Congruent and similar triangle by ritik
dgupta330
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Dec 11, 2012
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Congruent and Similar
Triangles
Triangles
Introduction
Recognizing and using congruent and
similar shapes can make calculations and
design work easier. For instance, in the
design at the corner, only two different
shapes were actually drawn. The design
was put together by copying and
manipulating these shapes to produce
versions of them of different sizes and in
different positions.
Recognizing and using congruent and
similar shapes can make calculations and
design work easier. For instance, in the
design at the corner, only two different
shapes were actually drawn. The design
was put together by copying and
manipulating these shapes to produce
versions of them of different sizes and in
different positions.
Similar and Congruent Figures
•Congruent triangleshave all sides
congruent and all angles congruent.
•Similar triangleshave the same shape;
they may or may not have the same size.
•Congruent triangleshave all sides
congruent and all angles congruent.
•Similar triangleshave the same shape;
they may or may not have the same size.
Note:Two figures can be similar but not congruent,
but they can’tbe congruent but not similar. Think
about why!
Similar and Congruent Figures
but they can’tbe congruent but not similar. Think
about why!
Similar and Congruent Figures
Examples
These figures are
similar and congruent.
They’re the same shape
and size.
These figures are similar
but notcongruent.
They’re the same shape,
but not the same size.
These figures are
similar and congruent.
They’re the same shape
and size.
These figures are similar
but notcongruent.
They’re the same shape,
but not the same size.
Ratios and Similar Figures
•Similar figures have corresponding
sidesand corresponding anglesthat are
located at the same place on the
figures.
•Corresponding sides have to have the
same ratios between the two figures.
•A ratiois a comparison between 2
numbers (usually shown as a fraction)
•Similar figures have corresponding
sidesand corresponding anglesthat are
located at the same place on the
figures.
•Corresponding sides have to have the
same ratios between the two figures.
•A ratiois a comparison between 2
numbers (usually shown as a fraction)
Ratios and Similar Figures
Example
A
E
C
F
D
G H
B
These sides correspond:
AB and EF
BD and FH
CD and GH
AC and EG
These angles correspond:
A and E
B and F
D and H
C and G
Example
A
E
C
F
D
G H
B
These sides correspond:
AB and EF
BD and FH
CD and GH
AC and EG
These angles correspond:
A and E
B and F
D and H
C and G
Ratios and Similar Figures
Example
7 m
3 m
6 m
14 m
These rectangles
are similar, because
the ratios of these
corresponding sides
are equal:7 14
36 36
7 14 73
14 6 14 6
73
Example
7 m
3 m
6 m
14 m
These rectangles
are similar, because
the ratios of these
corresponding sides
are equal:7 14
36 36
7 14 73
14 6 14 6
73
•A proportionis an equation that states
that two ratios are equal.
•Examples:48
10n 6
32
m
n = 5 m = 4
Proportions and Similar Figures
that two ratios are equal.
•Examples:48
10n 6
32
m
n = 5 m = 4
Proportions and Similar Figures
Proportions and Similar Figures
You can use proportions of corresponding
sides to figure out unknown lengths of
sides of polygons.
16 m
10 m
n
5 m
10/16 = 5/n so n = 8 m
–Solve for n:
You can use proportions of corresponding
sides to figure out unknown lengths of
sides of polygons.
16 m
10 m
n
5 m
10/16 = 5/n so n = 8 m
–Solve for n:
Similar triangles
•Similar triangles are triangles with
the same shape
For two similar triangles,
•corresponding angles have the same measure
•length of corresponding sides have the same
ratio
65
o
25
o
A
4 cm
2cm
12cm
B
Example
Angle 1 = 90
o Side B = 6 cm
•Similar triangles are triangles with
the same shape
For two similar triangles,
•corresponding angles have the same measure
•length of corresponding sides have the same
ratio
65
o
25
o
A
4 cm
2cm
12cm
B
Example
Angle 1 = 90
o Side B = 6 cm
Similar Triangles
Ways to Prove Triangles
Are Similar
Ways to Prove Triangles
Are Similar
Similar triangles have corresponding
angles that are CONGRUENT and
their corresponding sides are
PROPORTIONAL.
6
10
8
3
4
5
angles that are CONGRUENT and
their corresponding sides are
PROPORTIONAL.
6
10
8
3
4
5
But you don’t need ALL
that information to be
able to tell that two
triangles are similar….
that information to be
able to tell that two
triangles are similar….
AA Similarity
•If two (or 3) angles of a triangle are congruent to
the two corresponding angles of another triangle,
then the triangles are similar.
25 degrees
25 degrees
•If two (or 3) angles of a triangle are congruent to
the two corresponding angles of another triangle,
then the triangles are similar.
25 degrees
25 degrees
SSS Similarity
•If all three sides of a triangle are
proportional to the corresponding sides of
another triangle, then the two triangles are
similar.
18
12
8
12
14
212
3
14
21
2
3
12
18
2
3
8
12
•If all three sides of a triangle are
proportional to the corresponding sides of
another triangle, then the two triangles are
similar.
18
12
8
12
14
212
3
14
21
2
3
12
18
2
3
8
12
THE END
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