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 |
|---|---|---|---|---|---|---|
8,300 | 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? | \( 48 \) | 5/5 minus 3/5 is 2/5 and 2 fifthss of 120 is d. | False_Neither | null |
8,301 | 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? | \( 48 \) | 5/5 minus 3/5 is 2/5 and 2/5 of 120 is D | False_Misconception | Wrong_Fraction |
8,302 | 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? | \( 48 \) | As 120 divided by 5 is 24 and then 24 x 3 = 72 120 - 72 = 48! | False_Misconception | Wrong_Fraction |
8,303 | 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? | \( 48 \) | As the denominator is 5, 120 should be divided by 5 that is 24. With this, we can find 3by5 and remaining. 3by5 is 72 (number of red balls), so the remaining (blue balls) are 48. | False_Misconception | Wrong_Fraction |
8,304 | 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 IS 6 AND IF YOU TIMES IT BY3 YOU GET 48 | False_Neither | null |
8,305 | 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 5th of 120 is 24 but to find two fifths you need to times it by 2 which is 48 | False_Misconception | Wrong_Fraction |
8,306 | 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 and if 3/5 are red (72 red) then the 2/5 needs to be 48 | False_Misconception | Wrong_Fraction |
8,307 | 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. 24 X 3 = 72. 24 X 2 = 48. And 72 +48 = 120. | False_Misconception | Wrong_Fraction |
8,308 | 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 then 24x2 is 48 so the answer is 48 | False_Misconception | Wrong_Fraction |
8,309 | 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 times 3 is 72 then do 120 -62 is 48 | False_Misconception | Wrong_Fraction |
8,310 | 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 72 then 120 take 72 is 48. | False_Misconception | Wrong_Fraction |
8,311 | 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 dividedd by 5 = 24. 24 X 3 = 72. 48 x 2 = 48. And 72 + 48 = 120. | False_Neither | null |
8,312 | 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 are 48 so it’s 48 | False_Misconception | Wrong_Fraction |
8,313 | 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 60% and 120 devided by 10 is 12 and we need 6 twelves so 6x12=72 and then 120-72=48 | False_Misconception | Wrong_Fraction |
8,314 | 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 and 120-72=48 which means 48 of the counters are blue | False_Misconception | Wrong_Fraction |
8,315 | 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 5 goes into 120 24 times and there are two fifths left so you times 24 by 2 and you get 48 | False_Misconception | Wrong_Fraction |
8,316 | 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 I did 120:5 that is 24x2 (because the red are 3/5 so to get the intere is 2) = 48 | False_Misconception | Wrong_Fraction |
8,317 | 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 I worked out what 1/5 was and then doubled it | False_Misconception | Wrong_Fraction |
8,318 | 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 I worked out what 1/5 was and then doubled it | False_Misconception | Wrong_Fraction |
8,319 | 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 if you change 3 /5 into 6/10 then you divide 120 by 10 and times it by 6. Then whatever that number is you take it away from 120. | False_Misconception | Wrong_Fraction |
8,320 | 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 if you divide 120 by 5 and times it by 2, you get 48 | False_Misconception | Wrong_Fraction |
8,321 | 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 if you look at the numbers you can tell that it can't be A or C so I picked D because it looks like the right one | False_Neither | null |
8,322 | 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 one fifth is 24 times two is 48 | False_Misconception | Wrong_Fraction |
8,323 | 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 one fifth is 24 times two is 48. | False_Misconception | Wrong_Fraction |
8,324 | 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 one of them is 24 and if you times that by two it gives you 48 | False_Misconception | Wrong_Fraction |
8,325 | 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 to find 3/5s of 120 you need to divide it by 5 and times by 3 which is 72 then 120 take away 72 is 48 | False_Misconception | Wrong_Fraction |
8,326 | 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? | \( 48 \) | Bye the way the ones I didn’t type were easy or I guessed. | False_Neither | null |
8,327 | 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? | \( 48 \) | D because if 120 divided by 5 is 24 then you have already used 3/5s then you just x it by 2 to get 48 | False_Misconception | Wrong_Fraction |
8,328 | 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? | \( 48 \) | D because it must not be c because it wouldn't make sense also b would not make sense and a is the same thing as a and b so that's why I picked d | False_Neither | null |
8,329 | 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? | \( 48 \) | D is the right answer as it is the amount of counters left. | False_Neither | null |
8,330 | 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? | \( 48 \) | D since a 3rd of a 120th is 48 | False_Neither | null |
8,331 | 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? | \( 48 \) | Divide 120 by 5 then times 24 by 3 and you get 72 . Take away 72 from 120 and you get 48 | False_Misconception | Wrong_Fraction |
8,332 | 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? | \( 48 \) | Divide 120 by 5 time it by three to get 72.
Take 72 away from 120 to get 48. | False_Misconception | Wrong_Fraction |
8,333 | 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? | \( 48 \) | Divide 120 by 5, and then multiply by 3, to get the answer for the red counters. Subtract 72 (red counters) from 120, to get the answer for the blue counters. | False_Misconception | Wrong_Fraction |
8,334 | 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? | \( 48 \) | Divide by bottom times by the top and take away from your starting number | False_Misconception | Wrong_Fraction |
8,335 | 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? | \( 48 \) | Divide by the bottom times by the top | False_Neither | null |
8,336 | 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? | \( 48 \) | First, 120 divided by 5 is 24. Then, therr is 2 / 5 remaining, so then you do 24 + 24 = 48. | False_Misconception | Wrong_Fraction |
8,337 | 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? | \( 48 \) | First, you have to do 120 divided by 5 that is 24. Then, there is 2/5 remaining, so then you do 24+24=48. | False_Misconception | Wrong_Fraction |
8,338 | 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? | \( 48 \) | For this question, I calculated what 2/5 of 120 was, because if 3/5 are blue, that means 2/5, which gave me an answer of 48. | False_Misconception | Wrong_Fraction |
8,339 | 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 2 FIFTHS ARE LEFT OVER SO 24 MULTIPLIED BY 2 =48 | False_Misconception | Wrong_Fraction |
8,340 | 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 am gessing because I dont have a peice of paper | False_Neither | null |
8,341 | 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 am only guessing because I don't understand this question . | False_Neither | null |
8,342 | 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 calculated 1 / 5 was 24 and then I doubled it to get the whole and I got 48. | False_Misconception | Wrong_Fraction |
8,343 | 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 calculated 1/5 was 24 and I doubled it to get a whole and I got 48 | False_Misconception | Wrong_Fraction |
8,344 | 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 calculated the division of the whole and subtracted it | False_Neither | null |
8,345 | 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 calculated the division of the whole and subtracted it. | False_Neither | null |
8,346 | 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 can't remember how to do it so I will try it again tomorrow. | False_Neither | null |
8,347 | 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 chose 48 because I know that 3/5 is more than half so it would not be 60 and 48 is the closest to 3/5 so therefore I think there are 48 blue counters | False_Neither | null |
8,348 | 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 chose D because I did how much there was left to become a whole and it is 2/5. i then did 2/5 of 120 and that gave me 48 | False_Misconception | Wrong_Fraction |
8,349 | 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 did 120 divided by 5 and then times it by 3 | False_Neither | null |
8,350 | 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 did 3/5 of 120 ,which is 72, and took away the remaining from 120. | False_Misconception | Wrong_Fraction |
8,351 | 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 diveidid 120 by 5 then times that by 2 | False_Misconception | Wrong_Fraction |
8,352 | 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 divided 120 and 5 which is 24 I multiplied it by 3 and I subtracted it from 720 | False_Neither | null |
8,353 | 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 divided 120 by 5 and then times the answer by 2 because there is 2 / 5 left. | False_Misconception | Wrong_Fraction |
8,354 | 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 divided 120 by 5 and then times the answer by 2 because there is 2/5 left. | False_Misconception | Wrong_Fraction |
8,355 | 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 divided 120 by 5 to get a fifth the multiplied it by two | False_Misconception | Wrong_Fraction |
8,356 | 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 divided 120 by 5 to get a fifthh then multiplied it by two. | False_Misconception | Wrong_Fraction |
8,357 | 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 dividrd 120 by 5 which is 24 then I multiplied by 3 and I subtracted 720. | False_Misconception | Wrong_Fraction |
8,358 | 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 do 5 divided by 120 which is 24 and times by 3 which is 72 and take it away from 120 that equals 48 | False_Misconception | Wrong_Fraction |
8,359 | 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 do not get this so I guessed (D) because it is red | False_Neither | null |
8,360 | 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 do not understand this so I gurssed (D) because it is red. | False_Neither | null |
8,361 | 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 don’t know how to explain it | False_Neither | null |
8,362 | 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 forgot how to figure out the bar method but when I tried this wass the closest. | False_Neither | null |
8,363 | 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 found out the answer because I changed 120 to a fraction which is 48 divided by 120. | False_Neither | null |
8,364 | 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 found out this answer because I changed 120 to a fraction which is 48 over 120。 | False_Neither | null |
8,365 | 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 got 24 then doubled it. | False_Misconception | Wrong_Fraction |
8,366 | 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 got a bit stuck on tgis one but 3/5 is 75% so I took 75 away from 120 | False_Neither | null |
8,367 | 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 got a bit stuck on this one but 3/5 is 75% so I took 75 away from 120. | False_Neither | null |
8,368 | 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 have no way of expkaining that. | False_Neither | null |
8,369 | 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 knew it couldn’t be a or c so I started with forty eight and halfed it, the multiplied it by five and got an answer of 120 so I knew it was right | False_Neither | null |
8,370 | 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 know because I used a bar model to find out that it is 24 per piece and 24+24 is 48. | False_Misconception | Wrong_Fraction |
8,371 | 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 know that 2.5/5 is 60 so it can't be 72 because that is too big and 24 is too small. | False_Neither | null |
8,372 | 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 know that 2.5/5 is 60, so it can't be 72 because that is too big, and 24 is also too small. | False_Neither | null |
8,373 | 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 know that 3\5 =90 so I guessed from there | False_Neither | null |
8,374 | 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 know that 60% is the same as 3/5 so I did 60% off 120 to give me the remaining 2/5 . | False_Misconception | Wrong_Fraction |
8,375 | 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 know that 60% is thee same as 3/5 so I did 60% off 120 to get the remaining 2/5. | False_Misconception | Wrong_Fraction |
8,376 | 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 know the answer is d because if 1/5 of 120 is 24 then 2/5 must be double ( 48 ) | False_Misconception | Wrong_Fraction |
8,377 | 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 know this because we put 24 in a bar model and 3 parts equals 72 counters which leaves 48 in the bar model I subtracted 72 from 120 to get 48 | False_Misconception | Wrong_Fraction |
8,378 | 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 need to find 2/5 of 120 so I will times it by 2, so 24 times 2 = 48. | False_Misconception | Wrong_Fraction |
8,379 | 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 pick D because I did 120%5 = 24 then I did 24x3 since it’s 3/5 and that was 72, so I took 72 away from 120 and the missing fraction was 48 ( 2/5) | False_Misconception | Wrong_Fraction |
8,380 | 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 pick D because I did 120%5 = 24 then I multiplied 24 by 3 since it’s 3/5 and that was 72, so I took 72 away from 120 and the missing fraction was 48 ( 2/5) | False_Misconception | Wrong_Fraction |
8,381 | 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 picked D because 120 divided by 5 is 24, so one fifth is 24, but we need two fifths so I multiplied it by 2, which is 48. | False_Misconception | Wrong_Fraction |
8,382 | 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 picked D because 120 divided by 5 is 24, so one fifth is 24. We needd two fifths so I multiplied it by 2, which is 48. | False_Misconception | Wrong_Fraction |
8,383 | 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 really struggled on this question so i chose d because it was the closest to my answer. | False_Neither | null |
8,384 | 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 it is 48 because you could times it by 3 to get 120 something | False_Neither | null |
8,385 | 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 it is D because there are 2/5 left of the counters, and 1/5 is 24, so 2/5 is double: 48. | False_Misconception | Wrong_Fraction |
8,386 | 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 it would D because the number is27 | False_Neither | null |
8,387 | 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 it's D because 72 and 48 are the only numbers that add together to make 120 | False_Neither | null |
8,388 | 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 it's D because 72 and 48 are the only numbers that add up to make 120. | False_Neither | null |
8,389 | 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 it’s 48 because you need it divided by 5 to get the five parts and that 24 and you need two of it so if you’re up double it it equals 48 which is what’s left | False_Misconception | Wrong_Fraction |
8,390 | 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 that D is the correct answer because if you do the amount of counters divided by 5 then you get 24 then you do 24×2 which gives you the amount of red counters | False_Misconception | Wrong_Fraction |
8,391 | 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 that D is the correct answer because if you do the amount of counters divided by 5, then you get 24 then do 242 which gives you the number of red ones. | False_Misconception | Wrong_Fraction |
8,392 | 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 the answer is D because 120 divided by 5 = 24. 24 x the two extra fifths = 48 (D) | False_Misconception | Wrong_Fraction |
8,393 | 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 the answer is D because 3/5 of 120 is 72 and 120-72 is 48 | False_Misconception | Wrong_Fraction |
8,394 | 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 the answer is d because I worked it out and I got this answer | False_Neither | null |
8,395 | 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 there are 48 blue counters because I know that 3/5 is more than half so it would not be 60 and 48 is the closest to that number. | False_Neither | null |
8,396 | 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 think this because 1 / 5 is 24 and if you times that by 2 the answer is 48. | False_Misconception | Wrong_Fraction |
8,397 | 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 think this because 1/5 is 24 and if u times that by 2 the answer is 48 | False_Misconception | Wrong_Fraction |
8,398 | 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 simce 120 divided by 5 is 24 and 24 x 3 is 72, so 120 - 72 is 48. | False_Misconception | Wrong_Fraction |
8,399 | 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 |
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