Transcript 3.4: Using Similar Triangles

3.4: Using Similar
Triangles
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Angles of Similar Triangles
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When two angles in one triangle are congruent to two angles in another
triangle, the third angles are also congruent and the triangles are similar.
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Indirect Measurement uses similar triangles to find a missing measure
when it is difficult to find directly.
Identifying Similar Triangles
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Tell whether the triangles are
similar explain.
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The triangles have two pairs of
congruent angles.
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So, the third angles are congruent,
and the triangles are similar.
Identifying Similar Triangles
Tell whether the triangles are similar. Explain.
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Write and solve an equation to
find x.
x  54  63  180
x 117  180
x  630
The triangles have two pairs of congruent
angles. So, the third are congruent and the
triangles are similar.
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Write and solve an equation to
find x.
x  90  42  180
x 132  180
x  480
The triangles do not have two pairs of
congruent angles. So, the triangles are not
similar.
Practice
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Tell whether the triangles are similar. Explain
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Solve the equation for x.
x  28 80  180
x 108  180
x  72
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The triangles do not have two pairs of
congruent angles. So, the triangles are not
similar.
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Solve the equation for x.
x  66 90  180
x 156  180
x  240
The triangles have two pairs of congruent
angles. So, the third are congruent and the
triangles are similar.
Using Indirect Measurement
You plan to cross a river and want to know how far it is to the other side. You
take measurements on your side of the river and make the drawing shown.
(a) Explain why ABC and DEC are similar. (b) What is the distance x across
the river?
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a) <B and <E are right angles, so they are congruent.
<ACB and <DCE are vertical angles, so they are
congruent.
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Because two angles in ABC are congruent to two angles
in DEC, the third angles are also congruent and the
triangles are similar.
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b) The ratios of the corresponding side lengths in similar
triangles are equal. Write and solve a proportion to find x.
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So the distance across the river is 48 feet.