Explanation Given information: The integral function is ∫ x sin 2 x cos x d x . Calculation: Show the integral function as follows: ∫ x sin 2 x cos x d x (1) Consider u = x (2) Partially differentiate both sides of the equation (2). d u d x = 1 d u = d x Consider d v = sin 2 x cos x d x (3) Integrate both sides of Equation (3). ∫ d v = ∫ sin 2 x cos x d x [ ∵ ∫ sin 2 x cos x d x = sin 3 x 3 ] v = 1 3 sin 3 x (4) Apply the ‘formula for integration by parts’: ∫ u d v = u v − ∫ v d u (5) Substitute x for u, sin 2 x cos x d x for dv , 1 3 sin 3 x for v and d x for du in Equation (5). ∫ x sin 2 x cos x d x = ( x ) ( 1 3 sin 3 x ) − ∫ 1 3 sin 3 x d x = 1 3 x sin 3 x − 1 3 ∫ sin 3 x d x = 1 3 x sin 3 x − 1 3 ∫ sin 2 sin x d x { ∵ sin 2 x = 1 − cos 2 x } = 1 3 x sin 3 x − 1 3 ∫ ( 1 − cos 2 x ) sin x d x (6) Take the integral function of 1 3 ∫ ( 1 − cos 2 x ) sin x d x from Equation (6) Let us consider I = 1 3 ∫ ( 1 − cos 2 x ) sin x d x (7) Consider t = cos x (8) Partially differentiate both sides of the equation (8)

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Chapter 7.5, Problem 79E

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To evaluate: The integral function ∫xsin2xcosx dx

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Chapter 7.5, Problem 78E

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The integral function ∫ x sin 2 x cos x d x

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