Triangle
A closed figure with three sides is called a Triangle. It has three vertex, sides and Angles.
Types of Triangle
1. There are three types of triangles on the basis of the length of the sides.
Name of Triangle |
Property |
Image |
Scalene |
Length of all sides are different |
|
Isosceles |
Length of two sides are equal |
|
Equilateral |
Length of all three sides are equal |
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2. There are three types of triangles on the basis of angles.
Name of Triangle |
Property |
Image |
Acute |
All the three angles are less than 90° |
|
Obtuse |
One angle is greater than 90° |
|
Right |
One angle is equal to 90° |
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Congruence
If the shape and size of two figures are same then these are called Congruent.
1. Two circles are congruent if their radii are the same.
2. Two squares are congruent if their sides are equal.
Congruence of Triangles
A triangle will be congruent if its corresponding sides and angles are equal.
The symbol of congruent is “≅”.
AB = DE, BC = EF, AC = DF
m∠A = m∠D, m∠B = m∠E, m∠C = m∠F
Here ∆ABC ≅ ∆DEF
Criteria for Congruence of Triangles
S.No. |
Rule |
Meaning |
Figure |
1. |
SAS (Side-Angle-Side) Congruence rule |
If the two sides and the included angle of one triangle is equal to another triangle then they are called congruent triangles. |
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2. |
ASA (Angle-Side-Angle) Congruence rule |
If the two angles and the included side of one triangle is equal to another triangle then they are called congruent triangles. |
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3. |
AAS (Angle-Angle-Side) Congruence rule |
If any two pairs of angles and a pair of corresponding side is equal in two triangles then these are called congruent triangles. |
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4. |
SSS (Side-Side-Side) Congruence rule |
If all the three sides of a triangle are equal with the three corresponding sides of another triangle, then these are called congruent triangles. |
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5. |
RHS (Right angle-Hypotenuse-Side) Congruence rule |
If there are two right-angled triangles then they will be congruent if their hypotenuse and any one side are equal. |
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Remark
1. SSA and ASS do not show the congruence of triangles.
2. AAA is also not the right condition to prove that the triangles are congruent.
Example
Find the ∠P, ∠R, ∠N and ∠M if ∆LMN ≅ ∆PQR.
Solution
If ∆ LMN ≅ ∆PQR, then
∠L=∠P
∠M =∠Q
∠N =∠R
So,
∠L=∠P = 105°
∠M =∠Q = 45°
∠M + ∠N + ∠L = 180° (Sum of three angles of a triangle is 180°)
45° + 105° + ∠N = 180°
∠N = 180°- 45° + 105°
∠N = 30°
∠N = ∠R = 30°
Some Properties of a Triangle
If a triangle has two equal sides then it is called an Isosceles Triangle.
1. Two angles opposite to the two equal sides of an isosceles triangle are also equal.
2. Two sides opposite to the equal angles of an isosceles triangle are also equal. This is the converse of the above theorem.
Inequalities in a Triangle
Theorem 1: In a given triangle if two sides are unequal then the angle opposite to the longer side will be larger.
a > b, if and only if ∠A > ∠B
Longer sides correspond to larger angles.
Theorem 2: In the given triangle, the side opposite the larger angle will always be longer. This is the converse of the above theorem.
Theorem 3: The sum of any two sides of a triangle will always be greater than the third side.
Example
Show whether the inequality theorem is applicable to this triangle or not?
Solution
The three sides are given as 7, 8 and 9.
According to inequality theorem, the sum of any two sides of a triangle will always be greater than the third side.
Let’s check it
7 + 8 > 9
8 + 9 > 7
9 + 7 > 8
This shows that this theorem is applicable to all the triangles irrespective of the type of triangle.