Given: ∠A is a straight angle. ∠B is a straight angle.

Prove: ∠A≅∠B

It is given that ∠A and ∠B are straight angles. This means that ___ because of the_. Using the_, m∠A=m∠B . Finally, ∠A≅∠B by____.

It is given that ∠A and ∠B are straight angles. This means that both angles are of 180° because of the the definition of straight angles. Using the definition of equality, m∠A=m∠B . Finally, ∠A≅∠B by definition of congruent.

katta1738 katta1738 · Answer 2 · 2019-10-23T02:24:24+02:00

katta1738 katta1738

23-10-2019

Just took the quiz, the right answers are:

It is given that ∠A and ∠B are straight angles. This means that m∠A = 180° and m∠B = 1 because of the definition of straight angles .

Using the substitution property of equality , m∠A = m∠B . Finally, ∠A≅∠B by angle congruence postulate .

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Given: ∠A is a straight angle. ∠B is a straight angle. Prove: ∠A≅∠B It is given that ∠A and ∠B are straight angles. This means that _____ because of the_____. Using the_____, m∠A=m∠B . Finally, ∠A≅∠B by______.

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Given: ∠A is a straight angle. ∠B is a straight angle.

Prove: ∠A≅∠B

It is given that ∠A and ∠B are straight angles. This means that ___ because of the_. Using the_, m∠A=m∠B . Finally, ∠A≅∠B by____.