If -0-dx-1-cos-cos x-A-sin-B - 0 the values of A and B are

I=∫_0^αdx/1 cosαcos x=∫_0^αdx/cos^2x/2+sin^2x/2 cosα ( cos^2x/2 sin^2x/2 ) =∫_0^αdx/(1 cosα)cos^2x/2+(1+cosα)sin^2x/2=∫_0^αsec^2x/2dx/2sin^2α/2+2cos^2α/2tan^2x ...

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Byju's Answer

Standard XII

Mathematics

Integration of Trigonometric Functions

If ∫0αdx/1-co...

Question

If $\int_{0}^{α} \frac{d x}{1 - cos α cos x} = \frac{A}{sin α} + B (α \neq 0)$ the values of A and B are

$A = \frac{π}{2}, B = 0$ or $A = \frac{π}{4}, B = \frac{π}{4 s i n α}$

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$A = \frac{π}{4}, B = \frac{π}{s i n α}$

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$A = \frac{π}{6}, B = \frac{π}{s i n α}$

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$A = π, B = \frac{π}{s i n α}$

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Solution

The correct option is A
$A = \frac{π}{2}, B = 0$ or $A = \frac{π}{4}, B = \frac{π}{4 s i n α}$

$I = \int_{0}^{α} \frac{d x}{1 - cos α cos x} = \int_{0}^{α} \frac{d x}{c o s^{2} \frac{x}{2} + s i n^{2} \frac{x}{2} - c o s α (c o s^{2} \frac{x}{2} - s i n^{2} \frac{x}{2})} = \int_{0}^{α} \frac{d x}{(1 - c o s α) c o s^{2} \frac{x}{2} + (1 + c o s α) s i n^{2} \frac{x}{2}} = \int_{0}^{α} \frac{s e c^{2} \frac{x}{2} d x}{2 s i n^{2} \frac{α}{2} + 2 c o s^{2} \frac{α}{2} t a n^{2} \frac{x}{2}} = \frac{1}{2} \int_{0}^{α} \frac{s e c^{2} \frac{α}{2} s e c^{2} \frac{x}{2} d x}{t a n^{2} \frac{α}{2} + t a n^{2} \frac{x}{2}}$
Let $t a n \frac{x}{2} = t I = \int_{0}^{t a n α / 2} \frac{s e c^{2} \frac{α}{2} d t}{t^{2} + t a n^{2} \frac{α}{2}} = s e c^{2} \frac{α}{2} c o t \frac{α}{2} {[t a n^{- 1} (\frac{t}{t a n \frac{α}{2}})]}_{0}^{- 1} = \frac{2}{s i n α} . \frac{π}{4} = \frac{π}{2 s i n α} N o w \frac{A}{s i n α} + B = \frac{π}{2 s i n α} \Rightarrow A = \frac{π}{2}, B = 0 a l s o A = \frac{π}{4}, B = \frac{π}{4 s i n α}$

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