Question

Write the converse of the conditional statement.

"If a polygon is regular, then it has congruent angles and congruent sides."

If a polygon has congruent angles and congruent sides, then it is regular.

If a polygon does not have congruent angles and congruent sides, then it is not regular.

A polygon has congruent angles and congruent sides, if and only if, it is regular.

If a polygon is not regular, then it does not have congruent angles and congruent sides.

Answer 1

@justsmile_alittle

Answer 2

I like how you just tag me like I will be able to do this stuff lol

Answer 3

Lol awhh well i thought you where chill so i did LOL

Answer 4

I am not really smart when it comes to books

Answer 5

I was thinking of A?

Answer 6

I think so too but like i said not really book smart

Answer 7

Oh lol kk than c:'

Answer 8

c

Answer 9

can i help with the question or you already finish it?

Answer 10

I still need help c:'

Answer 11

what grade are you in

Answer 12

"If a polygon is regular, then it has congruent angles and congruent sides."

If a polygon is not regular, then it does not have congruent angles and congruent sides.

Think about it:
A conditional statement is an 'if' statement. The converse basically means the reverse of this statement, so if it is NOT regular (the opposite of regular) then it DOES NOT have congruent angles or sides.

btw im not shouting at u dw its cos theres no highligher - the words in bold are your key words that make the statement converse :)