Flashcard Set: Angles Theorems & Pairs
Front: Alternate Exterior Angles
Back: Outside the lines, opposite sides of the transversal. Equal if lines are parallel. mā A = mā B
Front: Alternate Interior Angles
Back: Inside the lines, opposite sides of the transversal. Equal if lines are parallel. mā A = mā B
Front: Complementary Angles
Back: Two angles that add up to a right angle. mā 1 + mā 2 = 90Ā°
Front: Supplementary Angles
Back: Two angles that add up to a straight line. mā 1 + mā 2 = 180Ā°
Front: Perpendicular Lines
Back: Lines that make four right angles. Each angle = 90Ā°
Front: Same-Side Exterior Angles
Back: Outside the lines, same side of transversal. Supplementary if lines are parallel. mā 1 + mā 2 = 180Ā°
Front: Same-Side Interior Angles
Back: Inside the lines, same side of transversal. Supplementary if lines are parallel. mā 1 + mā 2 = 180Ā°
Front: Corresponding Angles
Back: Same position on the lines (top-left with top-left). Equal if lines are parallel. mā A = mā B
Front: Vertical Angles
Back: Across from each other when lines cross. Always equal. mā 1 = mā 2
Front: Linear Pair Theorem
Back: Two angles forming a straight line. mā 1 + mā 2 = 180Ā°
Front: Angle Bisector Theorem
Back: A line splits an angle into two equal angles. mā 1 = mā 2
Front: Alternate Interior Angles Theorem
Back: Alternate interior angles are equal if lines are parallel. mā A = mā B
Front: Alternate Exterior Angles Theorem
Back: Alternate exterior angles are equal if lines are parallel. mā A = mā B
Front: Same-Side Interior Angles Theorem
Back: Same-side interior angles are supplementary if lines are parallel. mā 1 + mā 2 = 180Ā°
Front: Same-Side Exterior Angles Theorem
Back: Same-side exterior angles are supplementary if lines are parallel. mā 1 + mā 2 = 180Ā°
Front: Perpendicular Lines Theorem
Back: Perpendicular lines make four right angles
Updated 6d ago
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