Horizontal and parallel lines m and n are cut by transversal k. At the intersection of lines k and m, the bottom left angle is 5
0 degrees. At the intersection of lines k and n, the uppercase right angle is 50 degrees. Which theorem correctly justifies why the lines m and n are parallel when cut by transversal k? converse of the corresponding angles theorem converse of the alternate interior angles theorem converse of the same side interior angles theorem converse of the alternate exterior angles theorem
