buoyant wrote:After M students took a test, there was a total of 64% of correct answers. If the test contains 50 questions, what is the least number of questions that the next student have to get right to bring the total of correct answers to 70% ?
A) 3M + 20
B) 3M + 35
C) 4M + 15
D) 4M + 20
E) 4M + 45
[spoiler]OA: B[/spoiler]
Is it a weighted average question?
I solved as below:
70% of 50 questions= 35 correct answers
chose B
but still don't get why is M in the solution?
Yes, it's basically a weighted average question.
You need M, because the bigger M is the more weight there is to the 64 percent tests.
For instance, if M is 2, there are two tests with 64 percent right answers, and the weighted average will be of three tests, two with 64% right answers and the next one which needs to have enough right answers to get the average to 70%.
If M is 3, the next test will have to have even more right answers in order to make up for three 64% tests and get the average score to 70.
You could do all kinds of math to figure this out, but I just set M = 1. So the one test had 64% of 50 = 32 right answers. To get the average to 70% of 50 = 35 right answers, we need the next person to get 38 right. 38 + 32 = 70 70/2 = 35.
If M is 1, 38 = 35 + 3M. Confirm that none of the other choices somehow work.
Choose
B.
Alternatively, you could see that each number of right answers in the first M tests is 32, which is 3 below 35. There are M tests and each of them is 3 below the desired average.
So to create a 35 average, the next test has to have 35 right answers plus enough right answers to make up for the 3 that were not there on each of the other tests. So the score on the next test has to be 35 + 3M. Then the average is [32M + (3M + 35)]/[M + 1] = [35M + 35]/[M + 1] = 35
So that's where the 3M + 35 comes from.
