Parallel Lines – Angle Facts

\( \text{Corresponding }\angle\text{s equal},\; \text{Alternate }\angle\text{s equal},\; \text{Co-interior }\angle\text{s sum }180^{\circ} \)
Geometry GCSE
Question 6 of 21
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\( If corresponding=80^\circ, find partner. \)

Hint (H)
Corresponding equal.

Explanation

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Statement

When a transversal cuts across two parallel lines, several special angle facts arise:

  • Corresponding angles are equal.
  • Alternate angles are equal.
  • Co-interior (allied) angles add up to \(180^{\circ}\).

These facts are fundamental in geometry proofs and angle-chasing problems.

Why it’s true

  • Corresponding angles: When two parallel lines are cut by a transversal, the 'F'-shaped angle pairs are equal because the parallel lines ensure the transversal crosses at the same slope.
  • Alternate angles: The 'Z'-shaped angle pairs are equal because each parallel line creates the same inclination with the transversal.
  • Co-interior angles: The 'C'-shaped angle pairs add to \(180^\circ\) because they are supplementary, filling a straight line when placed together.

Recipe (how to use it)

  1. Identify which type of angle pair you are working with: corresponding, alternate, or co-interior.
  2. Apply the rule:
    • Corresponding → equal.
    • Alternate → equal.
    • Co-interior → sum to \(180^{\circ}\).
  3. Solve for unknown angles accordingly.

Spotting it

Look for parallel line symbols (arrows on lines) and a transversal cutting across. Identify the 'F', 'Z', or 'C' shapes in the diagram — each corresponds to a specific angle rule.

Common pairings

  • Triangle proofs involving parallel lines.
  • Polygons with parallel sides (parallelograms, trapeziums).
  • Geometry exam questions requiring angle reasons.

Mini examples

  1. Given: Corresponding angle is \(65^\circ\). Find: other corresponding angle. Answer: \(65^\circ\).
  2. Given: Alternate angle is \(72^\circ\). Find: other alternate angle. Answer: \(72^\circ\).
  3. Given: One co-interior angle is \(110^\circ\). Find: other. Answer: \(70^\circ\).

Pitfalls

  • Mixing up alternate and corresponding angles — check carefully for 'F' vs 'Z'.
  • Forgetting co-interior are supplementary, not equal.
  • Assuming lines are parallel without checking given information.

Exam strategy

  • Always state the angle fact you are using (e.g., “alternate angles on parallel lines are equal”).
  • Look for chain reasoning — often you need two or three steps using these rules.
  • Remember co-interior pairs are not equal, but add to 180°.

Summary

Parallel lines and a transversal give rise to three key angle facts: corresponding angles equal, alternate angles equal, and co-interior angles supplementary. Recognising these patterns allows you to solve complex geometry problems efficiently.

Worked examples

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  1. If a corresponding angle is 70°, find its partner angle.
    1. Corresponding angles are equal.
    2. \( So partner = 70°. \)
    Answer: 70°
  2. If alternate angle is 65°, find the other.
    1. Alternate angles are equal.
    2. \( So answer=65°. \)
    Answer: 65°
  3. If one co-interior angle is 110°, find the other.
    1. Co-interior sum to 180°.
    2. \( 180-110=70. \)
    Answer: 70°
  4. If one corresponding angle is 85°, find the other.
    1. Corresponding equal → 85°.
    Answer: 85°
  5. If one co-interior angle is 75°, find the other.
    1. \( 180-75=105. \)
    Answer: 105°
  6. If angle at a transversal is 60°, what is its alternate angle?
    1. Alternate angles equal.
    2. \( So answer=60°. \)
    Answer: 60°
  7. If one co-interior angle is 128°, find its partner.
    1. \( 180-128=52. \)
    Answer: 52°
  8. \( In a diagram, corresponding angle=92°. Find the equal angle. \)
    1. Corresponding equal.
    2. \( So =92°. \)
    Answer: 92°
  9. \( If alternate angle=47°, find the other. \)
    1. Alternate equal.
    2. \( So =47°. \)
    Answer: 47°
  10. \( If one co-interior angle=150°, find the other. \)
    1. \( 180-150=30. \)
    Answer: 30°