1.If two angles have equal measures, Then the angles are congruent.
True***
False
Write the converse of the conditional and problem 1.
Can someone help walk me through this please?
1. True.
2. If two angles are congruent, their measures are equal.
The biconditional statement is :
Two angles are congruent if and only if their measures are equal.
the converse just switches the if and the then clauses.
What's the bioconditional for the statment??
Sure, I'd be happy to help walk you through this!
The converse of the conditional statement "If two angles have equal measures, then the angles are congruent" would be:
"If two angles are congruent, then they have equal measures."
So, the converse of problem 1 would be:
"If two angles are congruent, then the angles have equal measures."
Let me know if you have any further questions!
Sure! I'd be happy to explain and walk you through the process.
To write the converse of a conditional statement, you need to reverse the positions of the hypothesis (the "if" part) and the conclusion (the "then" part). In this case, the conditional statement is:
"If two angles have equal measures, Then the angles are congruent."
The converse of this statement would be:
"If the angles are congruent, Then the angles have equal measures."
So, according to this converse statement, if two angles are congruent, it implies that they have equal measures.
To determine if the converse is true or false, you can consider whether the converse statement holds in all cases. In this instance, the converse is actually true as well. If two angles have equal measures, it implies that the angles are congruent.
Therefore, the correct answer to the question is True.
I hope that helps! Let me know if you have any further questions.