△BCE∼△JKL . If m∠B=89° , m∠C=13° , and m∠E=78° what is m∠J ?(1 point)
m∠J=
°
3 answers
Since we know that △BCE∼△JKL, we can use the property of similar triangles that corresponding angles are congruent. Therefore, m∠J is equal to m∠E which is 78°. So, m∠J = 78°.
wrong
I apologize for the mistake. Let's solve the problem correctly:
Given △BCE∼△JKL, we know that the corresponding angles are congruent.
m∠B = 89°
m∠C = 13°
m∠E = 78°
Since ∠B and ∠K correspond to each other and they are congruent, we have:
m∠B = m∠K = 89°
Therefore, m∠J = 89°.
Given △BCE∼△JKL, we know that the corresponding angles are congruent.
m∠B = 89°
m∠C = 13°
m∠E = 78°
Since ∠B and ∠K correspond to each other and they are congruent, we have:
m∠B = m∠K = 89°
Therefore, m∠J = 89°.
1 answer