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1 November, 21:14

Two sides of an obtuse triangle measure 12 inches and 14 inches. The longest side measured 14 inches what is the gratest possible whole number length of the unknown side

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  1. 2 November, 00:22
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    26

    Step-by-step explanation:

    If the sides of a triangle are a, b, and c, the triangle inequality theorem tells us, about the sides possible to make up this NON-right triangle:

    a + b > c

    b + c > a and

    a + c > b

    Since we have 2 sides, we will call the third unknown side x. Let a = 12 and b = 14:

    12 + 14 > x

    14 + x > 12 and

    12 + x > 14.

    The first inequality, solved for x, is that x < 26.

    The second inequality, solved for x, is that x > - 2. We all know that the 2 things in math that will never EVER be negative are distance/length measures and time; therefore, we can safely disregard - 2 as a side length of this, or ANY, triangle.

    The third inequality, solved for x, is that x > 2.

    We now have the solutions for the side length possibilities:

    2 < x < 26

    From this inequality statement, we see that the longest the side could possibly be and still make a triangle with the other 2 side lengths given, is 26
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