Equation of trajectory for a projectile is y = 2x{1-(x/40)} (where x and y are in meter). What will be the range of the projectile?

1 Answer
Nov 1, 2016

Let the velocity of projection of the projectile in x-y plane from the origin (0,0) be u with angle of projection #alpha# with the horizontal direction (x-axis).
The vertical component of the velocity (along y-axis) of projection is #usinalpha# and the horizontal component is #ucosalpha#

Now if the time of flight be T then the object will return to the ground after T sec and during this T sec its total vertical displacement h will be zero. So applying the equation of motion under gravity we can write
#h=usinalphaxxT+1/2gT^2#
# =>0=uxxT-1/2xxgxxT^2#
where #g="acceleration due to gravity"#
#:.T=(2usinalpha)/g#
The horizontal displacement during this T sec or the Range ,#R=ucosalpha xxT#

#=>R=(2u^2sinalphacosalpha)/g...(1)#

Let the position of the projectile in x-y plane after t sec of its projection be #(x,y)#

The horizontal displacement during t sec

#x=ucosalphaxxt....(2)#

And the vertical displacement during t sec

#y=usinalphaxxt-1/2xxgxxt^2.....(3)#

Combining (1) and (2) we get

#y=usinalphaxxx/(ucosalpha)-(gx^2)/(2u^2cos^2alpha)#

#=>y=xtanalpha-x^2/((2u^2cos^2alpha)/g)....(4)#

This is the equation of the trajectory,we obtained.

Now in the given problem the equation of the trajectory is

#y=2x(1-x/40)#

#=>y=2x-x^2/20......(5)#

Comparing (4) and (5) we get

#tanalpha=2.....(6)#

and

#(2u^2cos^2alpha)/g=20.....(7)#

Multiplying (6) by (7) we get

#(tanalphaxx2u^2cos^2alpha)/g=2xx20#

# =>(2u^2sinalphacosalpha)/g=40#

#=>R=40#

So Range of the projectile #R=40m#