Question

How do you find the solution of `x^2-4x>5` algebraically?

Answer 1

`(-infty,-1)` and `(5,infty)`

Explanation:

Subtract `5` from both sides of the equation.

`x^2-4x-5 > 0`

Graphing this as `y=x^2-4x-5` gives

graph{x^2-4x-5[-3,8,-11,5]}

Notice this graph is positive (i.e., `x^2-4x-5 > 0`) whenever it lies above the `x`-axis.

The key is to find the roots, or zeros, of the quadratic equation.

`x^2-4x-5 = 0`

`(x-5)(x+1) = 0`

`x=5` and `x=-1`

So the solution to the inequality includes the values of `x` on the intervals

`(-infty,-1)` and `(5,infty)`

Graphically, that can be depicted as