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27 January, 16:23

Find sin θ if cot θ = - 4 and cos θ < 0.

A) - 17

B) sqrt 17 / 17

C) - 1/4

D) sqrt 17 / 4

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Answers (1)
  1. 27 January, 16:42
    0
    The correct option is B

    Step-by-step explanation:

    The correct option is B.

    Solution:

    We have given that

    cot θ = - 4

    cos θ < 0

    This shows that both the ratios are negative. So they lie in second quadrant because both are negative.

    cot θ = - 4 it means that tan θ = - 1/4 which shows that two sides opposite = 1 and adjacent = - 4

    Now we could find hypotenuse by Pythagorean theorem:

    Hypotenuse = √ (1) ² + (-4) ² = √1+16

    =√17

    Sin θ = perpendicular (opposite) / hypotenuse

    Sin θ = 1/√17

    Now multiply and divide by √17

    Sin θ = 1/√17*√17/√17

    Sin θ = √17/17

    Thus the correct option is B ...
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