28
D. N. A. 1) Are the following triangles similar? 2) Find the value of x and y. A M C 36 42 18 W T R 14 12 6 P Q R S A B C D 32 12 16 x 18 24 y PQRS~CDAB
D. N. A.1) Are the following triangles similar?
2) Find the value of x and y.
A
M C36
4218
W
T
R14
12
6
P Q
RS
A
BC
D
32
12
16
x
18
24
y
PQRS~CDAB
Similar TrianglesSimilar TrianglesChapter 7-3Chapter 7-3
• Identify similar triangles.
• Use similar triangles to solve problems.
Standards 4.0 Students prove basic theorems involving congruence and similarity. (Key)
Standard 5.0 Students prove that triangles are congruent or similar, and they are able to use the concept of corresponding parts of congruent triangles.
Writing Proportionality StatementsGiven BTW ~ ETC
• Write the Statement of Proportionality
• Find mTEC
• Find TE and BE
T
WB
CE
34o
79o
20
12
3
BW
EC
TB
TE
TW
TC
mTEC = mTBW = 79o
TB
TE
BW
EC
2012
3 x 5TE
15520 EB
AA Similarity Theorem• If two angles of one triangle are congruent
to two angles of another triangle, then the two triangles are similar.
K
J L
Y
X Z
If K Y and J X,
then JKL ~ XYZ.
Example• Are these two triangles similar? Why?
N M P
Q
R S T
SSS Similarity Theorem• If the corresponding sides of two triangles
are proportional, then the two triangles are similar.
B
A C
Q
P R
Which of the following three triangles are similar?
AC
B
12
69
F
E
D
6
8
4J
H
G
66
14141010
ABC and FDE?
Longest Sides
Shortest Sides
Remaining Sides
ABC~ FDESSS ~ Thm
Scale Factor = 3:2
Which of the following three triangles are similar?
AC
B
12
69
F
E
D
6
8
4J
H
G
6
1410
ABC and GHJ
Longest Sides
Shortest Sides
Remaining Sides
ABC is not similar to DEF
SAS Similarity Theorem• If one angle of one triangle is congruent to an
angle of a second triangle and the lengths of the sides including these angles are proportional, then the triangles are similar.
K
J L
Y
X Z
Pantographass
Prove RTS ~ PSQS S (reflexive prop.) S
TR
QP
5
1512
4
16
4
20
5
SPQ SRT
SAS ~ Thm.
ST
SQ
SR
SP
)16(5)20(4 8080
Are the two triangles similar?
3
4
9
12
QT
NQ
N P
Q
R T
10
1512
9Not
Similar
2
3
10
15
RQ
PQ
NQP TQR
How far is it across the river?
42 yds
2 yds
5 yds
42
2
x
5
x yards
2x = 210
x = 105 yds
Determine the similar triangles.
5. Find x, AC, and ED.
E
D
BA
C
5x
151x
12
6. Find x, JL, and LM.
J
K
LN
M4
3x
18x16
7. Find x, EH, and EF.
5x
9
9
126EH
F
DG
In the figure, , and ABC and DCB are right angles. Determine which triangles in the figure are similar.
Are Triangles Similar?
Answer: Therefore, by the AA Similarity Theorem, ΔABE ~ ΔCDE.
Vertical angles are congruent,
by the Alternate Interior
Angles Theorem.
Are Triangles Similar?
A. ΔOBW ~ ΔITW
B. ΔOBW ~ ΔWIT
C. ΔBOW ~ ΔTIW
D. ΔBOW ~ ΔITW
In the figure, OW = 7, BW = 9, WT = 17.5, and WI = 22.5. Determine which triangles in the figure are similar.
Parts of Similar Triangles
ALGEBRA Given , RS = 4, RQ = x + 3, QT = 2x + 10, UT = 10, find RQ and QT.
Parts of Similar Triangles
Since
because they are alternate interior angles. By AA
Similarity, ΔRSQ ~ ΔTUQ. Using the definition of similar
polygons,
Substitution
Cross products
Parts of Similar Triangles
Answer: RQ = 8; QT = 20
Distributive Property
Subtract 8x and 30 from each side.
Divide each side by 2.
Now find RQ and QT.
Lesson 3 CYP2
A. 2
B. 4
C. 12
D. 14
A. ALGEBRA Given AB = 38.5, DE = 11, AC = 3x + 8, and CE = x + 2, find AC.
A. 2
B. 4
C. 12
D. 14
B. ALGEBRA Given AB = 38.5, DE = 11, AC = 3x + 8, and CE = x + 2, find CE.
INDIRECT MEASUREMENT Josh wanted to measure the height of the Sears Tower in Chicago. He used a 12-foot light pole and measured its shadow at 1 P.M. The length of the shadow was 2 feet. Then he measured the length of the Sears Tower’s shadow and it was 242 feet at that time.
What is the height of the Sears Tower?
Indirect Measurement
Since the sun’s rays form similar triangles, the following proportion can be written.
Now substitute the known values and let x be the height of the Sears Tower.
Substitution
Cross products
Indirect Measurement
Answer: The Sears Tower is 1452 feet tall.
Simplify.
Divide each side by 2.
Interactive Lab:Cartography and Similarity
Indirect Measurement
Lesson 3 CYP3
A. 196 ft B. 39 ft
C. 441 ft D. 89 ft
INDIRECT MEASUREMENT On her trip along the East coast, Jennie stops to look at the tallest lighthouse in the U.S. located at Cape Hatteras, North Carolina. At that particular time of day, Jennie measures her shadow to be 1 feet 6 inches in length and the length of the shadow of the lighthouse to be 53 feet 6 inches. Jennie knows that her height is 5 feet 6 inches. What is the height of the Cape Hatteras lighthouse to the nearest foot?
Homework Chapter 7-3
• Pg 400
7 – 17, 21, 31 – 38
