Given to solve the equation $x^2-2x-24=0$ by graphing. And if the exact roots cannot be found, the consecutive integers between which the roots are located are to be determined.

A quadratic equation has a real solution where the graph of the related function crosses or touches the x-axis.

Graphing the given equation using graphing calculator:

From the given graph, the function crosses the x axis at -4 and 6.

Hence the solutions to the equation $x^2-2x-24=0$ are $x=-4, 6$.

Therefore, the solutions to the equation $x^2-2x-24=0$ are $x=-4, 6$