سؤال 14
How far horizontally from the base of the building does the ball strike the ground? >>
X = Vx(T)
where
X = horizontal distance from base of building where ball will land
Vx = horizontal component of velocity
T = time ball strikes the ground after being tossed
Substituting appropriate values,
X = 8(cos 20)(3)
X = 22.55 m
<< Fund the height from which the ball was thrown. >>
Y = Vy(T) + (1/2)(g)T^2
Y = height from which ball was thrown
Vy = vertical component of the velocity
T = time when ball strikes the ground
g = acceleration due to gravity = 9.8 m/sec^2 (constant)
Substituting appropriate values,
Y = 8(sin 20)(3) + (1/2)(9.8)(3^2)
Y = 52.31 meters
<< How long does it take the ball to reach a point 10.0 m below the level of launching? >>
Formula is
S = Vy(T) + (1/2)(g)T^2
where
S = 10 m
Vy = 8(sin 20)
g = 9.8 m/sec^2
T = time for ball to reach a point 10 m below the launching level
Substituting values,
10 = 8(sin 20)T + (1/2)(9.8)T^2
Rearranging the above,
1/2)(9.8)T^2 + 8(sin 20)T - 10 = 0
Solving for "T" using the quadratic formula,
T = 0.22 sec.