Find the derivative of the function. g(x) = ∫5 x 4 x u2 − 1u2 +1 dug'(x) = g

Question

asked Nov 12, 2021 55.2k views

1 Answer

LostJon · Answer 1 · 2021-11-17T20:04:45+0000

Answer:

$\mathbf{g'(x) = 5 * ((25x^2-1))/((25x^2+1))- 4 * ((16x^2-1))/((16x^2+1))}$

Explanation:

The question can be better structured and represented as :

$g(x) = \int ^(5x)_(4x) (u^2-1)/(u^2+1) \ du$

now the derivative of the function of g(x) is g'(x) which is equal to:

g'(x) = ((5x)^2-1)/((5x)^2 +1 )(d)/(dx)(5x) - ((4x)^2-1)/((4x)^2 +1 )(d)/(dx)(4x)

$\mathbf{g'(x) = 5 * ((25x^2-1))/((25x^2+1))- 4 * ((16x^2-1))/((16x^2+1))}$