Congruence and Similarity in Geometry

Starter
What’s the same? How is this different?
42°
42°
42°
32°
6cm
6cm
6cm
9cm
4cm
4cm
4cm
8cm
Congruence and Similarity
Congruence and Similarity
Success Criteria
Developing students
will be able to
recognise similarity as
one shape being an
enlargement of the
other.           
GRADE 5
Secure students will
be able to identify
equal side lengths
and equal angles.
GRADE 6
Excelling students
will be able to prove
similarity and
congruence.
GRADE 7/8
EXAM
QUESTION
F.A.I.L
 
These triangles are 
similar
.
These triangles are
congruent
.
 
They are the same 
shape
.
 
They are the same 
shape and size
.
(Only rotation and flips allowed)
?
?
 
Congruent shapes 
have all sides and angles equal.
Similar shapes 
have all angles equal but one is an enlargement of the other
4
Here are two triangles
x
5.3 cm
7.8 cm
y
They are similar …
… there is an enlargement
between the triangles.
…they have the same angles…
Scale factor = 
  
?
9
·
4 
÷ 4·7 = 
?
2
x
 = 
 
?
5·3 
× 2
 =   
?
10
·
6 cm
y = 
 
?
7
·
8 
÷ 2 =   
?
3
·
9 cm
2
Modelled Example 1
5
Exercise 1
(1)
3
·
5 m
4
·
2 m
4
·
3 m
x
y
6
·
48 m
(2)
x
y
4
·
5 m
10
·
8 m
3
·
5 m
9
·
84 m
(3)
2
·
4 cm
8
·
4 cm
7
·
7 cm
y
4
·
4 cm
x
Find the scale
factor, the value
of 
x
 and the
value of y
Learning Phase 1
6
Answers 1
(1)
 
 
Scale factor = 
 
1
·
2
 
x
 = 5
·
16 m
 
y = 5
·
4 m
(2)
 
 
Scale factor =
 
2
·
4
 
x
 = 4
·
1 m
 
y = 8
·
4 m
(3)
 
 
Scale factor = 
 
1
·
75
 
x
 = 4
·
8 cm
 
y = 4
·
2 cm
Developing students
will be able to
recognise similarity as
one shape being an
enlargement of the
other.       
GRADE 5 -
7
3
·
2 cm
5
·
25 cm
4
·
2 cm
x
3
·
5 cm
y
Find 
x
 and y
Scale factor =
5
·
25 
÷ 4·2 =
1
·
25
T
¹
× 1·25
T
²
Example 2
x
 =
3
·
2 
× 1·25 =
4
·
0 cm
y =
3
·
5 
÷ 1·25 =
2
·
8 cm
Modelled Example 2
Learning Phase 2
8
Exercise 2
(1)
3
·
5 m
4
·
2 m
4
·
3 m
x
y
6
·
48 m
(2)
x
y
4
·
5 m
10
·
8 m
3
·
5 m
9
·
84 m
(3)
2
·
4 cm
8
·
4 cm
7
·
7 cm
y
4
·
4 cm
x
Find the scale
factor, the
value of 
x
 and
the value of y
9
Answers 2
(1)
 
 
Scale factor = 
 
1
·
2
 
x
 = 5
·
16 m
 
y = 5
·
4 m
(2)
 
 
Scale factor =
 
2
·
4
 
x
 = 4
·
1 m
 
y = 8
·
4 m
(3)
 
 
Scale factor = 
 
1
·
75
 
x
 = 4
·
8 cm
 
y = 4
·
2 cm
Developing students
will be able to
recognise similarity as
one shape being an
enlargement of the
other.       
GRADE 5 =
10
Example 3
4 cm
3 cm
2
·
4 cm
x
3
·
6 cm
y
Find 
x
 and y
Scale factor =
7 
÷
 4 =
1
·
75
T
¹
×
 1·75
T
²
x
 =
2
·
4 
×
 1·75 =
4
·
2 cm
1
·
75 
×
 3·6
 = y + 3
·
6
y = 1
·
75 
×
 3·6 – 3·6
y = 2
·
7 cm
Modelled Example 3
11
Exercise 3
(1)
Find the scale
factor, the value
of 
x
 and the
value of y
(2)
(3)
y
5
5
·
5 cm
x
2
·
5 cm
1
·
5 cm
7
·
6 cm
1
·
9 cm
x
2
·
84 cm
3
·
28 cm
y
6
x
8
y
5
6
Learning Phase 3
12
Answers 3
(1)
 
 
Scale factor = 
 
1
·
6
 
x
 = 8.8 m
 
y = 3 m
(2)
 
 
Scale factor =
 
1
·
25
 
x
 = 2
·
272 cm
 
y = 0
·
82 cm
(3)
 
 
Scale factor = 
 
1
·
2
 
x
 = 1
·
2
  
y = 1
·
6
Secure students will
be able to identify
equal side lengths
and equal angles.
GRADE 6
EXAM
QUESTION
F.A.I.L
 
These triangles are 
similar
.
These triangles are
congruent
.
 
They are the same 
shape
.
 
They are the same 
shape and size
.
(Only rotation and flips allowed)
?
?
 
Congruent shapes 
have all sides and angles equal.
Similar shapes 
have all angles equal but one is an enlargement of the other
GCSE papers will often ask for you to prove that two triangles are congruent.
There’s 4 different ways in which we could show this:
For triangles to be congruent, three properties must be the same
a
SAS
Two sides and the included
angle.
b
ASA
Two angles and a
side.
c
SSS
Three sides.
d
RHS
Right-angle, hypotenuse and
another side.
?
?
?
?
 
Are these triangles congruent?
 
In pairs – Identify the proof associated with these triangles
 
4cm
 
4cm
 
6cm
 
6cm
 
3.5cm
 
3.5cm
 
4cm
 
4cm
 
3.5cm
 
3.5cm
 
78°
 
78°
 
4cm
 
4cm
 
78°
 
78°
 
47°
 
47°
Proofs
Proofs
Excelling students
will be able to prove
similarity and
congruence.
In general, for “ASS”, there are
always 2 possible triangles.
For triangle, identify if showing the indicating things are equal (to another
triangle) are sufficient to prove congruence, and if so, what type of proof we
have.
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
SSS
SAS
ASA
RHS
Bro Tip
:  Always start with 4 bullet points:
three for the three letters in your proof,
and one for your conclusion.
STEP 1: 
Choose your
appropriate proof (SSS, SAS,
etc.)
STEP 2: 
Justify each of three
things.
STEP 3: 
Conclusion, stating the
proof you used.
?
Solution:
Non Calculator
?
?
?
(If you finish quickly, try
proving another way)
?
(if multiple parts, only do (a) for now)
Q1
NOT
E
?
Q2
?
?
Q3
Q4
BC = CE 
equal  sides
CF = CD 
equal sides
BCF = DCE 
= 150
o
BFC
 is congruent to 
ECD 
 by SAS.
So
 BF=ED (
congruent triangles)
BF = EG 
( opp sides of parallelogram)
(2)
?
?
What are the four types of congruent triangle proofs?
SSS, SAS, ASA (equivalent to AAS) and RHS.
What should be the structure of our proof?
Justification of each of the three letters, followed by
conclusion in which we state which proof type we
used.
What kinds of justifications can be used for sides and
angles?
Circle Theorems, ‘common’ sides,
alternate/corresponding angles, properties of
parallelograms,  sides/angles of regular polygon are
equal.
?
?
?
?
Q2
Q4
BC = CE 
equal  sides
CF = CD 
equal sides
BCF = DCE 
= 150
o
BFC
 is congruent to 
ECD 
 by SAS.
So
 BF=ED (
congruent triangles)
BF = EG 
( opp sides of parallelogram)
(2)
?
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This instructional material focuses on teaching students the concepts of congruence and similarity in geometry. It covers the identification of equal side lengths and angles, as well as proving similarity and congruence. Through examples and exercises at different grade levels, students learn to recognize shapes as enlargements of each other, calculate scale factors, and determine unknown values in similar figures. The content incorporates visual aids and structured exercises to help students grasp these geometric concepts effectively.

  • Geometry
  • Congruence
  • Similarity
  • Educational Material
  • Geometry Concepts

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  1. Congruence and Similarity Success Criteria Starter What s the same? How is this different? Developing students will be able to recognise similarity as one shape being an enlargement of the other. GRADE 5 4cm 42 6cm 6cm 42 4cm 9cm Secure students will be able to identify equal side lengths and equal angles. 6cm 42 32 GRADE 6 8cm 4cm Excelling students will be able to prove similarity and congruence. GRADE 7/8

  2. Related image EXAM QUESTION F.A.I.L Image result for congruence in the real world

  3. What is congruence? These triangles are similar. These triangles are congruent. They are the same shape and size. (Only rotation and flips allowed) ? ? They are the same shape. Congruent shapes have all sides and angles equal. Similar shapes have all angles equal but one is an enlargement of the other

  4. Modelled Example 1 Here are two triangles 2 2 x 5.3 cm y 7.8 cm ? 2 4.7 cm 9.4 cm 9 4 4 7 = ? 2 ? They are similar Scale factor = they have the same angles 5 3 2 = ? 10 6 cm ? x = there is an enlargement between the triangles. ? 7 8 2 = ? 3 9 cm y = 4

  5. Learning Phase 1 Exercise 1 6 48 m 4 2 m y 3 5 m (1) Find the scale factor, the value of x and the value of y x 4 3 m 10 8 m (2) 4 5 m y 3 5 m 9 84 m x (3) 8 4 cm y x 2 4 cm 7 7 cm 4 4 cm

  6. Developing students will be able to recognise similarity as one shape being an enlargement of the other. GRADE 5 - Answers 1 (1) Scale factor = 1 2 x = 5 16 m y = 5 4 m (2) Scale factor = 2 4 x = 4 1 m y = 8 4 m (3) Scale factor = 1 75 x = 4 8 cm y = 4 2 cm

  7. Modelled Example 2 Example 2 3 2 cm 3 5 cm y 5 25 cm 4 2 cm x 5 25 4 2 = 1 25 Find x and y Scale factor = 1 25 T T 3 2 1 25 = x = 4 0 cm 3 5 1 25 = y = 2 8 cm 7

  8. Learning Phase 2 Exercise 2 4 2 m 6 48 m (1) Find the scale factor, the value of x and the value of y 3 5 m y x 4 3 m 9 84 m (2) 4 5 m 3 5 m y 10 8 m x y (3) x 2 4 cm 7 7 cm 4 4 cm 8 4 cm 8

  9. Developing students will be able to recognise similarity as one shape being an enlargement of the other. GRADE 5 = Answers 2 (1) Scale factor = 1 2 x = 5 16 m y = 5 4 m (2) Scale factor = 2 4 x = 4 1 m y = 8 4 m (3) Scale factor = 1 75 x = 4 8 cm y = 4 2 cm 9

  10. Modelled Example 3 y Example 3 x 3 cm 4 cm 7 4 = Find x and y Scale factor = 1 75 1 75 T T 2 4 1 75 = 4 2 cm x = y = 1 75 3 6 3 6 1 75 3 6 = y + 3 6 y = 2 7 cm 10

  11. Learning Phase 3 Exercise 3 1 5 cm x (1) Find the scale factor, the value of x and the value of y 2 5 cm 5 5 cm y 5 y (2) 2 84 cm 3 28 cm x 1 9 cm 7 6 cm (3) y 6 8 5 x 6 11

  12. Secure students will be able to identify equal side lengths and equal angles. Answers 3 GRADE 6 (1) Scale factor = 1 6 x = 8.8 m y = 3 m (2) Scale factor = 1 25 x = 2 272 cm y = 0 82 cm (3) Scale factor = 1 2 x = 1 2 y = 1 6 12

  13. Related image EXAM QUESTION F.A.I.L Image result for congruence in the real world

  14. What is congruence? These triangles are similar. These triangles are congruent. They are the same shape and size. (Only rotation and flips allowed) ? ? They are the same shape. Congruent shapes have all sides and angles equal. Similar shapes have all angles equal but one is an enlargement of the other

  15. Proving congruence GCSE papers will often ask for you to prove that two triangles are congruent. There s 4 different ways in which we could show this: For triangles to be congruent, three properties must be the same a SAS Two sides and the included angle. ? b ASA Two angles and a side. ? c SSS Three sides. ? d RHS Right-angle, hypotenuse and another side. ?

  16. Proofs Are these triangles congruent? In pairs Identify the proof associated with these triangles 6cm 4cm 6cm 3.5cm 4cm 3.5cm 4cm 3.5cm 78 78 Excelling students will be able to prove similarity and congruence. 3.5cm 4cm 47 4cm 78 78 47 4cm

  17. Proving congruence Why is it not sufficient to show two sides are the same and an angle are the same if the side is not included? Try and draw a triangle with the same side lengths and indicated angle, but that is not congruent to this one. Click to Reveal In general, for ASS , there are always 2 possible triangles.

  18. What type of proof For triangle, identify if showing the indicating things are equal (to another triangle) are sufficient to prove congruence, and if so, what type of proof we have. This angle is known from the other two. SSS SAS SAS SSS SSS SAS SSS SAS RHS RHS ASA RHS RHS ASA ASA ASA SSS SAS SSS SAS SSS SAS SSS SAS RHS ASA RHS RHS ASA ASA ASA RHS

  19. Example Proof Non Calculator STEP 1: Choose your appropriate proof (SSS, SAS, etc.) STEP 2: Justify each of three things. STEP 3: Conclusion, stating the proof you used. Solution: ?? = ?? as given ?? = ?? as given ??is common. ??? is congruent to ???by SSS. ? Bro Tip: Always start with 4 bullet points: three for the three letters in your proof, and one for your conclusion.

  20. Check Your Understanding ? ? ???? is a parallelogram. Prove that triangles ??? and ??? are congruent. (If you finish quickly, try proving another way) ? ? Using ???: Using ???: Using ???: ?? = ?? as opposite sides of parallelogram are equal in length. ??? = ??? as opposite angles of parallelogram are equal. ?? = ?? as opposite sides of parallelogram are equal in length. Triangles ??? and ??? are congruent by SAS. ??? = ??? as opposite angles of parallelogram are equal. ?? = ?? as opposite sides of parallelogram are equal in length. ??? = ??? as alternate angles are equal. Triangles ??? and ??? are congruent by ASA. ?? is common. ?? = ?? as opposite sides of parallelogram are equal in length. ?? = ?? for same reason. Triangles ??? and ??? are congruent by SSS. ? ? ?

  21. Exercises (if multiple parts, only do (a) for now) NOT E Q1 ?

  22. Exercises Q2 AB = AC (??? is equilateral triangle) AD is common. ADC = ADB = 90 . Therefore triangles congruent by RHS. ? Since ??? and ??? are congruent triangles, ?? = ??. ?? = ?? as ??? is equilateral. Therefore ?? =1 ? 2?? =1 2??

  23. Congruent Triangles Q3 ?

  24. Exercises Q4 BC = CE equal sides CF = CD equal sides BCF = DCE = 150o BFC is congruent to ECD by SAS. ? So BF=ED (congruent triangles) BF = EG ( opp sides of parallelogram) ? (2)

  25. Check Your Understanding What are the four types of congruent triangle proofs? SSS, SAS, ASA (equivalent to AAS) and RHS. ? What should be the structure of our proof? Justification of each of the three letters, followed by conclusion in which we state which proof type we used. ? What kinds of justifications can be used for sides and angles? Circle Theorems, common sides, alternate/corresponding angles, properties of parallelograms, sides/angles of regular polygon are equal. ?

  26. Using completed proof to justify other sides/angles In this proof, there was no easy way to justify that ?? = ??. However, once we ve completed a congruent triangle proof, this provides a justification for other sides and angles being the same. We might write as justification: As triangles ABD and DCA are congruent, ?? = ??.

  27. Exercises Q2 We earlier showed ??? and ??? are congruent, but couldn t at that point use ?? = ?? because we couldn t justify it. AB = AC (??? is equilateral triangle) AD is common. ADC = ADB = 90 . Therefore triangles congruent by RHS. Since ??? and ??? are congruent triangles, ?? = ??. ?? = ?? as ??? is equilateral. Therefore ?? =1 ? 2?? =1 2??

  28. Exercises Q4 BC = CE equal sides CF = CD equal sides BCF = DCE = 150o BFC is congruent to ECD by SAS. So BF=ED (congruent triangles) BF = EG ( opp sides of parallelogram) ? (2)

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