At 8 a.m., Neave started from City E and travelled towards City F and his speed remained constant throughout. At 10 a.m., Sabrina started her journey from City E towards City F at an average speed of 90 km/h. Sabrina overtook Neave at 2 p.m. After overtaking, Sabrina carried on her journey at the same average speed and reached at City F at 2:40 p.m.
- Find Neave's average speed in km/h.
- What is the distance between the two cities?
(a)
From 10 a.m. to 2 p.m. = 4 h
Distance that Sabrina had travelled until Sabrina overtook Neave
= 4 x 90
= 360 km
From 8 a.m. to 2 p.m. = 6 h
Neave's average speed
= 360 ÷ 6
= 60 km/h
(b)
From 10 a.m. to 2:40 p.m. = 4 h 40 min
1 h = 60 min
4 h 40 min = 4
40 60
h = 4
23 h
Distance between the two cities
= 4
23 x 90
=
143 x 90
= 420 km
Answer(s): (a) 60 km/h; (b) 420 km