Sometimes you have a formula and you
need to solve for some variable other than
the "standard" one.
Example: Perimeter of a square
P=4s
It may be that you need to solve this
equation for s, so you can plug in a
perimeter and figure out the side length.
So "solving literal equations" may just be
another way of saying "taking an equation
with lots of variables, and solving for one
variable in particular.”
To solve literal equations, you do what
you've done all along to solve equations,
except that, due to all the variables, you
won't necessarily be able to simplify your
answers as much as you're used to doing.
Here's how "solving literal equations" works:
Suppose you wanted to take the formula for
the perimeter of a square and solve it for ‘s’
(or the side length) instead of using it to
solve for perimeter.
P=4s
How can you get the ‘s’ on a side by itself?
This new formula allows us to use the perimeter
formula to find the length of the sides of a square if
we know the perimeter.
Let’s look at another example: Solve for c, d, and Q
As you can see, we sometimes must do
more that one step in order to isolate the
targeted variable.
You just need to follow the same steps that
you would use to solve any other ‘Multi-Step
Equation’.
Work these on your paper.
1. d = rt for ‘r’
2. P = 2l +2w for ‘w’
3.
for ‘t’
Check your answers.
1. d = rt for ‘r’
2. P = 2l +2w for ‘w’
3.
for ‘t’