Find the integral of the given function w-r-t x y-sin 8 x-xA- -cos 8 x-8-x2-2-cB- 8 cos 8 x-8-1-ccos 8 x-8-x2-2-cD- cos 8 x-8-1-c

The correct option is A ∫ (sin(8x)+x)dx=∫ sin(8x)dx +∫ (x)dx 8x = t 8dx = dt dx = dt/8 ⇒∫sin t dt/8+x^2/2+c_1 (∵∫ x^n dx=x^n+1/n+1)+c ⇒ cos t/8+c_o+x^2/2+ ...

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Byju's Answer

Standard XII

Physics

Antiderivative

Find the inte...

Question

Find the integral of the given function w.r.t x

$y = s i n (8 x) + x$

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Solution

The correct option is A

$\int (s i n (8 x) + x) d x = \int s i n (8 x) d x + \int (x) d x$

8x = t

8dx = dt

dx = $\frac{d t}{8}$

$\Rightarrow \int \frac{s i n t d t}{8} + \frac{x^{2}}{2} + c_{1}$ $(∵ \int x^{n} d x = \frac{x^{n + 1}}{n + 1}) + c$

$\Rightarrow - \frac{c o s t}{8} + c_{o} + \frac{x^{2}}{2} + c$ $(∵ \int s i n t d t = - c o s t)$

$- \frac{c o s 8 x}{8} + \frac{x^{2}}{2} + c$ $(c = c_{0} + c_{1})$

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Find the integral of the given function w.r.t x y=sin(8x)+x

The correct option is A ∫(sin(8x)+x)dx=∫sin(8x)dx+∫(x)dx 8x = t 8dx = dt dx = dt8 ⇒∫sin t dt8+x22+c1 (∵∫xndx=xn+1n+1)+c ⇒−cos t8+co+x22+c (∵∫sin t dt=−cos t) −cos 8x8+x22+c (c=c0+c1)

Find the integral of the given function w.r.t x

$y = s i n (8 x) + x$