The formula for finding the volume of a square prism is $s^{2} h$, where $s$ is the length of each sid of the square base and $h$ is the height of the prism. Evaluate to find the volume given values of $s=4$ and $h=6$. (1 point)
144 cubic centimeters
96 cubic centimeters
48 cubic centimeters
-576 cubic centimeters
Evaluate algebraic expressions quick check
To find the volume, we substitute the values of $s$ and $h$ into the formula $s^2h$.
Substituting $s=4$ and $h=6$, we get $4^2\times6=16\times6=96$.
Therefore, the volume is 96 cubic centimeters.
The correct answer is 96 cubic centimeters.
To find the volume of a square prism using the given formula, we substitute the values of $s=4$ and $h=6$ into the formula $s^{2} h$.
Plugging in the values, we get:
Volume = $4^{2} \times 6$
Simplifying, we have:
Volume = $16 \times 6$
Volume = 96 cubic centimeters
Therefore, the correct answer is 96 cubic centimeters.
To find the volume of a square prism using the given formula, we need to substitute the values of $s$ and $h$ into the formula $s^2 h$.
Given: $s=4$ and $h=6$
Substituting these values into the formula we get:
Volume = $4^2 \times 6$
Simplifying the expression inside the parentheses:
Volume = $16 \times 6$
Multiply the values:
Volume = 96 cubic centimeters
Therefore, the answer is 96 cubic centimeters.