Answer:
m<1 = 135°, m<2 = 45°, m<3 = 135°, m<4 = 45°, m<5 = 135°, m<6 = 45°, m<7 = 135°
Explanation:
We know that a straight line always gives us a measure of 180° total. This would mean 180° = m<8 + m<7. So, if we plug in the real value of m<8, we get 180 = 45 + m<7. From there, we can subtract 180 by 45, and we get 135° = m<7.
We know that vertical angles are congruent - so m<5 is the same as m<7 - making m<5 = 135° as well. This could also apply to m<8 and m<6, so m<6= 45°.
From there, we can also say that alternate interior angles are congruent to each other - meaning m<5 = m<3, and m<6 = m<4. So, m<3 = 135° and m<4 = 45°.
Alternate exterior angles are congruent too, which means m<8 = m<2, and m<7 = m<1. So, m<2 = 45° and m<1 = 135°.
In summary,
m<7 = 135° because angle subtraction.
m<5 = 135° and m<6= 45° because vertical angles are congruent.
m<3 = 135° and m<4 = 45° because alternate interior angles are congruent.
m<1 = 135° and m<2 = 45° because alternate exterior angles are congruent!
Hope this makes sense! Not sure if I explained it well.