Question

Integrate the following with respect to x.

`1/(9 - 8x - x^2)`

Answer 1

`int 1/(9 - 8x - x^2)  "d"x`

Consider `9 - 8x - x^2 = 3x^2 - (x^2 + 8x)`

= `9 - [(x + 4)^2 - 16]`

= `9 + 16 - (x + 4)^2`

= `25 - (x + 4)^2`

= `5^2 - (x + 4)^2`

So integral becomes

`int ("d"x)/(5^2 - (x + 4)^2) = 1/10 log|(5 + x + 4)/(5 - x - 4)| + "c"`

= `1/10 log|(9 + x)/(1 - x)| + "c"`