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14 April, 02:41

Given that sinx=3/5 and x is in quadrant 3, what is the value of tan x/2?

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  1. 14 April, 03:06
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    sin (x) = - 3/5

    x = arcsin (-3/5)

    tan (x/2) = y - - - {Where y is the final answer}

    x = 2arctan (y)

    Therefore:

    arcsin (-3/5) = 2arctan (y)

    -3/5 = sin (2arctan (y)) - - - {sin (2x) = 2sin (x) cos (x) }

    -3/5 = 2sin (arctan (y)) cos (arctan (y))

    -3/10 = sin (arctan (y)) cos (arctan (y))

    Construct a triangle on the page. Tan is Opposite / Adjacent, so on the opposite side, you have y, and on the adjacent side, you have 1. By pythagorean theorem, the hypotenuse is sqrt (1 + y²). The sin of this triangle is y / sqrt (1 + y²). The cos is 1 / sqrt (1 + y²)

    -3/10 = [y / sqrt (1 + y²) ][1 / sqrt (1 + y²) ]

    -3/10 = y / (1 + y²)

    (3/10) y² + y + 3/10 = 0

    y = - 1/3 or - 3

    If you want to check with a calculator, you will know that - 3 is inadmissible. Therefore, - (1/3) is your answer.
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