A rectangular prism has a volume of 171 m³. A rectangular pyramid has the same height as the rectangular prism and a base that i
s congruent to the base of the rectangular prism.
What is the relationship between the volume of the rectangular prism and the rectangular pyramid?
A. The volume of a rectangular pyramid is 3 times the volume of a rectangular prism. The volume of the rectangular pyramid is 513 m3.
B. The volume of a rectangular pyramid is 13 the volume of a rectangular prism. The volume of the rectangular pyramid is 57 m3.
C. The volume of a rectangular pyramid is 12 the volume of a rectangular prism. The volume of the rectangular pyramid is 85.5 m3.
D. The volume of a rectangular pyramid is 2 times the volume of a rectangular prism. The volume of the rectangular pyramid is 342 m3.
2 answers:
Answer:
that would be C sorry if im wrong i tried working it out
Step-by-step explanation:
Answer:
C
Step-by-step explanation:
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Constant is occurring continuously over a period of time so C is the correct answer because C is constant for a period of time
Answer:
3:8 i think
Step-by-step explanation:
there is no table to get our answers off of.
Step-by-step explanation:
Given:
Area of a triangle = (h*b) / 2
Area of smaller triangle = (4cm * 4cm) / 2 = 16cm² / 2 = 8 cm²
Area of larger triangle = (6cm * 10cm) / 2 = 60cm² / 2 = 30 cm²
30cm² - 8cm² = 22cm²
Probability that the point is inside the large triangle but outside the small triangle:
22cm² / 30cm² → 11/15 → 0.73 or 73%
Will start to distribute the 2 in (x-7)
so it can be (2x-2*7)=100
(2x-14)=100
2x=100+14
2x=114
x=114/2
x=57
