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Prove the following identities, where the angles involved are acute angles for which the expressions are defined.(v) ( cos A–sin A+1)/( cos A +sin A–1) = cosec A + cot A, using the identity cosec2A = 1+cot2A .Q.5(5)

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Find the best way to solve the trigonometry question of ncert class 10  its very important question of exercise 8.4 . Please help me to solve the  exercise 8.4 question easily.Prove the following identities, where the angles involved are acute angles for which the expressions are defined.(v) ( cos A–sin A+1)/( cos A +sin A–1) = cosec A + cot A, using the identity cosec2A = 1+cot2A .

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  1. (cos A–sin A+1)/(cos A+sin A–1) = cosec A + cot A, using the identity cosec2A = 1+cot2A.

    With the help of identity function, cosec2A = 1+cot2A, let us prove the above equation.

    L.H.S. = (cos A–sin A+1)/(cos A+sin A–1)

    Divide the numerator and denominator by sin A, we get

    = (cos A–sin A+1)/sin A/(cos A+sin A–1)/sin A

    We know that cos A/sin A = cot A and 1/sin A = cosec A

    = (cot A – 1 + cosec A)/(cot A+ 1 – cosec A)

    = (cot A – cosec2A + cot2A + cosec A)/(cot A+ 1 – cosec A) (using cosec2A – cot2A = 1

    = [(cot A + cosec A) – (cosec2A – cot2A)]/(cot A+ 1 – cosec A)

    = [(cot A + cosec A) – (cosec A + cot A)(cosec A – cot A)]/(1 – cosec A + cot A)

    =  (cot A + cosec A)(1 – cosec A + cot A)/(1 – cosec A + cot A)

    =  cot A + cosec A = R.H.S.

    Therefore, (cos A–sin A+1)/(cos A+sin A–1) = cosec A + cot A

    Hence Proved

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