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18 March, 18:22

Compute the permutations and combinations.

How many three-digit numbers greater than 200 can be formed from the digits 1, 2, 6, 7, and 9, if the digits can be repeated?

I need you to show your work,

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  1. 18 March, 20:33
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    100 numbers

    Step-by-step explanation:

    We only want three-digit numbers, so let's provide three spaces:

    __ __ __

    The first number can be 2, 6, 7, or 9; it can't be 1 because then we're going to have a number in the 100s, which will be less than 200 (and that's not allowed). So, there are 4 ways to choose the first number.

    The second number, though, can be any of the 5 numbers because once we've established the first number, the second digit is anything. So there are 5 ways to choose this one.

    Finally, there are also 5 digits to choose from for the last digit because we can reuse digits.

    Multiply these together:

    4 * 5 * 5 = 100

    There are 100 three-digit numbers greater than 200 that can be formed with the given digits.
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