The following conditional statement true. What is the statement's converse and is the converse true?

Question

The following conditional statement true. What is the statement's converse and is the converse true?

If a figure is a square, then it has four right angles.
(1 point)
Responses

If a figure is not a square, then it does not have four right angles. This is true.
If a figure is not a square, then it does not have four right angles. This is true.

If a figure is not a square, then it does not have four right angles. This is false because a rectangle is a counterexample.
If a figure is not a square, then it does not have four right angles. This is false because a rectangle is a counterexample.

If a figure has four right angles, then it is a square. This is true.
If a figure has four right angles, then it is a square. This is true.

If a figure has four right angles, then it is a square. This is false because a rectangle is a counterexample.

Answer 1

The converse of the statement is "If a figure has four right angles, then it is a square." This statement is false because a rectangle is a counterexample to the converse.

Answer 2

The following conditional statement true. What is the statement's converse and is the converse true?

The converse of the statement is "If a figure has four right angles, then it is a square." This statement is false because a rectangle is a counterexample to the converse.

The converse of the given conditional statement is: "If a figure has four right angles, then it is a square." The converse is true.