8.6 proportions and similar triangles
DESCRIPTION
8.6 Proportions and Similar Triangles. Triangle Proportionality Theorem. If a line parallel to one side of a triangle intersects the other two sides, then it divides the two sides proportionally. If TU ll QS, then . R. U. T. >. S. >. Q. Given AB ll ED, find EA. C. - PowerPoint PPT PresentationTRANSCRIPT
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8.6 Proportions and Similar Triangles
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Triangle Proportionality Theorem If a line parallel to one side of a triangle
intersects the other two sides, then it divides the two sides proportionally.
If TU ll QS, then R
T
QS
U
USRU
TQRT
>
>
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Given AB ll ED, find EA
8
4
12
C
D
B
E
A
EA12
48
8 EA = 4(12) 8 EA = 48 EA = 6
>
>
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Converse of the Triangle Proportionality Theorem
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Determining Parallels
Given the diagram, determine whether MN ||
GH.
N HL
MG
1648
21
56
LM = LN NOTICE:WE ARE COMPARINGMG NH SEGMENTS TO SEGMENTS!
56 = 48 21 16
Since the cross-products are not equal, the ratios are not the same, and the segmentMN is not parallel to segment GH.
56(16) ≠ 48(21)
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Theorems If three parallel lines intersect two transversals,
then they divide the transversals proportionally.
UW = VX
WY XZ
U W Y
V XZ
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Theorems If a ray bisects an angle of a triangle, then it
divides the opposite side into segments whose lengths are proportional to the lengths of the other two sides.
If CD bisects <ACB,Then AD = DB
AC CB
A
D
BC
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Given CD=14, find DB.
C D B
915
A
X9
1415
15 X = 9(14)
15 X = 126
X = 8.4 14 X
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Solve
20
108
f
8 = 10 f 20
160 = 10f 16 = f
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Solve.
32
14
10
p
10 = p24 32
24p = 320 p ≈ 13.3
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Solve.
32 14
18
s
18 = 3232 s
18s = 1024 s = 56 8/9
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23
12
25
x
x = 1225 23
23x = 300 x ≈ 13
END OF 8.6
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8.7 Dilations
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Warmup
Find the value of the variable.
8
6
5 t+3
35
86
t
6(t+3) = 5(8)6t + 18 = 40 6t = 22 t ≈ 3.67
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Vocabulary
Dilation: type of transformation which contains reduction and enlargement.
Reduction: 0< scale factor <1 Enlargement: scale factor >1
preimageimagek '
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Examples on Identifying Dilations
Identify the dilation and find its scale factor.
preimageimagek
C
P’
P
2
552
k
Since k<1, it’s a reductionAnd scale factor is 2:5
image
preimage
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Dilation in a coordinate plane.
Draw a dilation of rectangle ABCD with A(2,2), B(6,2), C(6,4), D(2,4). Name the dilation EFGH. Use the origin as the center and use a scale factor of ½.
How does the perimeter of the preimage compare to the perimeter of the image?
The perimeter of EFGH is ½ the perimeter of ABCD.
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Dilation
http://www.geogebra.org/webstart/geogebra.html
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Dilation in a coordinate plane
Draw a dilation of rectangle ABCD with A(2,2), B(6,2), C(6,4), D(2,4). Use the origin as the center and use a scale factor of 2.
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dilation
http://www.geogebra.org/webstart/geogebra.html
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Ch 8 Review
Day 4 Part 2
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Review 1
Find the geometric mean of 4 and 6
Find the geometric mean of 32 and 96
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Review 2
What is the perimeter of ΔABC?
AD
C
30
B
20
8
7
10
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Review 3
Find the value of JN.
L
N
J
M
K
16
3
18
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Review 4
Simplify the followings.
ydft
520
dayhr15
mcm410
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Review 5
Identify the dilation and find its scale factor.
C
P’
P
6
14
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Review 6
The ratio of AB : BC is 3 : 8. Solve for x.
A B
CD
6
X
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Review 7
The perimeter of a rectangle is 54. The ratio of the lengths of the sides is 2:7. What are the lengths of the sides?
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Review 8 Draw the given triangles. Then decide whether
they are similar or not similar. ΔPQR with 16, 8, 18 and ΔXYZ with 9,8,4
418
88
916
P
Q
R
X
Y
Z
16
8 18
9
8 4
418
88
916
ΔPQR is not similar to ΔXYZ
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Review 9
Find the value of the variable. 33 q
21 17.5
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Review 10 If ΔABC ~ ΔXYZ, AB = 6, and XY = 4, what is
the scale factor of the triangle?
A B
C
X Y
Z
6
4
Scale Factor 6 : 4 3 : 2
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Review 11
328 jj83
12
x
32123
y 3
61134
s
328 jj
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Review 12
Define scale factor, geometric mean and ratio.Provide an example for each term.
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Review 13
XWVSTU
S T
UXW
V
What is the measure of <X?What is the measure of <W?What is the measure of <T?What is the measure of <U?Which side is congruent to TU?
65°
20°
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Review 14
Solve the proportion
xx
37
139
xx
14
159
9x = 13(37 – x) 9x = 481 – 13x+13x +13x 22x = 481 x = 21.9
9x = 15 ( 14 – x )9x = 210 – 15x 24x = 210 x = 8.75