A question asks: Find d/dx(x sin2x) and hence find 0∫π/4 x cos2x dx.
Heres my working out
Let f(x) = x sin 2x
f'(x0 = sin2x + 2xcos2x
0∫π/4 (x cos2x) dx
= 1/2 0∫π/4 (2x cos 2x) dx
= 1/2 0∫π/4 (f'(x) - sin2x) dx
= 1/2 [sin 2x + cos2x / 2]sub]0[/sub]π/4
= 1/2 [1 + 0 - 0 - (1/2)
= 1/2 * 1/2
= 1/4
But that is not correct. I have no actual idea how to do this question, i just took a guess.
Could anybody lend a hand? Thanks.
WOOPS sorry, working out error. Ive got it now..
Heres my working out
Let f(x) = x sin 2x
f'(x0 = sin2x + 2xcos2x
0∫π/4 (x cos2x) dx
= 1/2 0∫π/4 (2x cos 2x) dx
= 1/2 0∫π/4 (f'(x) - sin2x) dx
= 1/2 [sin 2x + cos2x / 2]sub]0[/sub]π/4
= 1/2 [1 + 0 - 0 - (1/2)
= 1/2 * 1/2
= 1/4
But that is not correct. I have no actual idea how to do this question, i just took a guess.
Could anybody lend a hand? Thanks.
WOOPS sorry, working out error. Ive got it now..
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