Question

How do you find the domain of `h( x ) = \sqrt { x ^ { 2} - 7x - 8}`?

Answer 1

See explanation.

Explanation:

The given function has an expression under square root sign. A square root can only be calculated if the value under square root sign is positive or zero.

So to calculate the domain we have to solve the inequality:

`x^2-7x-8>=0`

`Delta = (-7)^2-4*1*(-8)`

`Delta = 49+32=81`

`sqrt(Delta)=9`

`x_1=(7-9)/2=-1`

`x_2=(7+9)/2=8`

graph{x^2-7x-8 [-5, 10, -40, 40]}

Fromm the graph we see that the function's value is positive for

`x in (-oo;-1> uu <8;+oo)`

So the above interval is the domain of `f(x)`