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n is an integer greater than 1. If the remainder is 1, when n is divid [#permalink]
If the remainder is 1, when n is divided by 3

Theory: Dividend = Divisor*Quotient + Remainder

n -> Dividend
3 -> Divisor
a -> Quotient (Assume)
1 -> Remainders
=> n = 3*a + 1 = 3a + 1

For simplicity, lets take a = 1
=> n = 3*1 + 1 = 4

(\(n^2\) + n - 2) must be divisible by which of he following double-digit number

\(n^2\) + n - 2 = \(4^2\) + 4 - 2 = 16 + 2 = 18
=> \(n^2\) + n - 2 will be divisible by 18

So, Answer will be D
Hope it helps!

Watch the following video to learn the Basics of Remainders

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n is an integer greater than 1. If the remainder is 1, when n is divid [#permalink]
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