The surface area of a square pyramid can be calculated using the equation S=12lp+B. Rearrange the surface area equation for the quantity of interest B.
To rearrange the equation for the quantity of interest B, we need to isolate B on one side of the equation.
Given equation: S = 12lp + B
To isolate B, we can subtract 12lp from both sides of the equation:
S - 12lp = B
Therefore, rearranging the surface area equation for the quantity of interest B, we have:
B = S - 12lp
To rearrange the surface area equation for the quantity of interest B, we need to isolate B on one side of the equation.
Starting with the equation: S = 12lp + B
We can begin by subtracting 12lp from both sides of the equation:
S - 12lp = B
Therefore, the rearranged equation for B is B = S - 12lp.
To rearrange the surface area equation for the quantity of interest B, we need to isolate B on one side of the equation.
Given the equation: S = 12lp + B
Let's begin by subtracting 12lp from both sides of the equation to isolate B:
S - 12lp = B
So the rearranged surface area equation for the quantity of interest B is:
B = S - 12lp