after a TON of research we came p with alternate exterior angles.
They are angles formed by the transversal line cutting through parallel lines
When a transversal line cuts through parallel lines equal corresponding and equal alternate angles are formed
When two parallel lines are cut by a transversal, the two pairs of angles on opposite sides of the transversal and outside the parallel lines, and the angles in each pair are congruent.
When Two parallel lines are cut by the transversal, __________ angles are supplementary
No parallel lines do not form angles because they remain the same distance apart from each other. But angles are formed when a transversal line cuts through them
When a transversal line cuts through parallel lines corresponding angles are formed and they are equal in sizes Alternate angles are also formed and they too are equal in size
Such a quadrangle cannot exist. The right angle must be formed by one of the parallel sides and one of the non-parallel sides. Then the angle formed at the other end of that non-parallel side would also be a right angle (the non-parallel side would be a transversal intercepting the two parallels). But then the quadrangle has two right angles, and not just one. No its Trapezoid
Transversal
yes because they will always equal 180 degrees, regardless of the angle at which the transversal intersects the two parallel lines
I am picturing two parallel lines with a transversal, If Angle two and five are corresponding then they are congruent. If they are not corresponding then they would be supplementary.
What is a angle on the opposite side of the transversal
The corresponding and alternate angles