Vertically Opposite Angles

\( \text{Opposite angles at an intersection are equal} \)
Geometry GCSE
Question 3 of 20
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\( Angle = 200° (reflex). Find the opposite angle. \)

Tips: use ^ for powers, sqrt() for roots, and type pi for π.
Hint (H)
Vertically opposite angles are equal, even if reflex.

Explanation

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Statement

When two straight lines cross, the opposite (or “vertical”) angles at the intersection are equal:

\[ \angle A = \angle C, \quad \angle B = \angle D \]

This is true for any pair of intersecting lines.

Why it’s true

  • At an intersection, each pair of adjacent angles makes a straight line, so they add to 180°.
  • If one angle is known, the one next to it is 180° minus that value.
  • The angle opposite must then equal the first angle, since both complete the same straight line.

Recipe (how to use it)

  1. Identify two straight lines crossing.
  2. Find the given angle.
  3. State that the angle directly opposite is equal.

Spotting it

Look for an “X” shape formed by two lines. The equal angles are opposite across the intersection.

Common pairings

  • Often used with angles on a straight line = 180°.
  • Can be combined with parallel line rules in more complex diagrams.

Mini examples

  1. Given: One angle is 65°. Find: Opposite angle. Answer: 65°.
  2. Given: One angle is 120°. Find: Opposite angle. Answer: 120°.

Pitfalls

  • Confusing “opposite” with “adjacent”.
  • Forgetting that only opposite pairs are equal, not all angles at the intersection.

Exam strategy

  • Mark all four angles at the intersection.
  • Use straight line (180°) and vertically opposite angle facts together.
  • Check carefully which angle the question is asking for.

Summary

Vertically opposite angles are equal whenever two straight lines cross. This simple rule often unlocks more complex angle problems when used with other angle facts.

Worked examples

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  1. At an intersection, one angle is 70°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=70°. \)
    Answer: 70°
  2. Lines cross and one angle is 45°. Find its opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=45°. \)
    Answer: 45°
  3. At an intersection, one angle is 120°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=120°. \)
    Answer: 120°
  4. Two lines cross. One angle is 85°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=85°. \)
    Answer: 85°
  5. At a crossing, one angle is 150°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=150°. \)
    Answer: 150°
  6. Lines cross and one angle is 35°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=35°. \)
    Answer: 35°
  7. At an intersection, one angle is 95°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=95°. \)
    Answer: 95°
  8. Two lines intersect. One angle is 160°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=160°. \)
    Answer: 160°
  9. One angle at an intersection is (2x+10)°. Find the opposite angle in terms of x.
    1. Opposite angles are equal.
    2. \( Answer=(2x+10)°. \)
    Answer: (2x+10)°
  10. One angle is (3y-5)°. Find the opposite angle.
    1. Opposite angles are equal.
    2. \( Answer=(3y-5)°. \)
    Answer: (3y-5)°