Question

From the same place at 7 am 'A' started walking in the north at the speed of 5 km/hr. After
1 hour, B started cycling in the east at a speed of 16 km/hr. At what time they will be at a
distance of 52 km apart from each other?
​

Answer 1

Answer:

Let t= travel time of bicycle

then (t+1)= Walking time

Distance = Speed × Time

This is a Pythagoras problem

a

2

+b

2

=c

2

Where a=8t, bicycle distance

b=4(t+1), Walking distance

c=20, distance apart in t hrs from 8 a.m.

∴(8t)

2

+[4(t+1)]

2

=(20)

2

64t

2

+16(t

2

+1+2t)=400

64t

2

+16t

2

+32t+16=400

80t

2

+32t−384=0

16(5t

2

+2t−24)=0

5t

2

+2t−24=0

5t

2

+(12−10)t−24=0

5t

2

+12t−10t−24=0

5t

2

−10t+12t−24=0

5t(t−2)+12(t−2)=0

(t−2)(5t+12)=0

t=2

and t=−

15

12

which is not possible.

Positive solution t=2 hrs.

At 10 a.m. they will be 20 km apart.