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SAS Criteria for Congruency

In the adjace...

Question

In the adjacent figure $A B C D$ is a square and $△ A P B$ is an equilateral triangle. Prove that $△ A P D ≅ △ B P C$

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Solution

Given that $A P B$ is an equilateral triangle, so the sides of an equilateral triangle are equal.
$A P = B P$ ...... (1)
and $A B C D$ is a square. All the sides of a square are equal.
$A D = B C$ .....(2)
and
$∠ P A D = ∠ D A B - ∠ P A B = 90^{0} - 60^{0} = 30^{0}$
$∠ P B C = ∠ A B C - ∠ P B A = 90^{0} - 60^{0} = 30^{0}$
$∴ ∠ D A P = ∠ B P C$ ......(3)
So, from the $S . A . S .$ congruency,
$∴ Δ A P D ≅ Δ B P C$

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A B C D

Δ A P B

Δ A P D ≅ Δ B P C

Δ A P D

Δ B P C ¯ ¯¯¯¯¯¯¯ ¯ A D = ¯ ¯¯¯¯¯¯ ¯ B C, ¯ ¯¯¯¯¯¯ ¯ A P = ¯ ¯¯¯¯¯¯ ¯ B P

∠ P A D = ∠ P B C = 90 ° - 60 ° = 30 °

In the following diagrams, ABCD is a square and APB is an equilateral triangle.

In each case,

(i) Prove that : $Δ$ APD $≅ Δ$ BPC

(ii) Find the angles of $Δ$ DPC.

△ P A B

△ A P D ≅ △ B P C

∠ D P C = 30

A B C D

△ E D C

∠ D A E = 15^{o}

In the following diagrams, ABCD is a square and APB is an equilateral triangle.

In each case, $Δ A P D ≅ Δ B P C$ .

State whether the above statement is true or false.

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