Answer:
The projectile takes 2.04 s to reach its maximum height.
Explanation:
The maximum height of the projectile is given by the relation :
[tex]H=\frac{u^{2}\sin^{2}\theta }{2g}[/tex] .....(1)
Here H is height, u is initial speed, g is acceleration due to gravity and θ is projectile angle with respect to horizontal.
Substitute 25 m/s for u, 9.8 m/s² for g and 36.9° for θ in equation (1).
[tex]H=\frac{(25)^{2}\times\sin^{2}\36.9 }{2\times9.8}[/tex]
H = 11.50 m
The equation of motion for vertical direction is :
v = u cosθ - gt
Here v is the vertical speed and t is time.
At maximum height, v is zero. So, the above equation in terms of t becomes :
t = (u cosθ)/g
Substitute the suitable values in the above equation:
t = [tex]\frac{25\times\cos36.9}{9.8}[/tex]
t = 2.04 s
