∫(8 x^3+(1)/(2 x^2)) d x=2 x^4-(1)/(2 x)+C

Name: ∫(8 x^3+(1)/(2 x^2)) d x=2 x^4-(1)/(2 x)+C
Uploaded: 2024-11-02T06:16:06-08:00
Duration: 1 min 22 s
Channel: Numerade
Description: ∫(8 x^3+(1)/(2 x^2)) d x=2 x^4-(1)/(2 x)+C

Question

Madhur L · Answer

Hi, now we are going to solve the integral. The given question is integral x squared long 3x int

Kumareshwaran Rathinasabapathy · Answer

Let&#x27;s evaluate this integral. We have the expression 8 tangent power 4x, second power 6x dx. So

Madhur L · Answer

Hi, from the question given that here we need to find the indefinite integral and check the resu

Sri K · Answer

1 f x g x equal to 2x plus 5 into 3 x minus 1 equal to 6x 2x minus 5 which is equal to 6x square

Nicole Hoffman · Answer

So I&#x27;m going to find the antiderivative, the integral of this problem. So I have multiplication,

Question

\( \int\left(8 x^{3}+\frac{1}{2 x^{2}}\right) d x=2 x^{4}-\frac{1}{2 x}+C \)

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