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Question
CDEF is a rectangle. Find the angles a and b, if ∠DCE = 32°.
Sum
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Solution
Given:
- CDEF is a rectangle.
- ∠DCE = 32°.
- Need to find angles a and b.
Step-wise calculation:
1. In rectangle CDEF, diagonals CE and DF intersect, creating triangles within the rectangle.
2. Since it’s a rectangle, angles at vertices like C and F are right angles (90°).
3. Triangle DCE involves angle ∠DCE = 32°.
4. Angle a at point E in triangle CDE is found by angle sum property:
Triangle CDE is right angled at D (90°).
Sum of angles in triangle CDE = 180°, so a = 180° – 90° – 32° = 58°.
5. To find angle b at F:
By symmetry, angle b is complementary to angle at C.
Angle b = 32° equal to ∠DCE because diagonals in a rectangle create congruent angles at opposite vertices.
Angle a = 58°
Angle b = 32°
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