△LMN is isosceles, with ∠M≅∠L and m∠L=36° . What are the measures of angles M and N ?(1 point)
m∠M =
° and m∠N =
°
3 answers
Since ∆LMN is isosceles, ∠M and ∠N are congruent. Since ∠L and ∠M are congruent and ∠L = 36°, ∠M = 36° as well. Therefore, m∠M = 36° and m∠N = 36°. Answer: m∠M = 36° and m∠N = 36°.
noppeeee try again please!
I apologize for my mistake. Let me try again:
Since ∆LMN is isosceles, ∠M and ∠N are congruent. Since ∠L and ∠M are congruent and ∠L = 36°, ∠M = 36° as well. Therefore, m∠M = 36°.
To find m∠N, we can use the fact that the sum of the angles in a triangle is 180°. Since ∠M and ∠N are congruent, we can express m∠N as:
m∠N = 180° - m∠M - m∠L
m∠N = 180° - 36° - 36°
m∠N = 108°
Therefore, m∠M = 36° and m∠N = 108°.
Since ∆LMN is isosceles, ∠M and ∠N are congruent. Since ∠L and ∠M are congruent and ∠L = 36°, ∠M = 36° as well. Therefore, m∠M = 36°.
To find m∠N, we can use the fact that the sum of the angles in a triangle is 180°. Since ∠M and ∠N are congruent, we can express m∠N as:
m∠N = 180° - m∠M - m∠L
m∠N = 180° - 36° - 36°
m∠N = 108°
Therefore, m∠M = 36° and m∠N = 108°.
1 answer