What is the last two digits of m when m = 10^n - 32?

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Multiple Choice

What is the last two digits of m when m = 10^n - 32?

To determine the last two digits of ( m ) when ( m = 10^n - 32 ), we need to evaluate ( 10^n \mod 100 ) since the last two digits of a number can be derived from its value modulo 100.

For any integer ( n \geq 2 ), ( 10^n ) is clearly divisible by 100, which means that ( 10^n \equiv 0 \mod 100 ). Thus, we have:

[

m = 10^n - 32 \equiv 0 - 32 \mod 100 \equiv -32 \mod 100.

]

To convert (-32) into a positive representation under modulo 100, we can add 100:

[

-32 + 100 = 68.

]

Therefore, the last two digits of ( m ), when ( n \geq 2 ), are 68. Hence, the correct answer is that the last two digits of ( m ) are indeed 68. This solution gives a clear understanding of how modular arithmetic can be applied to find the last two digits of a larger expression.

What is the last two digits of m when m = 10^n - 32?

Study for the Electronic GMAT Test. Enhance your skills with interactive quizzes and detailed explanations. Gear up for your exam success with our comprehensive question bank.

What is the last two digits of m when m = 10^n - 32?

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