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The Figure Represents the Parabolic Trajectory of a Ball Going $\theta$

Question 2

Multiple Choice

The figure represents the parabolic trajectory of a ball going from a to e in Earth gravity but without air resistance. The initial velocity of the ball is V_o at an angle $\theta$ to the horizon. The vertical dashed lines represent equal time interval, $\Delta$ t. Consider UP as the positive direction. $The figure represents the parabolic trajectory of a ball going from a to e in Earth gravity but without air resistance. The initial velocity of the ball is Vo at an angle \theta to the horizon. The vertical dashed lines represent equal time interval, \Delta t. Consider UP as the positive direction. The vertical velocity at point c is [Note: g = 9.81 m/s2) ] A) Vo cos \theta ) . B) Vo cos \theta ) - ½ g 3 \Delta t) 2. C) Vo sin \theta ) - ½ g 3 \Delta t) 2. D) 0. E) Vo cos \theta ) + ½ g 3 \Delta t) 2.$ The vertical velocity at point c is [Note: g = 9.81 m/s²) ]

A) V_o cos $\theta$ ) .
B) V_o cos $\theta$ ) - ½ g 3 $\Delta$ t) ².
C) V_o sin $\theta$ ) - ½ g 3 $\Delta$ t) ².
D) 0.
E) V_o cos $\theta$ ) + ½ g 3 $\Delta$ t) ².

The Figure Represents the Parabolic Trajectory of a Ball Going θ\thetaθ

Multiple Choice

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The Figure Represents the Parabolic Trajectory of a Ball Going $\theta$

Correct Answer:
Verified