Math, asked by kamble120007038, 11 months ago

Write the converse and contrapositive of if triangle is equiangular, then it is equilateral.

Answers

Answered by ColinJacobus
41

The converse is "if a triangle is equilateral, then it is equiangular"

and

the contrapositive is "if a triangle is not equilateral, then it is not equiangular."

Step-by-step explanation:  WE know that

if the conditional statement is of the form "if p, then q", then

converse of the statement is given by "if q, then p"

and

contrapositive is given by "if not q, then not p".

Therefore, the CONVERSE of the given statement is "if a triangle is equilateral, then it is equiangular".

And, CONTRAPOSITIVE of the given statement is "if a triangle is not equilateral, then it is not equiangular."

Answered by princesspenguin29
19

Answer:

Converse: If the triangle is equilateral, then it is equiangular.

Inverse: If the triangle is not equiangular, then it is not equilateral.

Contrapositive: If the triangle is not equilateral, then it is not equiangular.

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