BTGmoderatorDC wrote: ↑Fri Jul 31, 2020 2:31 am
If n is a positive integer and k = 5.1 x 10^n , what is the value of k ?
(1) 6,000 < k < 500,000
(2) k^2 = 2.601 * 10^9
OA
D
Source: Official Guide
Target question: What is the value of k?
Given: n is a positive integer, and k = (5.1)x(10^n)
IMPORTANT: This since n can be ANY positive integer, there are several possible values of k.
They are:
51, 510, 5100, 51000, 510000, etc
Statement 1: 6,000 < k < 500,000
If we examine the possible values of k (
51, 510, 5100, 51000, 510000, etc ), we can see that only ONE value (51,000) lies within the range defined by the inequality.
So,
k must equal 51,000
Since we can answer the
target question with certainty, statement 1 is SUFFICIENT
Statement 2: k² = 2.601 x 10^9
If k²= 2.601 x 10^9, then EITHER k = √(2.601 x 10^9) OR k = -√(2.601 x 10^9). So, it
appears that we cannot answer the
target question.
HOWEVER, the question also tells us that k = 5.1 x 10^n, and since 5.1 x 10^n will always have a POSITIVE value, we know that k must be POSITIVE.
If k is POSITIVE, then k
≠ -√(2.601 x 10^9)
This means that k
must equal √(2.601 x 10^9)
Since we can answer the
target question with certainty, statement 2 is SUFFICIENT
Answer = D
Cheers,
Brent
