Question

9. A projectile is fired with a velocity u making an angle θ with the horizontal. Show that its trajectory is a  parabola. Derive expressions for (i) time of maximum height (ii) time of flight (iii) maximum height  (iv) horizontal range​

Answer 1

Answer:

Consider the following equations of a projectile with angle  

of projection θ and initial velocity v  

0

​  

 - here  

x=v  

ox

​  

t refer to book ;  

rearrange the expression for time  t ,

t=  

v  

0x

​  

 

x

​  

 

substituted  

v  

ox

​  

 

x

​  

 for in the expression  

y=(v  

0

​  

sinθ)t−  

2

1

​  

gt  

2

 

 y=v  

oy

​  

(  

v  

ox

​  

 

x

​  

)−  

2

1

​  

g(  

v  

0x

​  

 

x

​  

)  

2

 

substitute v  

o

​  

cosθ  for v  

ox

​  

sin θ   for v  

oy

​  

 

in the above expression.  

Y=(v  

0

​  

sinθ)(  

v  

o

​  

cosθ

x

​  

)−  

2

1

​  

g(  

v  

o

​  

cosθ

x

​  

)  

2

 

Hence the obtained equation of the projectile is  

Y=(tanθ)x−(  

2(v  

o

​  

)  

2

 

gsec  

2

θ

​  

)x  

2

 

The expression is to be obtained in the form of  

Y = ax+bx  

2

 .

hence it is a parabolic motion so from it we get  all the required quantities

( 1 )    T =  

g

2v  

o

​  

sinθ

​  

 

( 2 )   H  

max

​  

=  

2g

v  

o

2

​  

sin  

2

θ

​  

 

( 3 )  Range =  

g

v  

o

2

​  

sin2θ

​  

 

Explanation: