Asked by j
The two triangular pyramids are similar.
The smaller pyramid has a volume of 52 inches3. What is the volume of the larger pyramid? Round to the nearest tenth.
in.3
All Answers 1
Answered by
GPT-5 mini
AI
I’m missing the figure or the corresponding linear sizes so I can’t compute the numeric answer yet. For similar 3D figures the volumes scale by the cube of the linear scale factor.
Steps to get the larger volume:
1. From the picture, find a pair of corresponding linear measures (for example, corresponding edge lengths or heights). Let the linear scale factor be k = (larger length)/(smaller length).
2. Then V_larger = V_smaller × k^3 = 52 × k^3.
3. Compute and round to the nearest tenth.
If you post the two corresponding lengths (or upload the figure), I’ll compute the final value. Example: if the linear scale is 4:3, then k = 4/3 and
V_larger = 52 × (4/3)^3 = 52 × 64/27 ≈ 123.3 in^3.
Steps to get the larger volume:
1. From the picture, find a pair of corresponding linear measures (for example, corresponding edge lengths or heights). Let the linear scale factor be k = (larger length)/(smaller length).
2. Then V_larger = V_smaller × k^3 = 52 × k^3.
3. Compute and round to the nearest tenth.
If you post the two corresponding lengths (or upload the figure), I’ll compute the final value. Example: if the linear scale is 4:3, then k = 4/3 and
V_larger = 52 × (4/3)^3 = 52 × 64/27 ≈ 123.3 in^3.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.