homework 3: volume of composite figures
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directions: find the volume of each figure. round to the nearest hundredth when necessary.
1
0.5 ft
4 ft
1 ft
6 ft
2 ft
2
4 in.
4 in.
5 in.
5 in.
5 in.
3
4 m
6 m
2 m
8 m
4
4 ft
3 ft
10 ft
4 ft
5
6 in.
10 in.
6 in.
8 in.

Question

Accepted Answer

1.
# Explanation:
## Step1: Split the composite figure into two rectangular - prisms
The first rectangular - prism has dimensions $l_1 = 6$ ft, $w_1 = 2$ ft, $h_1 = 1$ ft. The second rectangular - prism has dimensions $l_2 = 4$ ft, $w_2 = 2$ ft, $h_2 = 1 - 0.5=0.5$ ft.
The volume of a rectangular - prism is $V = l\times w\times h$.
For the first prism: $V_1=l_1\times w_1\times h_1=6\times2\times1 = 12$ cubic feet.
For the second prism: $V_2=l_2\times w_2\times h_2=4\times2\times0.5 = 4$ cubic feet.
## Step2: Calculate the total volume
The total volume $V = V_1+V_2$.
$V=12 + 4=16$ cubic feet.
# Answer:
16 cubic feet

2.
# Explanation:
## Step1: Calculate the volume of the cube
The volume of a cube with side length $s = 5$ inches is $V_{cube}=s^3$.
$V_{cube}=5^3=125$ cubic inches.
## Step2: Calculate the volume of the cylinder
The volume of a cylinder is $V_{cylinder}=\pi r^2h$, where $r=\frac{4}{2}=2$ inches and $h = 4$ inches.
$V_{cylinder}=\pi\times2^2\times4=16\pi\approx16\times3.14 = 50.24$ cubic inches.
## Step3: Calculate the total volume
The total volume $V = V_{cube}+V_{cylinder}$.
$V=125 + 50.24=175.24$ cubic inches.
# Answer:
175.24 cubic inches

3.
# Explanation:
## Step1: Calculate the volume of the first cone
The volume of a cone is $V=\frac{1}{3}\pi r^2h$. For the first cone with $r_1 = 4$ m and $h_1 = 8$ m, $V_1=\frac{1}{3}\pi r_1^2h_1=\frac{1}{3}\pi\times4^2\times8=\frac{128\pi}{3}$ cubic meters.
## Step2: Calculate the volume of the second cone
For the second cone with $r_2 = 2$ m and $h_2 = 6$ m, $V_2=\frac{1}{3}\pi r_2^2h_2=\frac{1}{3}\pi\times2^2\times6 = 8\pi$ cubic meters.
## Step3: Calculate the total volume
The total volume $V = V_1+V_2$.
$V=\frac{128\pi}{3}+8\pi=\frac{128\pi + 24\pi}{3}=\frac{152\pi}{3}\approx\frac{152\times3.14}{3}\approx158.85$ cubic meters.
# Answer:
158.85 cubic meters

4.
# Explanation:
## Step1: Calculate the volume of the rectangular - prism
The volume of a rectangular - prism with $l = 10$ ft, $w = 4$ ft, $h = 3$ ft is $V_{prism}=l\times w\times h=10\times4\times3 = 120$ cubic feet.
## Step2: Calculate the volume of the triangular - prism
The base of the triangular - prism is a triangle with base $b = 10$ ft and height $h_{triangle}=4$ ft, and the length of the triangular - prism $l = 4$ ft. The area of the base triangle $A=\frac{1}{2}\times b\times h_{triangle}=\frac{1}{2}\times10\times4 = 20$ square feet. The volume of the triangular - prism $V_{triangular - prism}=A\times l=20\times4 = 80$ cubic feet.
## Step3: Calculate the total volume
The total volume $V = V_{prism}+V_{triangular - prism}$.
$V=120+80 = 200$ cubic feet.
# Answer:
200 cubic feet

5.
# Explanation:
## Step1: Calculate the volume of the rectangular - prism
The volume of a rectangular - prism with $l = 8$ in, $w = 6$ in, $h = 10$ in is $V_{prism}=l\times w\times h=8\times6\times10 = 480$ cubic inches.
## Step2: Calculate the volume of the triangular - prism
The base of the triangular - prism is a triangle with base $b = 8$ in and height $h_{triangle}=6$ in, and the length of the triangular - prism $l = 6$ in. The area of the base triangle $A=\frac{1}{2}\times b\times h_{triangle}=\frac{1}{2}\times8\times6 = 24$ square inches. The volume of the triangular - prism $V_{triangular - prism}=A\times l=24\times6 = 144$ cubic inches.
## Step3: Calculate the total volume
The total volume $V = V_{prism}+V_{triangular - prism}$.
$V=480+144 = 624$ cubic inches.
# Answer:
624 cubic inches

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QUESTION IMAGE

Question

Explanation:

Step1: Split the composite figure into two rectangular - prisms

Step2: Calculate the total volume

Step1: Calculate the volume of the cube

Step2: Calculate the volume of the cylinder

Step3: Calculate the total volume

Step1: Calculate the volume of the first cone

Step2: Calculate the volume of the second cone

Step3: Calculate the total volume

Answer: