Answer :
Answer:
a) 2.282 m
b) 1.481 m
Explanation:
Given:
Initial velocity, V = 5.5 m/s
thus,
component of velocity in y-direction, [tex]V_y[/tex] = V sin53°
= 5.5 × sin53°
= 4.39 m/s
Component of velocity in x - direction, Vₓ = V cos58°
= 5.5 × cos53°
= 3.31 m/s
Also,
Final velocity in y direction, [tex]V'_y[/tex] = 0 m/s ( at the highest point )
Now,
From Newton's equation of motion
[tex]V'_y^2 = V_y^2 + 2a_yy[/tex]
here, y is the distance travelled in y-direction
[tex]a_y[/tex] is the acceleration in y direction i.e acceleration due to gravity 'g = -9.81'
here negative sign depicts the direction of acceleration is opposite to the direction of motion
or
y =[tex]\frac{V'_y^2 - V_y2 }{2a_y}[/tex]
on substituting the respective values, we get
y = [tex]\frac{0^2 - 4.39^2 }{2\times(-9.81)}[/tex]
or
y = 0.982
Hence,
the total height above the ground = y + height of ramp
= 0.982 + 1.3
= 2.282 m
b)
From Newton's equation of motion
[tex]V'_y=V_y+at[/tex]
here t is the time
thus,
[tex]0=4.39+(-9.81)t[/tex]
or
t = 0.447 seconds
Also,
Distance = Speed × time
thus,
Horizontal distance = Vₓ × t
or
Horizontal distance = 3.31 × 0.447
or
Horizontal distance = 1.481 m