\AAPL wrote:GMAT Prep
If each term in the sum \(a_1+a_2+a_3+ \cdots +a_n\) is either 7 or 77 and the sum equals 350, which of the following could be equal to \(n\)?
A. 38
B. 39
C. 40
D. 41
E. 42
OA C
APPROACH #1:
Notice that 77 does not divide into 350 many times.
In fact, there can be, at most, four 77's in the sum
So, there are only 5 cases to consider (zero 77's, one 77, two 77's, three 77's and four 77's)
It shouldn't take long to check the cases.
case 1: zero 77's in the sum
If every term is 7, the total number of terms is 50.
50 is not one of the answer choices, so move on.
case 2: one 77 in the sum
350 - 77 = 273
273/7 = 39
So, there could be 39 7's and 1 77 in the sum, for a total of 40 terms
This matches one of the answer choices, so the correct answer is C
Cheers,
Brent
