Applications of Quadratic Equations

This section describes using quadratic equations to solve word problems involving numbers, geometrical figures, and motion. Read this section and work through the examples.

PROJECTILE MOTION

The height of a projectile shot upwards is modeled by a quadratic equation. The initial velocity, $v_{0}$ , propels the object up until gravity causes the object to fall back down.

PROJECTILE MOTION

The height in feet, $h$ , of an object shot upwards into the air with initial velocity, $v_{0}$ , after $t$ seconds is given by the formula:

$h=-16 t^{2}+v_{0} t$

We can use the formula for projectile motion to find how many seconds it will take for a firework to reach a specific height.

EXAMPLE 10.42

A firework is shot upwards with initial velocity 130 feet per second. How many seconds will it take to reach a height of 260 feet? Round to the nearest tenth of a second.

Step 1. Read the problem.
Step 2. Identify what we are looking for.	We are looking for the number of seconds, which is time.
Step 3. Name what we are looking for.	Let $t$ = the number of seconds.
Step 4. Translate into an equation.	Use the formula.
	$h=-16 t^{2}+v_{0} t$
Step 5. Solve the equation. We know the velocity $v_{0}$ 130 feet per second.
The height is 260 feet. Substitute the values.
This is a quadratic equation, rewrite it in standard form.
Solve the equation using the Quadratic Formula.
Identify the $a$ , $b$ , $c$ values.
Write the Quadratic Formula.
Then substitute in the values of $a$ , $b$ , $c$ .
Simplify.
Rewrite to show two solutions.
Approximate the answers with a calculator.	$t \approx 4.6$ seconds, $t \approx 36$
Step 6. Check the answer. The check is left to you.
Step 7. Answer the question.	The firework will go up and then fall back down. As the firework goes up, it will reach 260 feet after approximately 3.6 seconds. It will also pass that height on the way down at 4.6 seconds.

TRY 10.83

An arrow is shot from the ground into the air at an initial speed of 108 ft/sec. Use the formula $h=-16 t^{2}+v_{0} t$ to determine when the arrow will be 180 feet from the ground. Round the nearest tenth of a second.

TRY 10.84

A man throws a ball into the air with a velocity of 96 ft/sec. Use the formula $h=-16 t^{2}+v_{0} t$ to determine when the height of the ball will be 48 feet. Round to the nearest tenth of a second.