PSLE In the figure, KLQR is a parallelogram and MNPQ is a rhombus. RQP is a straight line. ∠LKR = 58°, ∠QLM = 25° and ∠NMP = 32°.
- Find ∠LQM.
- Find ∠LMN.
(a)
∠LQR
= ∠LKR
= 58° (Parallelogram)
∠NPM
= ∠NMP
= 32° (Isosceles triangle)
∠MNP
= 180° - 32° - 32°
= 103° (Angles sum of triangle)
∠MQP
= ∠MNP
= 103° (Rhombus)
∠LQM
= 180° - 58° - 103°
= 19° (Angles on a straight line)
(b)
∠LMQ
= 180° - 25° - 19°
= 136° (Angles sum of triangle)
∠PMQ
= ∠NMP
= 32° (Rhombus)
∠LMN
= 360° - 136° - 32° - 32°
= 160° (Angles at a point)
Answer(s): (a) 19°; (b) 160°