literal equation
A literal equation is an equation that contains two or more variables
A literal equation is an equation that contains two or more variables. The goal in solving a literal equation is to isolate one variable in terms of the others. This allows us to find a specific value for a variable in terms of the remaining variables.
Here’s an example to illustrate the concept of solving a literal equation:
Let’s say we have the equation: P = 2L + 2W
This equation represents the perimeter (P) of a rectangle, given its length (L) and width (W). Our goal is to solve for L in terms of P and W.
To isolate L, we can start by subtracting 2W from both sides of the equation:
P – 2W = 2L
Next, we divide both sides of the equation by 2:
(P – 2W) / 2 = L
Finally, we can simplify further:
L = (P – 2W) / 2
Now we have successfully solved the literal equation for L. This means that if we know the values of P and W, we can substitute them into this equation to find the corresponding length of a rectangle.
It’s important to note that literal equations can be solved for any variable, depending on what needs to be known or solved for in a given situation. The steps for solving a literal equation remain the same: isolate the desired variable by performing inverse operations on both sides of the equation.
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