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GMAT Practice Question (One of Hundreds)

n₁ = 145, n₂ = 147, n₃ = 149
The above is an arithmetic sequence. The n^th term in this sequence is equal to n². What is n?

A)	9
B)	10
C)	11
D)	12
E)	13

Correct Answer: E

The equation for an arithmetic sequence is a_n = a₁ + d(n-1)

The equation for an arithmetic sequence is a_n = a₁ + d(n-1) where d stands for the how much the sequence goes up each term while a₁ stands for the first term in the sequence. Thus the equation of the above sequence is a_n = 145 + 2(n-1).
Setting an to n² gives us n² = 145 + 2(n-1). This is a quadratic equation. Algebraic manipulation results in:
n² = 145 + 2(n-1)
n² = 145 + 2n - 2
n² - 2n - 143 = 0
Factoring leads us to the equation
(n + 11)(n - 13) = 0
Thus our two solution are n = -11 and n = 13. There is no such thing as the -11 term in the sequence so n must be 13.

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