Answer:
The speed of boat in still water is 11 km/h
The speed of current is 7 km/h
Step-by-step explanation:
Given as :
The speed in downstream = 18 km/h
The speed in upstream = 4 km/h
Let The speed of boat in still water = x km/h
Let The speed of current = y km/h
Now, According to question
∵ downstream speed = 18
So, x + y = 18 km/h .........A
∵ upstream speed = 4
So, x - y = 4 km/h ..........B
Now, Solving equation A and B
(x + y) + (x - y) = 18 + 4
Or, (x + x) + (y - y) = 22
Or, 2 x + 0 = 22
∴ x = [tex]\dfrac{22}{2}[/tex]
i.e x = 11 km/h
So, The speed of boat = x = 11 km/h
Now, Put The value of x into eq A
∵ x + y = 18
Or, 11 + y = 18
∴ y = 18 - 11
i.e y = 7 km/h
So, The speed of current = y = 7 km/h
Hence,The speed of boat in still water is 11 km/h and The speed of current is 7 km/h . Answer
