Category : 9th Class
Triangles
\[\Delta \]ABC has three sides denoted by AB, BC and CA; three angles denoted by \[\angle ~A,\angle B\text{ }and\text{ }\angle C\,;\]and three vertices denoted by A, B and C.
and \[C\leftrightarrow R\]is symbolically expressed as \[\Delta ABC=\Delta PQR.\]
(i) Congruence relation is reflexive.
\[\Delta ABC=\Delta ABC.\]
(ii) Congruence relation is symmetric.
If \[\Delta ABC\text{ }\cong \text{ }\Delta DEF,\text{ }then\text{ }\Delta DEF\text{ }\cong \text{ }ABC\text{ }.\]
(iii)Congruence relation is transitive.
one triangle are equal to the two sides and the included angle of the other triangle.
\[\Delta ABC=\Delta PQR\]
\[Since=PQ=7cm,\text{ }\angle C=PR=5cm\,\,and\,\angle A=\angle P=50{}^\circ .\]corresponding sides and angles of the other triangle.
(ii) A.S.A. congruence rule: Two e.g., triangles are congruent if two angles and the included side of one triangle are equal to two angles and the included side of the other triangle.
\[\Delta ABC\cong \Delta DEF\]
\[\angle B=\angle E={{45}^{o}},\angle C=\angle F=30{}^\circ \text{ }and\text{ }BC\text{ }=\text{ }EF\text{ }=\text{ }5cm.\]
(iii) S.S.S. congruence rule: If three sides of one triangle are equal to the three sides of another triangle, then the two triangles are congruent.
\[\Delta ABC=\Delta XYZ\]
Since AB = XY = 5 cm, BC = YZ = 7 cm and CA = ZX = 6 cm.
Right angle - Hypotenuse
\[\Delta ABC=\Delta PQR\]
Since \[\angle \]B =\[\angle \]Q = 90°, AC = PR = 5 cm and AB = PQ = 4 cm.
(v) A.A.S. or S.S.A. congruence rule: Two
triangles are congruent if any two pairs of angles and one pair of corresponding sides are equal.
\[\Delta ABC.\text{ }\Delta DEF\]
Since \[\angle \]A = \[\angle \]D, \[\angle \]B = \[\angle \]E and BC = EF.
(i) If two sides of a triangle are unequal, then the angle opposite to the longer side is greater than that opposite to the shorter side.
(ii) In a right triangle, hypotenuse is longer than the other two sides.
(iii) The sum of any two sides of a triangle is greater than the third side.
(iv) An exterior angle of a triangle is greater than either of its interior angles.
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