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 |
|---|---|---|---|---|---|---|
8,400 | 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? | \( 48 \) | I think this 48 red counters since 120 divided by 5 is 24 and 24 x 3 is 72, so 120 - 72 is 48. | False_Misconception | Wrong_Fraction |
8,401 | 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? | \( 48 \) | I think this becaude 120 divided by 5 = 24 and 24 X 3 = 72 so there is 48 left. | False_Misconception | Wrong_Fraction |
8,402 | 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? | \( 48 \) | I think this because 120 divided 5 is 24 and then 24 x 2 = 48 | False_Misconception | Wrong_Fraction |
8,403 | 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? | \( 48 \) | I think this because 1/5 is 24 so 3/5 is 72 and 120 - 72 is 48 so it is D. | False_Misconception | Wrong_Fraction |
8,404 | 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? | \( 48 \) | I think this because 120 divide 5 is 24 then 24 times by 2 is 48. | False_Misconception | Wrong_Fraction |
8,405 | 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? | \( 48 \) | I think this because 120 divide by 5 =24 and 24 X 3=72 so there is 48 left. | False_Misconception | Wrong_Fraction |
8,406 | 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? | \( 48 \) | I think this because 120 divided by 5 is 24 and 5/5 - 3/5 =2/5 so you would times 24 by 2 which is 48. | False_Misconception | Wrong_Fraction |
8,407 | 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? | \( 48 \) | I think this because 120 divided by 5 is 24 and then 24 x 2 = 48. | False_Misconception | Wrong_Fraction |
8,408 | 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? | \( 48 \) | I think this because 120 divided by 5 is 24 times 3 is 7 and taken away from 120 is 48. | False_Misconception | Wrong_Fraction |
8,409 | 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? | \( 48 \) | I think this because 3/5 = 4/10 so divide the bottom = 12 and x by the top by 4 = 48. | False_Neither | null |
8,410 | 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? | \( 48 \) | I think this because 3/5 is equak to 48 | False_Neither | null |
8,411 | 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? | \( 48 \) | I think this because 3/5 is equivalent to 6/10 so I divided 120 by 10 to get 12. The to find 6/10 I multiplied 12 by 6 to get 72. Then I took that away form 120 leaving me with 48. | False_Misconception | Wrong_Fraction |
8,412 | 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? | \( 48 \) | I think this because 3/5 of 120 is 72 so you do 120 subtract 72 is 48. | False_Misconception | Wrong_Fraction |
8,413 | 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? | \( 48 \) | I think this because 3/5=72 and 120-72=48 | False_Misconception | Wrong_Fraction |
8,414 | 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? | \( 48 \) | I think this because 3/5=72 andd 120-72=48. | False_Misconception | Wrong_Fraction |
8,415 | 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? | \( 48 \) | I think this because 60 is 1 half and 24 is lower than 1 quarter and that leaves 48 left | False_Neither | null |
8,416 | 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? | \( 48 \) | I think this because I did a bar model on a bit of paper. | False_Neither | null |
8,417 | 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? | \( 48 \) | I think this because I first divided twenty by five and I got 24 and since I needed to find out 2/5 I doubled it and got 48 | False_Misconception | Wrong_Fraction |
8,418 | 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? | \( 48 \) | I think this because first, we must find out 3/5 of 120=72. To work this out we must divide 120 by 5 which is 24 and then multiply it by 3 which is 72. Then we subtract 72 from 120 which is 48 so D is the answer | False_Misconception | Wrong_Fraction |
8,419 | 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? | \( 48 \) | I think this because half of 120 makes 60 so around 70 will be 3 quarters witch leaves 48 left | False_Neither | null |
8,420 | 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? | \( 48 \) | I think this because i think this | False_Neither | null |
8,421 | 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? | \( 48 \) | I think this because if you divide one hundred and twenty by five and then times by two, you get 48. | False_Misconception | Wrong_Fraction |
8,422 | 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? | \( 48 \) | I think this because one fifth of 120 is 24.
24 x 3= 72 and 120 - 72 = 48 | False_Misconception | Wrong_Fraction |
8,423 | 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? | \( 48 \) | I think this because the counter of red is 72 so the blue must be 48 | False_Neither | null |
8,424 | 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? | \( 48 \) | I think this because there are more red counters but just and it will be under half bu just so I went to the closest one | False_Neither | null |
8,425 | 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? | \( 48 \) | I think this because there are more red counters but just andd it will be under half bu just so I went to the closest one. | False_Neither | null |
8,426 | 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? | \( 48 \) | I think this because when you divide 5 by 120 it is 24 then you multiply it by 2 | False_Misconception | Wrong_Fraction |
8,427 | 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? | \( 48 \) | I think this because you divide by bottom (denominator) and times by top (numerator) | False_Neither | null |
8,428 | 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? | \( 48 \) | I think this is because 120 divided by 5 is 24 and 5/5 - 3/5 = 2/5 so you would times 24 by 2, which is 48. | False_Misconception | Wrong_Fraction |
8,429 | 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? | \( 48 \) | I think this is because 3/5 = 4/10 so divide the bottom = 12 and x by the top by 4 = 48. | False_Neither | null |
8,430 | 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? | \( 48 \) | I took a guess
Bye the way the ones I didn’t type were easy or I guessed | False_Neither | null |
8,431 | 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? | \( 48 \) | I was having trouble with this. Each part is 24 and if there aree only 2 24s left then you do 24x2=48. | False_Misconception | Wrong_Fraction |
8,432 | 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? | \( 48 \) | I worked it out on a bar model. | False_Neither | null |
8,433 | 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? | \( 48 \) | I worked it out on paper | False_Neither | null |
8,434 | 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? | \( 48 \) | I worked it out on paper. | False_Neither | null |
8,435 | 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? | \( 48 \) | I worked out 2/5 of 120 to get the answer in one step | False_Misconception | Wrong_Fraction |
8,436 | 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? | \( 48 \) | I worked out that 1 fifth is 24 and the blue counters where 2 fifths so I doubled 24 and got 48. | False_Misconception | Wrong_Fraction |
8,437 | 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? | \( 48 \) | I worked out what one fifth was and did it from there. | False_Neither | null |
8,438 | 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? | \( 48 \) | I'm not sure how to explain that. | False_Neither | null |
8,439 | 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? | \( 48 \) | If 3/5 are blue and 2/5 is red then 2/4 of 120 is 48. | False_Misconception | Wrong_Fraction |
8,440 | 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? | \( 48 \) | If 3/5 are red then 2/5 would be blue. 1/5 of 120 is 24. 24x2=48 | False_Misconception | Wrong_Fraction |
8,441 | 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? | \( 48 \) | If 3/5 of 120 counters are red, 2/5 must be the blue counter.2/5 * 120 = 48. | False_Misconception | Wrong_Fraction |
8,442 | 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? | \( 48 \) | If 3/5 of 120 counters are red,2/5 of 120 counters must be the blue counters.2/5 of 120 is equal to 48. | False_Misconception | Wrong_Fraction |
8,443 | 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? | \( 48 \) | If I do 5 divided by 120 which is 24 amd times by 3 that is 72 and then take it away from 120 that equals 48. | False_Misconception | Wrong_Fraction |
8,444 | 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? | \( 48 \) | If there are three fifths red counters then there are two fifths blue counters. Two fifths of 120= 48
Answer: 48 | False_Misconception | Wrong_Fraction |
8,445 | 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? | \( 48 \) | If there are three fifths red counters, then there will be two blue ones. Two fifth of 120 = 48. So the answer is 48 | False_Misconception | Wrong_Fraction |
8,446 | 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? | \( 48 \) | If you divide 120 by 5 it equals 24 and 24 times by 3 is 48. | False_Neither | null |
8,447 | 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? | \( 48 \) | If you divide 120 by 5, then times it by 2, you get 48. | False_Misconception | Wrong_Fraction |
8,448 | 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? | \( 48 \) | If you divide 120 by 5, thenn times 24 by 3, then you get 72. Subtract 72 from 120 and you have 48. | False_Misconception | Wrong_Fraction |
8,449 | 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? | \( 48 \) | If you do 120 divided by 5, which is 24 then you would have to do that times 3, then finally take that away from 120 and that is 48. | False_Misconception | Wrong_Fraction |
8,450 | 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? | \( 48 \) | If you find 3/5 you cann take that away from 120 so it would be 120-72=48. | False_Misconception | Wrong_Fraction |
8,451 | 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? | \( 48 \) | If you find out 2/3 of 120 its 24 and times that by two it will get you the answer. | False_Misconception | Wrong_Fraction |
8,452 | 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? | \( 48 \) | If you multiply 120 by 2 / 5 you get 48. | False_Misconception | Wrong_Fraction |
8,453 | 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? | \( 48 \) | If you take 5 times 120 times 24 times and multiply that by 3, you get 72, so I had to take that away from 120 and got 48 so there are 48 red counters. | False_Misconception | Wrong_Fraction |
8,454 | 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? | \( 48 \) | It appears to be a quater of that question | False_Neither | null |
8,455 | 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? | \( 48 \) | It is 48 because 1/5 of 60 is 12x2=24 which is 1/5 of 60 but we need to find 2/5 so we times 24 by 2 to make 48. | False_Misconception | Wrong_Fraction |
8,456 | 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? | \( 48 \) | It is D as I did 2/5 of 120 and 120 / 5 = 24 and 24 x 2 = 48. | False_Misconception | Wrong_Fraction |
8,457 | 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? | \( 48 \) | It is D because if 3/5 are blue, that leaves 2/5 as red. 2/5 of 120 is 48. | False_Misconception | Wrong_Fraction |
8,458 | 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? | \( 48 \) | It looks like it is a quater of that question | False_Neither | null |
8,459 | 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? | \( 48 \) | My partner helped me so I divided it by five = 24 then times it by two =48 | False_Misconception | Wrong_Fraction |
8,460 | 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? | \( 48 \) | My partner helprd me so we divided it by five = 24 and then times by two = 48. | False_Misconception | Wrong_Fraction |
8,461 | 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? | \( 48 \) | Sice three / Five of 120 is 72 and 120 - 72 = 48 which means 48 lf theath conters are bleu | False_Misconception | Wrong_Fraction |
8,462 | 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? | \( 48 \) | Since 1 / 5 of 120 is 24 and 3 /5 are red (72 red) then the 2/5 needs to be 48. | False_Misconception | Wrong_Fraction |
8,463 | 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? | \( 48 \) | Since 120 divided by 5 is 24 then 24x2 is 48 so the answer is48. | False_Misconception | Wrong_Fraction |
8,464 | 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? | \( 48 \) | Since 120 divided by 5 is 24, and 24 times by 3 is 72, then 120 - 72 is 48. | False_Misconception | Wrong_Fraction |
8,465 | 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? | \( 48 \) | Since 120 should be divided by 5, thatt is 24. Hence, 3by5 is 72, so the remaining is 48. | False_Misconception | Wrong_Fraction |
8,466 | 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? | \( 48 \) | Since 3 over 5 into 120 is 72, then 120 minus 72 is 48, which is D. | False_Misconception | Wrong_Fraction |
8,467 | 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? | \( 48 \) | Since 3/5 is 60% and 120 divuded by 10 is 12, we need 6 twelves so 6x12=72 and then 120-72=48. | False_Misconception | Wrong_Fraction |
8,468 | 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? | \( 48 \) | So 60 divided by half is 30 so take away 12 to get your answer. | False_Neither | null |
8,469 | 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? | \( 48 \) | So what I did was 120 divided by 5 then I got 24 so then 24x3 which equaled 72 then 120-72 which gave me 48. | False_Misconception | Wrong_Fraction |
8,470 | 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? | \( 48 \) | So what I did was 120 divided by 5 then I got 24 so then I did 24x3 which equalled 72 then I did 120-72 which gave me 48. | False_Misconception | Wrong_Fraction |
8,471 | 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? | \( 48 \) | The correct answer is D because when you divide 120 by 5 you get an answer of 24 and therefore to find 2/5 you have to multiply 24 by 2 it order to get your answer of 48 | False_Misconception | Wrong_Fraction |
8,472 | 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? | \( 48 \) | There are 48 red counters. | False_Neither | null |
8,473 | 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? | \( 48 \) | There are 72 blue counters so you need to minus tht from the totsl | False_Misconception | Wrong_Fraction |
8,474 | 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? | \( 48 \) | There aree 2 / 5 left which is 48. | False_Misconception | Wrong_Fraction |
8,475 | 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? | \( 48 \) | This is because 2 / 5 times by 120. | False_Misconception | Wrong_Fraction |
8,476 | 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? | \( 48 \) | This is correct as 3 over 5 into 120 is 72 and 120 minus 72 is 48 which is D. | False_Misconception | Wrong_Fraction |
8,477 | 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? | \( 48 \) | When I worked it out I got this answer and then I double checked and got this. | False_Neither | null |
8,478 | 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? | \( 48 \) | Work out 3/5 of red and whatevers left is blue counters, 48. | False_Misconception | Wrong_Fraction |
8,479 | 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? | \( 48 \) | You divide 120 by 5 and then you get 24 and you double it to get your answer | False_Misconception | Wrong_Fraction |
8,480 | 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? | \( 48 \) | You do a quarter of 120 times that. | False_Neither | null |
8,481 | 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? | \( 48 \) | You do times by the tip and divide by a bottom. | False_Neither | null |
8,482 | 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? | \( 48 \) | You find out a fifth and ×2 | False_Neither | null |
8,483 | 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? | \( 48 \) | You have to do 3/5 of 120 to find out how many red counters there are | False_Neither | null |
8,484 | 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? | \( 48 \) | You have to find 2/5 of 120 and get the answer D which is 48. | False_Misconception | Wrong_Fraction |
8,485 | 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? | \( 48 \) | You havee 3/5 so you get 2/5 this 48 | False_Misconception | Wrong_Fraction |
8,486 | 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? | \( 48 \) | You must find 2/5 of 120 which is 48. | False_Misconception | Wrong_Fraction |
8,487 | 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? | \( 48 \) | because 1/5 of 120 is 24 so then i multiplied 24 by 3 which was 72 and then i subtracted 72 from 120 which was 48 | False_Misconception | Wrong_Fraction |
8,488 | 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? | \( 48 \) | because 1/5 of 120 is 24 times 3 is 72 and 120 -72 is 48 | False_Misconception | Wrong_Fraction |
8,489 | 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? | \( 48 \) | because 1/5 of 120 is 24 times 3 is 72, 120 minus 72 is 48 | False_Misconception | Wrong_Fraction |
8,490 | 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? | \( 48 \) | because 120 divide 5 is 24 so 24 add 24 is 48 | False_Misconception | Wrong_Fraction |
8,491 | 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? | \( 48 \) | because 120 divided by 5 is 24 and 2 times 24 is 48 | False_Misconception | Wrong_Fraction |
8,492 | 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? | \( 48 \) | because 120 divided by 5 will be 24 then since we know that the red counters are 3/5 the remaining is 2 so we multiply 2 by 24 to get the answer | False_Misconception | Wrong_Fraction |
8,493 | 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? | \( 48 \) | because 120 divided by 5=24 and 3x24=72 and 120-72=48 | False_Misconception | Wrong_Fraction |
8,494 | 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? | \( 48 \) | because 120 divided by 5=24 and 3x24=72 and 120-72=48 | False_Misconception | Wrong_Fraction |
8,495 | 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? | \( 48 \) | because 120 dividrd by 5 is 24 so 24 plus 24 is 48 | False_Misconception | Wrong_Fraction |
8,496 | 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? | \( 48 \) | because 24x5=120 so 1/5=24 so 3/5 are 72 and 2/5 is 48 so it’s 48 | False_Misconception | Wrong_Fraction |
8,497 | 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? | \( 48 \) | because 3/5 is more than a half so i worked out half and worked out that it had to be less than a half but not that much less | False_Neither | null |
8,498 | 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? | \( 48 \) | because 3/5 of 120 is 72 so 48 is the remaining | False_Misconception | Wrong_Fraction |
8,499 | 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? | \( 48 \) | because 3/5 of 120 is 72. 120-72=48 which means that there are 48 counters left | False_Misconception | Wrong_Fraction |
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