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2 August, 02:03

Find 3 consecutive integers such that the product of the middle and largest integers is five more then the smallest integer squared

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  1. 2 August, 02:30
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    Only option: 1,2,3

    Step-by-step explanation:

    3 consecutive integers:

    n-1, n, n+1

    Why does it work? They should be consecutive for any integer n.

    Example with n=5:

    4, 5, 6

    These are consecutive integers because they happen right after each other in the list of integers.

    Integers { ..., - 5,-4,-3,-2,-1,0,1,2,3,4,5, ... }

    We are given the product of the middle and largest is 5 more than the smallest integer squared.

    In other words, the product of n and (n+1) is 5 more than (n-1) ^2.

    As an equation that is: n (n+1) = 5 + (n-1) ^2.

    Let's write it more together:

    n (n+1) = 5 + (n-1) ^2

    Distribute:

    n^2+n=5+n^2-2n+1 (Used (x-y) ^2=x^2-2xy+y^2)

    Combine like terms on either side:

    n^2+n=n^2-2n+6

    Get everything on one side so one side is 0.

    Subtract n^2 on both sides:

    n=-2n+6

    Add 2n on both sides:

    3n=6

    Divide both sides by 3:

    n=2

    So if n=2,

    then n-1=1

    and n+1=3.

    So we have one option (1,2,3).

    3 (2) = 5 + (1) ^2

    6=5+1

    6=6 is true so (1,2,3) is an option.
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