Lesson 10: Similar Figures
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Transcript Lesson 10: Similar Figures
Surface Area
and Volume of
Similar Figures
Unit 5, Lesson 10
Mrs. King
Volume of Similar Figures
What we discovered:
If
the similarity ratio of two similar solids is
a:b, then
The ratio of corresponding surface areas is
a2:b2
The ratio of corresponding volumes is a3:b3
This
applies to all similar solids, not just
similar rectangular prisms.
Are the two solids similar? If so, give the similarity ratio.
Both solid figures have the same shape. Check that the ratios of the
corresponding dimensions are equal.
8
The ratio of the radii is 3 , and the ratio of the height is 26 .
9
The cones are not similar because 3 =/ 8 .
26
9
Example 1:
Find the similarity ratio of two similar cylinders with surface
areas of 98π ft2 and 2π ft2.
Use the ratio of the surface areas to find the similarity ratio.
a2 98
=
b2
2
=
49
1
a
7
=
b
1
Example 2
The surface are of two similar cylinders are 196 in2 and 324
in2. The volume of the smaller cylinder is 686in3. What is the
volume of the larger cylinder?
First, find the similarity ratio of the sides!
196
324
REDUCE!
49
81
Find the square root
7 is the similarity ratio of the sides
9
Example 2
The surface are of two similar cylinders are 196 in2 and 324
in2. The volume of the smaller cylinder is 686in3. What is the
volume of the larger cylinder?
Now,
create the similarity ratio of the sides into the
similarity ratio of the volumes
73 = 343
93 729
Now, set up a new proportion
686 = 343
x
729
x = 1458
Example 3:
surface area of two similar solids are 160 m2 and 250 m2.
The volume of the larger one is 250 m3. What is the volume
of the smaller one?
The
V
= 128 m3
Example:
Two similar square pyramids have volumes of 48 cm3 and
162 cm3. The surface area of the larger pyramid is 135 cm2.
Find the surface area of the smaller pyramid.
Step 1: Use the ratio of the volumes to find the similarity ratio.
a3
8
48
=
=
b3 162 27
a
=2
b
3
Step 2: Use the similarity ratio to find the surface area of the
smaller pyramid.
S = 22 = 4
135 32 9
S = 60
Example
A box of detergent shaped like a rectangular prism is 6 in. high and
holds 3.25 lb of detergent. How much detergent would a similar box
that is 8 in. tall hold? Round your answer to the nearest tenth.
The ratio of the heights is 6 : 8, or 3 : 4 in simplest terms.
Because the weights are proportional to the volumes, the ratio of
the weights equals 33 : 43, or 27 : 64.
27 3.25
=
64
x
27x = 208
x
7.7037037
The box that is 8 in. tall would hold about 7.7 lb of detergent.