A. Corresponding Angles
B. Alternate Interior
C. Alternate exterior
D. Same-side Interior
E. Same-side exterior
F. Interior Angles
1. angle D and angle H
2. angle A and angle H
3. angle B and angle E
4. angle D and angle E
5. angle B , angle G , angle D and angle E
Share
Answer:
1.) A. CORRESPONDING ANGLES
2.) C. ALTERNATE EXTERIOR
3.) D. SAME SIDE INTERIOR
4.) B. ALTERNATE INTERIOR
5.) B. ALTERNATE INTERIOR
TRANSVERSAL LINE — A LINE INTERSECTING TWO OR MORE COPLANAR LINES AT DIFFERENT POINTS.
CORRESPONDING ANGLE THEOREM — IF TWO PARALLEL LINES ARE CUT BY A TRANSVERSAL,THEN CORRESPONDING ANGLES ARE CONGRUENT.
ALTERNATE INTERIOR ANGLE THEOREM — IF TWO LINES ARE CUT BY A TRANSVERSAL,THEN ALTERNATE INTERIOR ANGLES ARE CONGRUENT.
ALTERNATE EXTERIOR ANGLE THEOREM — IF TWO PARALLEL LINES ARE CUT BY A TRANSVERSAL,THEN ALTERNATE EXTERIOR ANGLES ARE CONGRUENT.
SAME SIDE INTERIOR ANGLE THEOREM — IF TWO PARALLEL LINES ARE CUT BY TRANVERSAL,THEN SAME SIDE INTERIOR ANGLES SUPPLEMENTARY.
VERTICAL ANGLE THEOREM — IT IS STATES THAT VERTICAL ANGLES, ANGLES THAT ARE OPPOSITE EACH OTHER AND FORMED BY TWO INTERSECTING LINES ARE CONGRUENT.
LINEAR PAIRS — LINEAR PAIRS ARE PAIRS OF ADJUSTMENT ANGLES THAT SUM UP TO 180⁰(SUPPLEMENTARY)
Step-by-step explanation:
I HOPE IT'S HELP
(4&5 are the same answer because it's alternate interior angle)