In the figure, O Is the centre of the circle and CG is parallel to DE. FH = FG, ∠ODC = 58° and ∠HGF = 50°. Find
- ∠EDK
- ∠DEF
(a)
OC = OD = Radius
∠CDO = ∠DCO = 58° (Isosceles triangle, OCB)
∠DOK
= 58° + 58°
= 116° (Exterior angle of a triangle)
OD = OK = Radius
∠OKD
= (180° - 116°) ÷ 2
= 64° ÷ 2
= 32°
∠EDK = 32° (Alternate angles, DE//CE)
(b)
FH = FG
∠FGH = ∠FHG = 50° (Isosceles triangle FGF)
∠GFH
= 180° - 50° - 50°
= 80°
∠KFE = ∠GFH = 80° (Vertically opposite angles)
∠DEF
= 180° - 80°
= 100° (Interior angles)
Answer(s): (a) 32°; (b) 100°