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20 February, 02:36

The digits 1, 2, 3, 4, 5, 6, and 7 are randomly arranged to form a? three-digit number.? (digits are not? repeated.) find the probability that the number is even and greater than 700.

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  1. 20 February, 03:19
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    Nice twist of similar questions.

    There are 7*6*5=210 possible 3-digit numbers formed by digits 1-7 without repetition.

    For numbers greater than 700, the first digit must be 7.

    Of the 30, the last digit must be a 2,4, or 6 to be an even number, that leaves 3 possibilities for the last digit.

    The middle digit can be any number of the remaining 5 digits.

    So the number of qualifying candidates would be

    1*5*3=15 (1 for the first digit, 5 choices for the second, and 3 choices for the last digit).

    Probability of randomly choosing a qualifying candidate (>700 & even) is therefore 15/210=1/14
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