Question

How do you find domain and range for `f(x) = (x^2) - 2x - 15`?

Answer 1

This is an equation of a parabola that opens upward and will have a minimum value for y at the vertex.

Explanation:

Since this is a parabola opening upward, the domain is all real values for x: `(-oo,oo)`

The general formula for a parabola is:

`f(x)=ax^2+bx+c`

Now, find the vertex using this formula for the x-coordinate:

`x=-b/(2a)` = `-(-2)/(2*1)` = `1`

Finally, we can find the lower limit for y by inserting the x-coordinate of the vertex into the original equation:

`f(1)=(1^2)-(2)(1)-15=-16`

So, the range is `[-16, oo)`

Here is a graph of the parabola:

hope that helped