Question

Function f and g are defined by f(x) = `sqrt((x^2-2x))` and g(x) = 3x +4. The composite function is undefined for x ∈ ]a;b[ . Find the value of a and b?

Answer 1

The values of `a=-4/3` and `b=-2/3`

Explanation:

The functions are

`f(x)=sqrt(x^2-2x)`

`g(x)=3x+4`

The composite function is

`f(g(x))=f(3x+4)`

`=sqrt((3x+4)^2-2(3x+4))`

`=sqrt(9x^2+24x+16-6x-8)`

`=sqrt(9x^2+18x+8)`

The domain is

`9x^2+18x+8>=0`

Therefore,

The solution to this quadratic equation is

`x=(-18+-sqrt(18^2-4*9*8))/(18)`

`=(-18+-sqrt(18^2-4*9*8))/(18)`

`=(-18+-sqrt36)/18`

`=(-18+-6)/18`

Therefore,

the composite function is undefined for

`(-24/18, -12/18)`

`=(-4/3, -2/3)`

graph{sqrt(9x^2+18x+8) [-9.227, 1.873, -2.24, 3.31]}