Hi this question is from the GMATPrep Question pack 1:
At the end of each year, the value of a certain antique watch is "c" percent more than its value one year earlier, where "c" has the same value each year. If the value of the watch was "k" dollars on January 1, 1992, and "m" dollars on January 1, 1994, then in terms of "m" and "k", what was the value of the watch, in dollars, on January 1, 1995?
A. m+1/2(m-k)
B. m+1/2((m-k)/k)m
C. (m*sqrt(m))/sqrt(k)
D. m^2/2k;
E. km^2
Correct answer is C.
However I'm running into the issue again that I am getting two answers when using a specific number set for "Picking Numbers"
I'm choosing c = 100%, k= $100, thus m = $400, and the price for 1995 will ultimately be $800.
However I'm getting C and D for the answer.
Math for C: 400*sqrt400/sqrt100 That equals 800 which is the right answer
Math for answer D: 400sqrd/2(100) That ALSO equals 800.
Can anyone explain this discrepancy?
At the end of each year, the value of a certain antique watch is "c" percent more than its value one year earlier, where "c" has the same value each year. If the value of the watch was "k" dollars on January 1, 1992, and "m" dollars on January 1, 1994, then in terms of "m" and "k", what was the value of the watch, in dollars, on January 1, 1995?
A. m+1/2(m-k)
B. m+1/2((m-k)/k)m
C. (m*sqrt(m))/sqrt(k)
D. m^2/2k;
E. km^2
Correct answer is C.
However I'm running into the issue again that I am getting two answers when using a specific number set for "Picking Numbers"
I'm choosing c = 100%, k= $100, thus m = $400, and the price for 1995 will ultimately be $800.
However I'm getting C and D for the answer.
Math for C: 400*sqrt400/sqrt100 That equals 800 which is the right answer
Math for answer D: 400sqrd/2(100) That ALSO equals 800.
Can anyone explain this discrepancy?
