A motorboat goes downstream in river and covers a distance between two coastal towns in 6 hours. It covers this distance upstream in 8 hours. If the speed of the stream is 2 km/hr, find the speed of the boat in still water. [4 MARKS]
A motorboat goes downstream in river and covers a distance between two coastal towns in 6 hours. It covers this distance upstream in 8 hours. If the speed of the stream is 2 km/hr, find the speed of the boat in still water. [4 MARKS]
Concept: 2 Marks
Application: 2 Marks
Let the speed of the boat in still water =x km/hr.
Speed of the boat downstream =(x+2) km/hr.
Time taken to cover the distance = 6 hrs
Therefore, distance covered in 6 hrs
=(x+2)×6 (Distance=Speed×Time)
Speed of the boat upstream =(x−2) km/hr
Time taken to cover the distance = 8 hrs.
Therefore, distance covered in 8 hrs =8(x−2)
Therefore, the distance between two coastal towns is fixed, i.e. same.
According to the question,
6(x+2)=8(x−2)
⇒6x+12=8x−16
⇒6x−8x=−16–12
⇒−2x=−28
⇒x=14
Required speed of the boat is 14 km/hr.
Concept: 2 Marks
Application: 2 Marks
Let the speed of the boat in still water =x km/hr.
Speed of the boat downstream =(x+2) km/hr.
Time taken to cover the distance = 6 hrs
Therefore, distance covered in 6 hrs
=(x+2)×6 (Distance=Speed×Time)
Speed of the boat upstream =(x−2) km/hr
Time taken to cover the distance = 8 hrs.
Therefore, distance covered in 8 hrs =8(x−2)
Therefore, the distance between two coastal towns is fixed, i.e. same.
According to the question,
6(x+2)=8(x−2)
⇒6x+12=8x−16
⇒6x−8x=−16–12
⇒−2x=−28
⇒x=14
Required speed of the boat is 14 km/hr.
