(\dfrac{2\pi}{8})+...+f(\dfrac{2018\pi}{8})的值为($$ $$) | $$-1-\sqrt{3}.$$ | $$-1+\sqrt{3}$$ | $$-\sqrt{3}$$ | $$1$$ | A | 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| math | multiple-choice |
293 | 已知$$\triangleABC$$为等边三角形,$$AB=2$$,设点$$P$$,$$Q$$满足$$\overrightarrow{AP}=λ\overrightarrow{AB}$$,$$\overrightarrow{AQ}=(1-λ)\overrightarrow{AC}$$,$$λ∈R$$,若$$\overrightarrow{BQ}\overrightarrow{CP}=-\dfrac{3}{2}$$,则$$λ=($$ $$) | $$\dfrac{1}{2}$$ | $$\dfrac{1\sqrt{2}}{2}$$ | $$\dfrac{1\sqrt{10}}{2}$$ | $$\dfrac{-32\sqrt{2}}{2}$$ | A | ["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"] | math | multiple-choice |
294 | 多面体的三视图如图所示,则该多面体的外接球的表面积为() | $$\dfrac{\sqrt{34}}{16}π$$ | $$\dfrac{17\sqrt{34}}{32}π$$ | $$\dfrac{17}{8}π$$ | $$\dfrac{289}{4}π$$ | D | 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"] | math | multiple-choice |
295 | 在$$三角形ABC$$中,有正弦定理:$$\dfrac{a}{\sinA}=\dfrac{b}{\sinB}=\dfrac{c}{\sinC}$$定值,这个定值就是$$三角形ABC$$的外接圆的直径$$.$$如图所示,$$\triangleDEF$$中,已知$$DE=DF$$,点$$M$$在直线$$EF$$上从左到右运动($$点$$M$$不与$$E$$、$$F$$重合$$),对于$$M$$的每一个位置,记$$\triangleDEM$$的外接圆面积与$$\triangleDMF$$的外接圆面积的比值为$$λ$$,那么($$$$) | $$λ$$先变小再变大 | 仅当$$M$$为线段$$EF$$的中点时,$$λ$$取得最大值 | $$λ$$先变大再变小 | $$λ$$是一个定值 | D | 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"] | math | multiple-choice |
296 | 如图所示,$$\triangleABC$$是顶角为$$120^{\circ}$$的等腰三角形,且$$AB=1$$,则$$\overrightarrow{AB}\cdot\overrightarrow{BC}=($$ $$) | $$-\dfrac{\sqrt{3}}{2}$$ | $$\dfrac{\sqrt{3}}{2}$$ | $$-\dfrac{3}{2}$$ | $$\dfrac{3}{2}$$ | C | 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j4+IhDlgyNUwYGCDFOnVM4Q+OUQ/J4hO1ZgrJ6jbXtPg7JhazN9EBxp14OQYtaZdHTJv9xeJf816Gk/g93HjYDWXpxM0idAmFhF47aHIG4MBk+fLhYXBoaFxO9e/cWozxHRGa+GzNu2XJhY8woWt7KbW1txTEirHliaHwPPEaDHpsHGUd4iXmRFHEQdctboXabT3G1kJ7kB4o7xMcV5UpUxJrD/5a8zUm9gmFdGqHUc6/B82hujABHUXpHKFZurfI2TTcPFyZdu3a9z5iaxDkiXUYsdGnM2Ec/KLPj6QEwZjJORcXkZML+iw76NVxFuAcUXHL5eswFRP0TpzzLzwPF7WLXV//Ly6P/qAlY7bYOjjMdMHbUEPQeOALe/mHKq3LPK6eLiW5A3p51Op2s8yd5Yq5FBqBL07qo2/w9BOjyx//n3M5CVFgwPD18cTHOeDhtweLOSkCPZv9BrabvYtHSP+G2yhXdrd9E7Tessd1fG8XLJUVPcowO9mMHo2uP3vjVZWXuGsd7FzZt3gxPnwNISi94EC1Q3PFnfFCtTHEMdliptADZqTHo1eZFVKjWGD6nLiutEsmzJ+Z8GAIDgxAcfALHg0/i8rWH+9ELFLeXix2KFa8IV6+TSksuax2HC1/2IPulSotEYp4UIO502PVtj4ovtURwTP5AlvXOuSUZBhZyS1QiMRVGxZ1+9Qza16mEtp9NQEY+L1kGvun2pl7cZbBqv05pk0jME6PiPuqxEKX0o7PtH/nPV9/hOg3F9e0fDnVAmnSGSMycfOJOT45H0GFv9GhRT7gAZy33FFFbh/f74Idvh6BNu9aY4OSCJHUfgiVRCfnEnZoYi4N+PvDY5gGf3X7ikE5up/vu3oUtHl64nJCmvFIiMX8KWFBKJJaPFLdEtUhxS1QK8H+N7ATv6VXR9AAAAABJRU5ErkJgguiPgeS8mOe9kQ=="] | math | multiple-choice |
297 | 函数$$f(x){=}\sin(\omegax{+}\varphi)(x{∈}R)(\omega0{,|}\varphi{|}\dfrac{\pi}{2})的部分图象如图所示,如果$$x_{1}{,}x_{2}{∈}(\dfrac{\pi}{6}{,}\dfrac{2\pi}{3}),且$$f(x_{1}){=}f(x_{2}),则$$f(x_{1}{+}x_{2}){=}($$ $$) | $${-}\dfrac{\sqrt{3}}{2}$$ | $${-}\dfrac{1}{2}$$ | $$\dfrac{1}{2}$$ | $$\dfrac{\sqrt{3}}{2}$$ | A | 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ayIAjuUNSZINi5PGYdgTUgGOjmz5/v+tOYvUCLIsO+qNNZvWpfACkob4QPaKMh45UBiXvAB7hoYGFY2YQJE5wWxYyF0KyWpmjiCNyUTw5ED7zymf6oU2XCbcCj3sbwLZrx0VAPPPCA6/wGNAi5Cbf5KygivxvGeNo0JvwYuAryb3EBOA7ABfCvuOIK10gzYsQI15Fv7wx8hGn5KSj84F3540CFBx6CacAwIUXQ0WrMD9y4cWMe6BBoE37zEy1wAApEPx4d4kaEFw0Z+DhzoJHT09Od+Yv5SgHBPEFaVkmnPy/RhB+4KV8ciL6OV77SXazUGLAQWvrpGJFC5zgz40sqyAY8Bkd37NgxL33RAi/PQ+4FAEP7du7c2aXt9ttvl6ZNm7pB2X6Q5vcX3McGB6IrjmMjL79LpWktXlB3AngIMy2P7733nnTv3l1OPfVU9xw3pm38/nheGJk/3GGm+qcu8S5a8gPKAAugjzvuOAF4DFtjbiPPyAfptCPaOAJ35YMDFRp4fkG2FkNmBzAtB8CdeeaZrl7HOwNPUUHHZ8QPoIZWr14tDIA2sud2X9jZD1TTegCN6Udo03HjxrkB29RRDXSWz8LCDt6XHw5UWOCZUMJqtAOCypoto7WPjetrrrlGateu7ep6NiKlOKAjfPwRB6TLXMiTTz7prvkpKvDMo6UfzWeaWpescHVQRtYw/ci0oqWbc0CxwYEKCTy/IJoGoTGFeh1Dwp5//nm31AMCbc30pvGK89nwawCjTxBz0Mie2320Z0u3gQutx4Tcc8891zW8MLSMfBowLc/Rhh+4O7AcqJDAM5YijBxoNNZHYXTKjTfe6MZCItgmrCbk5q8kZ4BAfGVBmMRnnXWWm72uCy+5tV6Ix/JCfgKKDQ5UKOAZ0BBEhBTiGYBj5D/L9+mqZO4ZmgiQmNCW1ufC5PQvklSScC1tnI3Q0P3793dD22666SY3lYh8mKmLuwCAxq3ye65QwENATVgRPswzTEwGLDNbgKFXDBEz88/c+gW7OJ+KuBB+iAWQ/OutlDRs/NtBfujfYw1RJuhCLKxE3ZX4rbDBfQA+x55y+1NhgIeg2YEAYu6hef7973+7lsa+ffu6RW155td0JQUGX5YwAAVEFwWDrY0MkHZfnLOBiHgID/BRkDBRl26RL774Yq+OddyXRr6Kk9bAT3QcqBDAM0Ez4HFGq02bNs0tt/fXv/7V9YXxjBZNhNKO6NhUsCvCMuCx+hiDrY3sud0X52wgIl8WHgULneusok2DEeY0eYP8fChOfIGfsudAhQCen01Wd2Pw8/jx490sctZBQVPwzoTY7yfWrgGf5YPpQyybyMJJEKALqPxzoEIADyFE4DgDLgSTxYN0KXa3ghczDjA/eW9uS1NACcvqV3Qn6FLzeV/enuc9KMGFpd3OhM3K1rr0fd7K1mbaWiFTmvksQdIDr/k4EPPAQ7D8B+YWXQczZ850y6azoJABDqHErd3n40WxbwnTAEYH+hNPPJEXFgAoTfKnnfxQZ8W0ZXyojT+1fBr4SjP+IKzS4UDMAs/AhiCagCFwTPX5z3/+47oOWEqBhgg/2HBf2mRpIFwWv2WFMiPiLm3y54c8s2Q9k2dZs/OZZ55xo1qoA1phQPxlkY7SzleshWc85WxHtLyOWeBZyW8Z5p55daxVSYMDE0kRPOvM5r0xqiw/MPH5B0mXRVyWF/JDvx6FC8vJ665IrnuBxhbr1zONa37KIj0Ha5jwFOJs134ZM9ncF39iFniWGQSLUp85a7Ri0qhy4oknunUw/SW+uS/rM+kxoS/ruAjf/9EpcBiDSt8eOzNRCPwv0/K/yG95jQOQIW9W0BWWzpgEnpUkllmAR6MGs8hZYr1Hjx5OIK31D+HErZVKhTGlqO8JmzRAdCewH4KRPbf70jr7AUc+ARhjOZm1vmHDBte3Z1uRGb/KKv+lladYCwe+QtSz4TUFnX0LBm4AQuO5ubU8xhzwyACZ4UwJQ2PK8uXLXUc5u8Oed955TgAxv2AC7syPZbq0z6THTFo60G+++ea8KMoKeBaB5Y00cLCY7vXXXy/fffeda2RipA5uIOOF+Q3OJeOAaTe2YXv77bflqaeekilTpjjzH74jf1hifqvDvkViWZpjhG3qlwjt3s4lybYJERlj9Ab7z1G/o37FM4SQeP5XZPExooTDH7f/uqzSAz/4wMTFPEPdJdf1Y+oOtW7RJISEd2VdEJRV/spjuAYotN3nn3/uppxhbbGb1JFHHum2GbeNTPk+fg2YCCrLivy76CCYds+5tARgki63zkK0CBuZPdAEcwE+eTwQZJqXdV9YU4aOdc40wpQWzw9EvspjnIYdWpXpK+abI48ctgEp07gAHxrQz/8yNTUtYSaEtlOrPwElZSh9V6zsxVZX5YFo3Hn99dcPeFLYk4Fl4FlOXvdiP+DpqcgJYBtvZN1v2WDqMwWN1cDp12V9HwjNB8XpbjgelfGyICJB0/HxGUHfVBfroeS158WLU1fYysmW3aFI6yHhQq1atZbMkM40L8JmmcWLf9++LE/wktXAbKtle75vX8V4Gg6pSam71YZpyta6ZXKSJLCuqS8o4kTzsY8D/GGraOq/NAJQ96Xgw83BSsgk+QcotoMv+yBanc3eR8sfTM4tW7a4745fDguLMOrWres04h//+Ec3gP6QKjpnk4G2fKCyIBKEANCpjQAwXYaWNzJs2jDaeBGTeF3BOltSJLlqTWlcO1XiEhKlVs1aKkxZsnnDOsnYuk42Z2ipEm2gZeAO7c4B+EqddAtsqVxPatQ8RGqkaAEU3iWbVm+Q7bs1xyzl7XIegSC8x8IAZGwBTXrat2+ftwd9Uflf6nk5gAFaXQsTcLQuBYKMMsEYcxCKtrAkHPhLHQ8NZziCtxwUchCFMYUfo6giA9l1oxqNpMzllJEcxx9/vKv8UxqUnDbI3AXbJCVrl4STdZoMW4OlVpcmLdOlaskDL+ch7JLslQvl+y2q6VIby9Gt92wJtr+EswfDRx9/Irdoa2uLFofvz9lB+fzqq6929bE///nPJco/U7SoT2NVGLG9G5Ove2iDCwM66GqCQplbJJGSsfjYUxDpUu5J+c07LZlDOZ5LBKU/w6iIY+nSpW5YE30cVrpYIgs8UzbozrOZ8dpBuf5r+WrYPdLrsZm5XiIlfVrTY+XK56fKkO4i1eKJP1HTVWCoMfMyb8PPrO2y7K3r5KEn3pBX5lE9byEXvTJW7ux7hLSKD0koPln3pSffkcLNSuQ+ffrIG6+9KsP/OUz+dsedzvTB6uCblE5BGDOsdIU/WgcL4OGHH3ZyyPKJaCd4ggaDJ6aNTE1wb9eWW7Po1q5dK5s2bcoDHdtxY8Ky6SjAppUbsvC5LmarpibB06Zr6hn5QUeobF6pSU9QIUCNm1nDmXsSwDkqUuFgs5RsL0kqZ70jz3+6TT5eMVDmPtJUPjrleln/8hw5+rAqcsyVvaVx1XipkqRpiiPeqEIv/47CChAFFFukydwH5f2cM6XZv4bKmrqLZenIG6Tn82OkYa3r5dEz64uXpTMwfN8DITIa+dw/5aqrB6uw/UOefvope+zOBwv4KGiQQfiycOFCN8iAQRcdOnRwMhkxA1V8imCVIcccVqdr3ry5WwOVhi1WCgCERsRtSi4x2kj47pYeL2unZCVXlhS+67dD5JQ/jZXVv4VEaxQSqttBGl73hHx0waFSKQ0QRCqbdiY+OyxBBZ5zgYc8xa9tKqd03yq7mlWR7z5MlRtS5spLJ3eRhCZHSbu6yRqMJlInAwBUdV4xCPBYfloOkD7Nm0pq/epSn79brpU+T0+S3XN+lBVnNpD0RK1TLHxY+tz6maxYtlFqVNMGlnjdpXfzNjnr8WlS74QBsmPmqzJ+wkdy9lk9nbAgCAhiRdV+JugIA1oNS4sFjf/+9787bcSABwOEHwv+6/0JkhVsnKlKHdOxvTaqtZJ2R3eQmjVyqwA5IdmVqQ1aiclav9N5lLmBRacX9OPot9ePo4cGJAq6hJWfynsvj5b/LkyStHad5URFc4pkyC/L58rEW26UodWfkAu7a2eydmdlh9X//lJf4POItqO0j0fDpnaQVlXfldD2aXK7DJITx1wrlfsfK6lHKOgydkhWShVJ1IjQtp4HwAsMPDZe6s5MTtuRmTod1LhUysqU3XFZklS7kzRrvV4aVNOSNW6DrFk0XV57cYfUW/O9bD+yvSz5ubI0+GmeNDynh9Srki3d+58jk3cv0H694dK1y3Gupc2qGtEIWmwwbE8qrTAxbQRAaOT76KOPXGFz8cUXu2Ue4QHg8/NARd2RiRD3dp37yoWBn2rVqmnXzVnaclzXXqkCyJCsbNWuatZWqhzZ6ckBKFcoowBeRPi1CU0D1VncCVqP2DZXPnzuTrn1aV1k59qxMvXJLlLLolwxQh7udq3cN7qfHNakt1zUKkVNUg3D3hfpDHi0x189h8PamFB/l/z83+9l0sQf5MTBtWTCyD7Sce16adhqraxPrCN11S0EzCsE6FxmIrwDfB6Fj5rpOQmpkgwgVywW7+qTpEXndlIvY6ks3vSLTG7YV246v7a0HdBGPl/bWLJnbJfLruvs+MJPzmm9ZMbcBW5JDBoUaNmzukokuopT7wMUfvDRlcUoJ1b6ZjkQzED4iTtzCw/cPRc+yg86Xjk/2rJJ6zHHrqVfyqTZGySrbgtp3629pGOEbZgmn321QTLrHyVdujSVWg5HIKkwQnO4jx7ReomyWxa9eJncO26zJN/2icwDdNqvlrVzu+tHC1c5Vnre0lV2z58p85b87EJP1H3Riwc8FTbFOyAKa+PBzo3j5NVPQ/J5qI8MbPWBzE+oIYve+FE2zPtRfqQlRZlAqVK8uApjxIF5T174wFCc1l3j4pIlJSFbwqtXyYw3t8oJ5x0trdpr3rc3kCNaniqjbl4io3d0kRUvfChttk6QGZ06S06WNhxoXTEzlCPHHdPRdezSyc+wMkAHmVbwC6B7EaM/ZmIa8NBoS5YscSt9s42abXNN9vympvE6mmy7OLTRj3N496+yfeqT8sD/O1/Ou/ppGTY5Q7J3LZVl7z4ggy8aLDcNnyxL1F1EgUUDPFKggYe1hBVPm0p/eEpufvI3Wd38Gnn4jra6J7oGlqD7umlHbpJWMuO1ed/bpTbtgmWyZssOl/5EIiwWRYCnEasJ+Z283HukzJydJgMf+6PUnfe9rH2+v9y8IkNmVOkmXbRyZwbtvkqnYkVf3jzl7Jbdai7Jlq9l7ddD5fpQN6nr1RIdGSo5dSppI4xaJK8+K1U7NZVvth8p25bvkp5d9PMkaQOXWgGuq0/zxNA6ZjGwGjVTqRA8A2B5y3JJ0gMg7CCcu+66yw0iHzJkiAsWkBUFaM5T/h+tQ1PYa+ey1Oj3krw/Z5jcfvZRsvzJR2Ty61fLoI23yCNffSvT/nm+tNWWfm39ciEUrvHidNtlHWucoIkMh1bL9BeGy4cpneT4fpfImdpgk62lKKYg4NCVHSX7162yYuUiyax7iNSqXsVFEs4tsd1NkX6UMdqqEufqa83k9Pv/IUOGDZA/VFVzt9Gl8sC4sfLasEFyVvMUScENkgUzixRH+XbsBIMPq/kKJaZKpfhZMnHyLLlm81Xy9j0dpWPdKfL19HWycL0WO6HpcuszzaV72x8l7owTZfWPh8tJU8fKl5rF39R/kpriWarhGMQwaNAgN4yJcYUVafqQAQ2+YUZCjJ1l9gBnWhuZwUFBg1vc2dk5LsIPfiMHnnQ0SqUaUrvxVXJeo28l/MMbMirrRrnt/JOlz7F1pU71NKmSK5+4LryOp+ZbjqI0SbVd5qpJ8sbYn6Vul7/IWac21E7ALO07AvGagDAtYzoNYtdm2b7uN6l9wvHSpmF94lA3Wh9xV0X9IWOYjurbqyktTu8WCUCHTHk1W8hRPfVwT7Rw0IxbKUI5ULz4ipq+snfvaakX56wNT3bPfUlG/usf8uDbG9R/I+EAABDKSURBVGVt2hwZsaiSbNi0Uaqdd63WdT+WCU+Ok/U9H5GTG/4gY4Y/JQ+8UlnWtblKTletl6gf3RqcEDSbPvTCCy8Im6AMHjzYCaq1cJIzhCrWyNJsAKSpn35kNpKhE5tWTDq5i9N1sC9eEI8ySuVf5TSkGMlJk7atKssJp1WVCVV6yzmHq6/s3bIjlCCV08CK01J5srqvMCPP1KHHR4vTLoR1P8n8dbWk8+Gt5MgGKuzaoe1ArGIf8tTMjM+UrT9/J5/MTZN2J3aWNo0qR8JQR8X5hBHmATqmVIQkS5d2yMzYLSF9FA7tlsydO2Wn3mdlaxppdNADP8TlGLL/XMXQm8iHJcEJmxfJgjW1pElTXbuzwWwZM36SfDHncGnZppocVm27bNrZXm67s53UrdRWDs/cKId1qSIbO54sR6lgVIKHCuAkTFUlmtb/8Ic/OLOTVj5meFjLHvU9BDjC/4igOE/l/MfSyxmNRmMKg5MZFsag8dNOO8215JI3ChjLY3Gz5WQM0CmLPKpjatCnpmVpo01Dyck+VLZkrJANv2m7Q2KKPouAzgoGvYuC4D2tHNqaluA1lkNqVJJqWpeLy9aPo9+RkjQhVTWeVuanvzlBXt92ptzbuYk0q4NHfQdwo4gmvxNLpAsjQVs103KbZXGo9ZKEpMjYuvz+uN/jd19vY+dZnNUh9AOnnf6IPHv6ftLepot0n63v9DuFvbbSe8RU6e2cYg1Q8OmAaq1euO+ggokmQDhZp4UNL6n3sN0zI41MgI2H3Nv1fmI/4I8tjdZIRIIoXCZMmOBaMl977TVJT093jUg2UB83JcmX+VXx1zEjqnjg767vZMmixTJpWpKsqrxcJLWRNmyFdSsBbf1U8DmwarxmnZGG/RMqhOq5l6Ef8QdZs/432ZShA5Y9NTW1jrd7t5ak2oc378Xn5YUXf5GODzwmf2pfXepqCygUXSTOafBTUg5QAu8Vxt5mvv8dQsrQJlr4ML9YD5SZJAiUX4D3Ci4GbhBuCpZPPvnETVBl2BYjSiDT5qWaDZCXSwsf+0BWHdFEej50npz78seyMPEXmbp8jfyyYItzoUlzVLjGY/hXjs7oTqwmac37y6CzHpVrPntf3u97tnTvWk0BB30vY68YJNe99KukDBomE65qJg214SVTwZmqZ+ppe5LmPET1Q2UYW5zKP2YRo7wprSjJ/GTPGJXAQraYFebX7y7Wrq105Jyl41sZs+n9rk9UgeZMeTW31ShRG0rNf0xzdUvdW9/FK5AghBFzEgJcXGOe69Qwx2M2d2natKlbsQz+YY6ZW3dRzn+ssODMxp2Y0PDukksucXJEXs3ELI2shLWNQ+dlSdyvP8icUTfKFSNXSfLRt8mjf+kpF60YJ0u2P6J1vC/ljLuelXvPa62dqFlq7kcQUzjwtF7gWjTDOvi23jFy7t33yGc3viIfXNlLtnVroLpVtdqu1bJ+Y2Ppdkc/6XP1BdK2mpo3Oo4zO7ckQACKQ/bhERCbvmTC4g/PniFYNvjazAC/u1i7tjxwxgQsTUIg4RsAYyInM/hZmezpp5+WW2+9VY466ii30xIFnxUAlp7STEdphEX6SBuAI0/IDeufMEcOU5pWXHPDO7sucdy5BVpcUhWpln6MdO3WRA67sKe0qdJQ6uqoonOfu13i51SWTm3rS4Oa+v108gCFIG2t2jeuqS6IeO0yReY44mX1GzfJ0OETZfwmDcLV/Y6SgS+8JH/rVlnNSm0AydaRFVrSZmVlOoFhtACLEDE7IT093X1QA0hBURf/HVkqHtiLH2fp+6SERpCY54UmhxCwwj7Z/lLC2puYXBauhWMCiyXBd2rbtq1bsInJs7jhKFWB3V8Ci/jc0g9PqK9S8ELsnvTQQw+5rcyYIUDhglVkVNoFyO+kTQGWo3XziG2RGyt9booJatmhzK16ioL0wzhXnMPZ2fvxEfZ0hIQX0vFhRmoiukudD6Z9u/Gergbm7rU+YU4KPPvjVaHwlIG/O/bEp/GHsjy/nwIDj4GXukCvS+WCBQs8FSp3qObLu7ZnBZ1V4PLca9eBC8/4b7xSIDq+cdYOdU/33vN0yoynwuzcu+/ul4Hc6wPJQks7aeBap5q587Jly7xu3bp5I0eOdM/Ig+WvtNPr+BJJgOIiIp+hbOWlS1OOl63ymKWYyFZMOFRoOmFdVsZm7QOIinzag6abfZLWJbTZLH/Vfp9Oi/GQkn8vUk2rcuJaTCPPiV+zQ/GjpIVgzJNZBSwjQV9USYnBvJD1YVl4pgE4Y9Jjck6fPt1t/6VCbM6cts27KUcXaHC03erVq916Nyzs26NHD5dPtDjvypwUF4l7tSKqPNLSuZ+Io0qR68Smou6kmUo8TdZ7h4gJ6ir5zjSJSL190L1dRn9n/g1ENNHQMRGm305BTkZ/fe8m+ctdH8rs9EHytxfukHMPFZ0loSNotDOfmQqxTJZ/BAezr7TIwuWshbP7rlp6u+B5xqh9WjmZUc0MahqrMOUg3vv9uYf/4x9LM2fIgMcoHBZ2orO8WbNmLs2YyKQXMn/uphR+LFyN4PcVm9w494rG525/gNzLPfWlPeHotaIbDeQ/4tV+ddkjcL3Y4z5fUMW5pXEG4GsnpRo/qtm0wSdjnrx912Uy6IlZsvjQ46Xz0U2kXpIKUS7wI6wuTmTlx48JFqBg1v6+jqzdGaKNx/lIBxtkqnut29Aaav4QUMjC5doPIq7REEzgZNvqFi1ayH333Sfr1693WgPw+d3j/0CQpYF8kF4sAzaqYVgYXQesLWMWEmfcceCvQALHplD813iy5wUGEP3LqDRe9MGVkUtt1IE8XVvFi0+SnIzFsvK/d8pDzy2SpMFj5KUHO0uriIsIg2iJdfex/WOCQqltZqflyMDDpN/kXStk5YLZMn2ZIjCpoRx/WmdpXC1JhzExex3zf2+ycO2p/55GCIDatGlTue2221yr4IgRI9yZ1bIAnwkz/v1+LbyyPBuAOMMXzOY5c+a4/SJoFGKHKAoq3ls6o06jn1H+a5fR0s1VlBqvdCMtcmjKROWkfnSGPOlSavM/k1H3T5C4656SIVc0lzobNsvaHa6R1qlaE8oixxMrHpQXViB7OuFy1+x/Kz+ulAEDLpJL+14v90xYKouyFIRqITAXMhqCZ8Y3wIfwYt7SLM+ef+w5yG5MJsS45dr8RBNHSdxY+ojTzGLCY/l0FhqiXscyDqaV/SZm1PEaU/Hgv7b7qAMq3GFsAM/lQ+t2rva6UNYt2iqTF10gLVddKn87p4E06XC9XP7uurzcRitseR5i7mIPmOK3/kde/KG+yEULZNmKGbLqtY7ywWdT5J2vdXlBrAOmohSBEGw/oNLT0+X+++93DS4MLUOLmEYpQrCl6hTzkjTSSc5CxvQ5XnXVVS4Of9pLNdJSDiw2gOfqeFoi6xQhb9sWHQz8nUzrnqbm0NPy2OMj5Jojv5NVNwyW4fM82aElcbxOZdIJDBWXwJIKHkfc1nQ5qksPufTiBtKoQSepufNtaVevptStV0nf6wgf3CkVBj8/4LhGY5hmoWWT6TRsbf3WW2858OHGAGDayEVUBj+mXYmTPjnMbkA3atQop/H69u3rTGPSY5oOt+avDJJU4iBjo45HNhVQuvCKNmPqUtgJntS+7Dw5vX0vOamjyIkps6XBPybKlBUi/VqKVNEp97mNcCVmULkMQIWKRiQoVPM4OaH2dzJz7DMy5JXvZdE3DeSKT7pL/9Y62DmUIYlJrD+g+HO/hf/kF1gDH6sgc/3+++9L7dq13Q60CDnCbp3TZSHoFiZnGoeo0zF0kIYUZlSwMxIaj3cGOnJp/grPsc+Fn0n+a5zkv/d5K85lbGg8GlcQthw9KleVKinNpO3URtJcQQelpLaW5t0Ol0NraEmdyyF1XnEJXmjuOMI6FCk+6zdZ/8M8mbVomfya3U6+XbxcVmzU8bW6To31+0RgGh1L/OBDmBFq9qdgAw5Gv7Dx5eTJk/NAx3sTdM4cpUEWppm2dKvs1KlgY8eOdX2MvXv3dvPreI5ba0wxf0VOA8m2pPuvCcieFznQfXuIEeCpiKkAxGfpR9UxcDUbNJe2o4fKm1/OlzXr1srkzxfJ1Bk15OjmnqQl8+FVMGMjZ/v+KoU8RbBozeRI0etwrVPl3Hs/koWLZsr0J9fLuLuel+GfrJDsFDVodPYIVFS5MfARFxoNzYamo7m+ZcuWMmbMGJk6daprzACcLg51iz+/X/eiCD/E5w/L7k27jh8/3u0xf+qpp8rZZ5/ttDDANPBZ/EWIco9TK8144r+2+z0uS3wVQ+Kp88mSdIVoqS7pXU6Tu5/dKUP7d5UmjRrLlV+FpNZ9z8jF9cLC1NuwThKsCN0JUX1dZizQv6nVOVHeVD//SXm4gW7isnuZLNUn2hQSVTCFOUKwEXBW5mK2OsuRs2DSJO20Rth5x1HaZPVIwmW8KtrujDPOkAsvvNDFR9wG/NKOuyzDi406Ho0rSnF02ut1QqV0qTPwfnm5wQDZqgsrHdKsg7Q7pqqOWKEJXd25Urcs2XZgwyZ/irZIItxQJStmVAiTV8r0Oq2kUxUdKa8uQqr6GR4c4WDR0u3iUS9oHa45cwA+RreMGzfOLRPIqszsxwcx4oV6mIHB/LqXhfyYW4uH6WDMnKAbg01H2QKNeJlJTgMLJm7kW5fvhpR9ZTs2gGcd6FqD03EIOmRNW9xS28rpvdr68qRL2Oky7wwA14kfKiCYPL7XFejSrcOigAN6WXNHyQvvTJfZa3RKjLbmeql1JPGci6Xrsc2lqjbthrSwgkrCCgMdYEKrIfB0pvfr188J/tdffy333HOP62RnnwCAQ+sjda7CAIhblz79WMRDPxzPMG8B3cyZM91qaNTt2AOCeibuCN/GnOKeZ7FEsQG8XLFxw8HcB9Iug5yQrhMZMW3cELbEJB27GfmIFRl0EeHK1XZ6k7N5sfz43XSZtlAnyibUFOnYS94+90hpWzlesrN03ZHkiEDioySi6QcfYELwGVrGfDfGcj7zzDMuaf3793etjAYKgGrAMJBF8rDnl+f2DpMWwsQEdCxHQdcB+8qzuQjueEf45ifWQEf+Cp+Ph6tiEmYHEzj/9/PxipngiuJNhdNN/1L1j3CWpmD6hR3tBAg5Nm7cKKxMzTVmJ8O3mIBqQPKz1h+G/znXAJr5h4COGfHMjh8yZIhbqdlMS+Io7XzlT0dZ3rttusoygiDsA8QBrAJniJZMyxWWekxJI7QfSwWOHj3aAQ9TFC3FzHY/WSMMwPGbouaGvfyGDh3qCoubbrpJevXq5UDHewqQ0ixELM4DcY4RU/NAsKb8xmmlvTM4adVU9bbH+KSVLyKgTrM4EJZeXkzw89KAdlVzEi3EWp2sb0J3w+zZsx0Qhw8f7vr+WFCJeYWNGjVybi1FLKs+b9481xlOXREwDhgwwC07iGmZf9Uz4re4LYxYPAfAi8GvZsLv6mzMg9yjePbKjbnb62Ep3fgBYNfW18fwsi5durgqBkvEr1ixwk1SJWpXGPjSYH55np6e7vwxwwAgQ4SJuWr3FQF05CsAHlwIqFgcMNBwhmjwoN5HXQztp0tIuIPZ7HS2o92WL1/uZtOjJdkTnP7Adu3audkF1Ocg3jE1CcDRugnYDLAWl3MYwz8B8GL445WHpBsQDISABXMR8Jh2YtNGjsLI/KDdbP6hhVGY31h7HwAv1r5YDKTXD0a7jibZAM40WzTuY9nN/wHVl+2MnoZmDgAAAABJRU5ErkJggg=="] | math | multiple-choice |
298 | 以下四图,都是同一坐标系中三次函数及其导函数的图像,其中一定不正确的序号是() | $$①$$ | $$②$$ | $$③$$ | $$④$$ | C | 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"] | math | multiple-choice |
299 | 对四组数据进行统计,获得以下散点图,关于其相关系数进行比较,正确的是($$$$) | $$r$$$$_{2}$$$$r$$$$_{4}0$$$$r$$$$_{3}$$$$r$$$$_{1}$$ | $$r$$$$_{4}$$$$r$$$$_{2}0$$$$r$$$$_{1}$$$$r$$$$_{3}$$ | $$r$$$$_{4}$$$$r$$$$_{2}0$$$$r$$$$_{3}$$$$r$$$$_{1}$$ | $$r$$$$_{2}$$$$r$$$$_{4}0$$$$r$$$$_{1}$$$$r$$$$_{3}$$ | A | 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"] | math | multiple-choice |
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