Respuesta :
Answer:
(a) Time to reach maximum height, [tex]t_{H} =\frac{v_{0}\sin\theta }{g}[/tex]
(b) Time to reach the ground, [tex]t_{R} =2t_{H} =\frac{2v_{0}\sin\theta }{g}[/tex]
(c) Maximum height, [tex]H=\frac{(v_{0}\sin\theta) ^{2} }{2g}[/tex]
(d) Total horizontal distance, [tex]R=\frac{v_{0} ^{2}\sin2\theta }{g}[/tex]
Explanation:
According to the problem, v₀ is initial speed, g is acceleration due to gravity and θ is angle with respect to the horizontal.
The horizontal and vertical components of the initial speed are v₀cosθ and v₀sinθ respectively.
There is no acceleration acting horizontally on the projectile but there is vertical acceleration g is acting on the projectile.
(a) The equation of motion along vertical direction is:
v = v₀sinθ - gt
At maximum height, the speed of projectile is zero i.e.v is zero in the above equation. Thus, the above equation becomes :
[tex]0=v_{0}\sin\theta-gt_{H}[/tex]
[tex]t_{H} =\frac{v_{0}\sin\theta }{g}[/tex]
(b) The time at which projectile hits the ground is :
[tex]t_{R} =2t_{H} =\frac{2v_{0}\sin\theta }{g}[/tex] ....(1)
(c) The equation of motion along vertical direction is :
v² = (v₀sinθ)² - 2gs
Here s is the vertical height of the projectile.
At maximum height H, v is zero. So, the above equation becomes :
[tex]0=(v_{0}\sin\theta) ^{2}-2gH[/tex]
[tex]H=\frac{(v_{0}\sin\theta) ^{2} }{2g}[/tex]
(d) The equation of motion along horizontal is :
x = (v₀cosθ)t
Here x is horizontal distance travel by projectile.
The total distance (R) traveled by projectile is :
[tex]R=(v_{0}\cos\theta)t_{R}[/tex]
Substitute the equation (1) in above equation.
[tex]R=\frac{2v_{0} ^{2} \sin\theta\cos\theta}{g}[/tex]
Using trigonometry relation:
2sinθcosθ = sin2θ
[tex]R=\frac{v_{0} ^{2}\sin2\theta }{g}[/tex]
