Answer:
The speed of plane in still air is 330 kmph
Step-by-step explanation:
Given as :
The distance cover against the wind = 600 km
The time taken against the wind = 2 hours
The distance cover with the wind = 600 km
The time taken with the wind = ( 1 + [tex]\frac{2}{3}[/tex] ) hours
= [tex]\frac{5}{3}[/tex] hours
Let The speed against the wind = x - y kmph
The speed with the wind = x + y kmph
where x is the speed of plane in still air
And y is the speed of wind
So , Speed = [tex]\dfrac{\texrm Distance}{\texrm Time}[/tex]
Or, x - y = [tex]\frac{600}{2}[/tex] = 300 ......A
And x + y = [tex]\frac{600}{\frac{5}{3} }[/tex]
Or , x + y = 360 .......B
From eq A and B
( x + y ) - ( x - y ) = 360 - 300
Or, 2 y = 60
∴ y = [tex]\frac{60}{2}[/tex] = 30 kmph
And x = 360 - 30 = 330 kmph
Hence The speed of plane in still air is 330 kmph Answer
