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7 September, 05:20

Determine the number of possible solutions for a triangle with A = 30 a=20 and b=16

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  1. 7 September, 05:32
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    The answer is: Two possible solutions which are (0.53, 37.19)

    Explanation:

    Given:

    A = 30°

    a = 20

    b = 16

    Now use the law of Cosines:

    a² = b² + c² - 2bc*cos (A)

    Plug in the values:

    20² = 16² + c² - (2 * (16) * c*cos (30))

    400 = 256 + c² - 32c (0.866)

    400 = 256 + c² - 27.71c

    c² - 27.71c = 400 - 256

    c² - 27.71c = 144

    c² - 27.71c + 191.96 = 144 + 191.96

    (c - 18.86) ² = 335.96

    c - 18.86 = √336.95

    c - 18.86 = ± 18.33

    c = 18.86 ± 18.33

    If c = 18.86 + 18.33, then c = 37.19

    If c = 18.86 - 18.33, then c = 0.53

    c = (0.53, 37.19) Two solutions!
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