Learning Outcomes
- Solve a formula or equation for a specific variable using the properties of equality
In this chapter, you became familiar with some formulas used in geometry. Formulas are also very useful in the sciences and social sciences—fields such as chemistry, physics, biology, psychology, sociology, and criminal justice. Healthcare workers use formulas, too, even for something as routine as dispensing medicine. The widely used spreadsheet program Microsoft ExcelTM relies on formulas to do its calculations. Many teachers use spreadsheets to apply formulas to compute student grades. It is important to be familiar with formulas and be able to manipulate them easily.
In some examples, we used the formula [latex]d=rt[/latex]. This formula gives the value of [latex]d[/latex] when you substitute in the values of [latex]r[/latex] and [latex]t[/latex]. But in another example, we had to find the value of [latex]t[/latex]. We substituted in values of [latex]d[/latex] and [latex]r[/latex] and then used algebra to solve for [latex]t[/latex]. If you had to do this often, you might wonder why there isn’t a formula that gives the value of [latex]t[/latex] when you substitute in the values of [latex]d[/latex] and [latex]r[/latex]. We can get a formula like this by solving the formula [latex]d=rt[/latex] for [latex]t[/latex].
Let’s try a few examples, starting with the distance, rate, and time formula we used above.
example
Solve the formula [latex]d=rt[/latex] for [latex]t\text{:}[/latex]
- When [latex]d=520[/latex] and [latex]r=65[/latex]
- In general.
Solution:
We’ll write the solutions side-by-side so you can see that solving a formula in general uses the same steps as when we have numbers to substitute.
1. When [latex]d = 520[/latex] and [latex]r = 65[/latex] | 2. In general | |
Write the formula. | [latex]d=rt[/latex] | [latex]d=rt[/latex] |
Substitute any given values. | [latex]520=65t[/latex] | |
Divide to isolate t. | [latex]{\Large\frac{520}{65}}={\Large\frac{65t}{65}}[/latex] | [latex]{\Large\frac{d}{r}}={\Large\frac{rt}{r}}[/latex] |
Simplify. | [latex]8=t[/latex]
[latex]t=8[/latex] |
[latex]{\Large\frac{d}{r}}=t[/latex]
[latex]t={\Large\frac{d}{r}}[/latex] |
We say the formula [latex]t={\Large\frac{d}{r}}[/latex] is solved for [latex]t[/latex]. We can use this version of the formula any time we are given the distance and rate and need to find the time.
Try it
We used the formula [latex]A=\Large\frac{1}{2}\normalsize bh[/latex] to find the area of a triangle when we were given the base and height. In the next example, we will solve this formula for the height.
example
The formula for area of a triangle is [latex]A=\Large\frac{1}{2}\normalsize bh[/latex]. Solve this formula for [latex]h\text{:}[/latex]
- When [latex]A=90[/latex] and [latex]b=15[/latex]
- In general
try it
Previously, we used the formula [latex]I=Prt[/latex] to calculate simple interest, where [latex]I[/latex] is interest, [latex]P[/latex] is principal, [latex]r[/latex] is rate as a decimal, and [latex]t[/latex] is time in years.
example
Solve the formula [latex]I=Prt[/latex] to find the principal, [latex]P\text{:}[/latex]
- When [latex]I=\text{\$5,600},r=\text{4%},t=7\text{years}[/latex]
- In general
try it
Watch the following video to see another example of how to solve an equation for a specific variable.
Later in this class, and in future algebra classes, you’ll encounter equations that relate two variables, usually [latex]x[/latex] and [latex]y[/latex]. You might be given an equation that is solved for [latex]y[/latex] and you need to solve it for [latex]x[/latex], or vice versa. In the following example, we’re given an equation with both [latex]x[/latex] and [latex]y[/latex] on the same side and we’ll solve it for [latex]y[/latex]. To do this, we will follow the same steps that we used to solve a formula for a specific variable.
example
Solve the formula [latex]3x+2y=18[/latex] for [latex]y\text{:}[/latex]
- When [latex]x=4[/latex]
- In general
try it
In the previous examples, we used the numbers in part (a) as a guide to solving in general in part (b). Do you think you’re ready to solve a formula in general without using numbers as a guide?
example
Solve the formula [latex]P=a+b+c[/latex] for [latex]a[/latex].
try it
example
Solve the equation [latex]3x+y=10[/latex] for [latex]y[/latex].
try it
example
Solve the equation [latex]6x+5y=13[/latex] for [latex]y[/latex].
try it
In the following video we show another example of how to solve an equation for a specific variable.
Candela Citations
- Find the Base of a Triangle Given Area / Literal Equation. Authored by: James Sousa (Mathispower4u.com). Located at: https://youtu.be/VQZQvJ3rXYg. License: CC BY: Attribution
- Literal Equations: Solve ax-by=c for y. Authored by: James Sousa (Mathispower4u.com). Located at: https://youtu.be/dG0_i8lN2y0. License: CC BY: Attribution
- Question ID 142912, 142894, 142892, 145640, 142895, 145635. Authored by: Lumen Learning. License: CC BY: Attribution. License Terms: IMathAS Community License, CC-BY + GPL
- Question ID 142895. Authored by: Sousa James. License: CC BY: Attribution. License Terms: IMathAS Community License, CC-BY + GPL
- Prealgebra. Provided by: OpenStax. License: CC BY: Attribution. License Terms: Download for free at http://cnx.org/contents/caa57dab-41c7-455e-bd6f-f443cda5519c@9.757