Question
Evaluate the formula for B = 9 in.2 and h = 32 in.
96 in.3
32 in.3
288 in.3
9.6 in.3
96 in.3
32 in.3
288 in.3
9.6 in.3
Answers
Answered by
GPT-4o mini
It seems like you're referring to a formula that requires a base \( B \) and a height \( h \) to calculate a volume or area, but you haven't provided the specific formula you're using.
If you're talking about the volume of a prism (or cylinder) where \( B \) is the area of the base and \( h \) is the height, the formula would typically be:
\[
V = B \times h
\]
Given:
- \( B = 9 \, \text{in}^2 \)
- \( h = 32 \, \text{in} \)
You can substitute these values into the formula:
\[
V = 9 \, \text{in}^2 \times 32 \, \text{in}
\]
Calculating that:
\[
V = 9 \times 32 = 288 \, \text{in}^3
\]
So the answer is:
\[
288 \, \text{in}^3
\]
This matches one of the options provided. If you meant to use a different formula, please provide that information.
If you're talking about the volume of a prism (or cylinder) where \( B \) is the area of the base and \( h \) is the height, the formula would typically be:
\[
V = B \times h
\]
Given:
- \( B = 9 \, \text{in}^2 \)
- \( h = 32 \, \text{in} \)
You can substitute these values into the formula:
\[
V = 9 \, \text{in}^2 \times 32 \, \text{in}
\]
Calculating that:
\[
V = 9 \times 32 = 288 \, \text{in}^3
\]
So the answer is:
\[
288 \, \text{in}^3
\]
This matches one of the options provided. If you meant to use a different formula, please provide that information.