Question

How do you factor completely `h^3-27h+10`?

Answer 1

`h^3-27h+10=(h-5)(h^2+5h-2)=(h-5)(h+5/2+sqrt33/2)(h+5/2-sqrt33/2)`

Explanation:

As the function is `h^3-27h+10`, one of the zeros could be factor of `10` i.e. `+-2` or `+-5`. As is seen `5` is a zero of the function as

`(5)^3-27(5)+10=125-135+10=0`

and hence `(h-5)` is a factor of `h^3-27h+10`

Dividing it by `(h-5)`, we get

`h^2(h-5)+5h(h-5)-2(h-5)=(h-5)(h^2+5h-2)`

As discriminant of `h^2+5h-2` is `5^2-4xx1xx(-2)=33`, which is not a perfect square and hence we can only have additional irrational factor.

`h^2+5h-2=(h^2+2xx5/2xxh+(5/2)^2)-(5/2)^2-2`

= `(h+5/2)^2-33/4=(h+5/2)^2-(sqrt33/2)^2`

= `(h+5/2+sqrt33/2)(h+5/2-sqrt33/2)`

Hence `h^3-27h+10=(h-5)(h+5/2+sqrt33/2)(h+5/2-sqrt33/2)`