row_id int64 0 36.7k | QuestionId int64 31.8k 109k | QuestionText stringclasses 15
values | MC_Answer stringclasses 49
values | StudentExplanation stringlengths 1 586 | Category stringclasses 6
values | Misconception stringclasses 35
values |
|---|---|---|---|---|---|---|
7,900 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i dont really understand this one | False_Neither | null |
7,901 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i have tried to do this but i need a bit more help with dividing fractions. | False_Neither | null |
7,902 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i made the 6 into 6/1 then decided it by 1/2 and it gave me 6/2 | False_Misconception | SwapDividend |
7,903 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i made the 6 into 6/1 then decided it by 1/2 and it gave me 6/2. | False_Misconception | SwapDividend |
7,904 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i make it into times and swich the last fraction which is 1 out of 6 and times | False_Neither | null |
7,905 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think it is because the bottom always stays the same. | False_Neither | null |
7,906 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think it is d because when you do keep change flip you would do 1x6 which is six. | False_Neither | null |
7,907 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think it's because we've been learning about these things, amd i have an answer. | False_Neither | null |
7,908 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think it's because we've been learning about these things, and i have an answer. | False_Neither | null |
7,909 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think it's because what i did is switched the fraction around 2/1 and then i multiplied it by 6 and halved the remainder. | False_Misconception | Mult |
7,910 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this answer because first i made 6 in to being 6 over 6 the just divided it by two whick it gave me the answer d | False_Misconception | SwapDividend |
7,911 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this answer because you divide 6 by one half and it gives you the answer | False_Misconception | SwapDividend |
7,912 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this answer is d because first i made 6 in to being 6 overr 6 then just divided it by two whick gave me the answer d | False_Misconception | SwapDividend |
7,913 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because i used the stick change flip method | False_Neither | null |
7,914 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because 1 times 6=6 and 2 times 1=2, and as a fractiom that would be 6/2. | False_Misconception | Mult |
7,915 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because i did 1over 6 and then flipped it over and multiplied it. | False_Neither | null |
7,916 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because i did it mentally and that's what i got. | False_Neither | null |
7,917 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because one half divided by 6 is six times two. | False_Neither | null |
7,918 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because the number 1 is from random timestables so it must be this. | False_Neither | null |
7,919 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because we did it. | False_Neither | null |
7,920 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because you dont change the denominator | False_Neither | null |
7,921 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because you need to do 1 divided by 6 which is 6 and the denominater stays the same. | False_Neither | null |
7,922 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this because you only divide the numerator by 6 and you get 6/2 | False_Neither | null |
7,923 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is because i used the stick change flipp method. | False_Neither | null |
7,924 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is because we did it. | False_Neither | null |
7,925 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is because you dont change the denominator | False_Neither | null |
7,926 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is because you flip the division dymbol to multiplication | False_Neither | null |
7,927 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is because you flip the division symbol to multiplication | False_Misconception | Mult |
7,928 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is right because if you put a one under the six then you divide that. | False_Neither | null |
7,929 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think this is right because if you put a one under thr six then you divide that. | False_Neither | null |
7,930 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think thiss because 1 x 6 = 6. | False_Misconception | Mult |
7,931 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i think thus because 1 x 6 = 6, so it is 6 / 2. | False_Misconception | Mult |
7,932 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i thinkk this is because when you divide a fraction you will do divide by the bottom and times times by t he top and the denominator will be the same. | False_Neither | null |
7,933 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i uded the method keep, change, flip. | False_Neither | null |
7,934 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i used the dividing by a fraction tip in my head | False_Neither | null |
7,935 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i worked out that if you keep it and flip it then you will get the answer. | False_Neither | null |
7,936 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | i'm not really sure about my answer but i think you convert 6 into a fraction the do kcf to get the answer of 2/6 then you swap it around. | False_Neither | null |
7,937 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you do 6 times 2, then you get 6/2. | False_Neither | null |
7,938 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you flip the numbers and times it it equals 6over2. | False_Neither | null |
7,939 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you have 1/2 then you divide it by 6 you would have 6/2= six halves | False_Misconception | SwapDividend |
7,940 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you keep flip change and change 6 to 6/1. | False_Neither | null |
7,941 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you make 6 wholes into a fraction, it would be 6/1. then you do 1/2 x 6/1, which will equal 6/2 | False_Misconception | Mult |
7,942 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you make 6 wholes into a fraction, it would be 6/1. then you do 1/2 x 6/2, which will equal 6/2. | False_Misconception | Mult |
7,943 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you multiply 1 by 6, it will be 6 and 2 stays the same, so it is 6/2. | False_Misconception | Mult |
7,944 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | if you put them to gethere that is what you get | False_Neither | null |
7,945 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | in my head, i used the dividing by a fraction tip. | False_Neither | null |
7,946 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | it is D because if you do 1/2 divided by 6/1 = 6/2 | False_Neither | null |
7,947 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | it is d because 2 x 1= 2 and 1 x 6= 6 and it makes 6/3 | False_Misconception | Mult |
7,948 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | kfc the method i used was KFC because i learned to keep the normal number and flip the other number and then change the numbers into
times,divide,take away,or add, | False_Neither | null |
7,949 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | my grandma told me about fraction | False_Neither | null |
7,950 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | one dived by six equals one and two divided six equals three | False_Neither | null |
7,951 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | one divided by six equals one and two divided six = three. | False_Neither | null |
7,952 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | one divided by six equalss one and two divided six = three. | False_Neither | null |
7,953 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | since 6x2=12/2 and if you divide it by 2, yourr answer will be 6/2. | False_Neither | null |
7,954 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | sorry but i did not understand this | False_Neither | null |
7,955 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | the answer is d because youu only half the fraction. | False_Neither | null |
7,956 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | the denominator always remains the same | False_Neither | null |
7,957 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | the denominator always stays the same | False_Neither | null |
7,958 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | the method i used was kfc because the fast food chainn taught me to keep the normal number and flip the other number then change the numbers into times,divide,take away,or add, | False_Neither | null |
7,959 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | thid is closest to my answer, i would have got 6/12 | False_Neither | null |
7,960 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | this is the answer because i multiplied it and this is what i got | False_Neither | null |
7,961 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | u put 6 over 1 to make it a fraction and then times it with the half | False_Misconception | Mult |
7,962 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | when you are dividing a fraction it is the same as
times tables on a fraction.
you also leave the denominator | False_Neither | null |
7,963 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you always divide the top mumber by itself. | False_Neither | null |
7,964 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you always divide the top number | False_Neither | null |
7,965 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you always divide the top numper | False_Neither | null |
7,966 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you change the divide to a x and put a one under the 6 and times them | False_Misconception | Mult |
7,967 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you change the divide to an x and put a one under the 6 and timess them. | False_Neither | null |
7,968 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you have to change 6 into a fraction, so that will be 6/1. then, you flip the sign into an??. this will turn into 1/2 x 6/2, which is the same as half. | False_Neither | null |
7,969 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you need to do keep swap flip and turn the 6 into 61. | False_Neither | null |
7,970 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you times one over two by six over one. | False_Misconception | Mult |
7,971 | 31,774 | Calculate \( \frac{1}{2} \div 6 \) | \( \frac{6}{2} \) | you wiuld times the 1 and 6 and leave the 2. | False_Misconception | Mult |
7,972 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 1 fifth of 120 is 24. Then you multiply that by 3 which equals 72. | False_Correct | null |
7,973 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 1/10 of 120 = 12 1/5=1/10 divuded by 2 1/12 = 6 6 x 4 = 24 | False_Misconception | Incomplete |
7,974 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 100 divided by 5 is 20 20 divided by 5 is 4 add the 2 results together and you have your answer | False_Misconception | Incomplete |
7,975 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 3 = 40 divided by 5= 8 times by 3= 24 | False_Neither | null |
7,976 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 5 equals 24 which times by 3 is 72 which is my corrected answer | False_Correct | null |
7,977 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 5 equals 24 which times by 3 is 72 which is my corrected answer. | False_Correct | null |
7,978 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 5 is 24 multiplied by 3 is 72 so the answer is B | False_Correct | null |
7,979 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 5 is 24 multiplied by 3 is 72 so the answer is B. | False_Correct | null |
7,980 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 5 is 24 then times 3 is 72 so it is A | False_Correct | null |
7,981 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 divided by 5 is 24 then times 3 is 72 so it is a | False_Correct | null |
7,982 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 is in the times table | False_Misconception | Irrelevant |
7,983 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 120 is in the times table | False_Neither | null |
7,984 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 24 because 120 divided by 5 = 24 which is the answer. | False_Misconception | Incomplete |
7,985 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 24 because 120 divided by 5=24 which is the answer. | False_Misconception | Incomplete |
7,986 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 240 divided by 3 = 40 times by 5 = 8 times times 3= 24. | False_Neither | null |
7,987 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 24x5=twenty four so the answer is twenty four. | False_Misconception | Incomplete |
7,988 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 24x5=twenty fourr so the answer is twenty four. | False_Misconception | Incomplete |
7,989 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 3 / 5 of 120 is 24, so there are 24 red counters. | False_Misconception | Incomplete |
7,990 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 3/5 of 120 3x5=15= blue counters
5 divided by 120=24= red counters | False_Neither | null |
7,991 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 3/5 of 120 3x5=15=blue counters 5 divided by 120=24=red= red counter tops | False_Neither | null |
7,992 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 3/5 of 120 is 24 so there are 24 red counters. | False_Neither | null |
7,993 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 3/5 of 120 so 5 divided by 120=24 5x3= 15 so
BLUE COUNTERS: 15
RED COUNTERS : 24 | False_Neither | null |
7,994 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 3/5 of 120 so 5 divided by 120=24 5x3= 15 so BLUE COUNTERS: 15 RED COUNTERS : 24 | False_Neither | null |
7,995 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 6 is 1 / 5 andd so 24 is 3 times that. | False_Neither | null |
7,996 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | 6 is 1/5 and so 24 is 3 times | False_Neither | null |
7,997 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | All of the others are to big to go in 5 times. | False_Neither | null |
7,998 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | All of the others are to big to go in 5 times. | False_Neither | null |
7,999 | 31,777 | A box contains \( 120 \) counters. The counters are red or blue. \( \frac{3}{5} \) of the counters are red.
How many red counters are there? | \( 24 \) | B because 24 multiplied by 5 is 120 | False_Misconception | Incomplete |
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