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28 January, 21:29

tan inverse cos x/1-sin x

write in simplest form? ... ?

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  1. 28 January, 22:11
    0
    Tan [arccos (x) ] / [1 - sin (x) ]

    1) First work the numerator, which is the confussing part

    x = cos (y) = > arccos (x) = y

    tan [arccos (x) ] = tan (y) = sin (y) / cos (y)

    using the fundamental identity

    [cos (y) ] ^2 + [sin (y) }^2 = 1 = > sin (y) = √ (1 - [cos (y) ]^2) = √ (1 - x^2)

    => tan (y) = sin (y) / cos (y) = √ (1-x^2) / x ... this is the numerator

    2) write the complete fraction using the numerator just found

    [√ (1 - x^2) / x] / (1 - sin (x)) = √ (1 - x^2) / [x (1 - sin (x) ]

    Answer: √ (1 - x^2) / [x (1 - sin (x) ]
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