Which of the following is sufficient for two triangles denoted by Δ 1 and Δ 2 to be congruent ? Options: A . &nbspAny two sides of Δ1 should be equal to any two sides of Δ2 B . &nbspAll angles of Δ1 should be equal to all angles of Δ2 C . &nbspAny two sides of Δ1 and one angle should be equal to any two sides and one angle of Δ2 D . &nbspAny two sides of Δ1 and the included angle should be equal to any two sides and the included angle of Δ2

Which of the following is sufficient for two triangles denoted by Δ1

Question

Which of the following is sufficient for two triangles denoted by

Δ 1

and

Δ 2

to be congruent ?

Options:

A . Any two sides of Δ1 should be equal to any two sides of Δ2

B . All angles of Δ1 should be equal to all angles of Δ2

C . Any two sides of Δ1 and one angle should be equal to any two sides and one angle of Δ2

D . Any two sides of Δ1 and the included angle should be equal to any two sides and the included angle of Δ2

Answer: Option D
:
D
Two triangles can't be congruent if any twosides and oneangle of one are equal to any twosides and oneangle of the other.
They will be congruent when the angle is included between the equal pair of sides. This is the SAS condition of congruency of triangles.
The SAS congruence rule states:
Two triangles are congruent if two sides and the included angle of one triangle are equal to the two sides and the included angle of the other triangle.

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