Lesson 17: Applying the Quadratic Formula (Part 1)

Applying the Quadratic Formula (Part 1)

Student Summary

Quadratic equations that represent situations cannot always be neatly put into factored form or easily solved by finding square roots. Completing the square is a workable strategy, but for some equations, it may involve many cumbersome steps. Graphing is also a handy way to solve the equations, but it doesn’t always give us precise solutions.

With the quadratic formula, we can solve these equations more readily and precisely.

Here’s an example: Function $h$ models the height of an object, in meters, $t$ seconds after it is launched into the air. It is is defined by $h(t)=\text-5t^2+25t$ .

To know how much time it would take the object to reach 15 meters, we could solve the equation $15=\text-5t^2+25t$ . How should we do it?

Rewriting it in standard form gives $\text-5t^2+25t-15=0$ . The expression on the left side of the equation cannot be written in factored form, however.
Completing the square isn't convenient because the coefficient of the squared term is not a perfect square and the coefficient the linear term is an odd number.
Let’s use the quadratic formula, using $a=\text-5,b=25,\text{and }c=\text-15$ !

$\displaystyle \begin{aligned}\\t &=\dfrac{\text-b \pm \sqrt{b^2-4ac}}{2a}\\ t &=\dfrac{\text-25 \pm \sqrt{25^2-4(\text-5)(\text-15)}}{2(\text-5)}\\ t &=\dfrac{\text-25 \pm \sqrt{325}}{\text-10} \end{aligned}$

The expression $\frac{\text-25 \pm \sqrt{325}}{\text-10}$ represents the two exact solutions of the equation.

We can also get approximate solutions by using a calculator, or by reasoning that $\sqrt{325} \approx 18$ .

The solutions tell us that there are two times after the launch when the object is at a height of 15 meters: at about 0.7 second (as the object is going up) and 4.3 seconds (as it comes back down).