Question

Take the integral of (A/x)+(B/x^2)+(C/x^3)+(D/(x+1)^2)+(E/(x+1)^2)+(F/(x^2+8))

Answer 1

might i suggest using wolfram integrator

Answer 2

it didn't show me anything, can u help me

Answer 3

you have to do it one a t a time
first take the integral of A/x
which is like A ln x
then you do B /x^2

then C/x^3

etc etc etc

this is assuming that ABCDEF are all constants and not an actual function

Answer 4

do you not know the full thing?

Answer 5

im lazy, i dont want to integrate
A, B, and C are easy

F you need to use trig substitution
D and E look the same and you need to do a x+1=u substitution

Answer 6

A/x = A ln(x)?

Answer 7

Aln |x|

thats something you should memorize

Answer 8

\[\int\limits_{}^{}\frac{1}{x}dx= \ln |x|\]

Answer 9

i don't even know what B would be since there is a ^2

Answer 10

\[\frac{1}{x^2} = x^{-2}\]

Answer 11

same thing goes for ^3

Answer 12

@jim_thompson5910 @lgbasallote
i want to sleep, please finish up

Answer 13

^what he said