Correct Answer

Answer: d. 90° to each other

At the highest point of a projectile’s trajectory, the ball’s velocity is purely horizontal while its acceleration due to gravity is vertical downward, making them perpendicular.

Option Analysis

• a. Parallel to each other: Incorrect. Parallel vectors point in the same direction, but horizontal velocity and downward acceleration never align.
• b. Anti-parallel to each other: Incorrect. Anti-parallel means opposite directions (180°), which does not match the horizontal-vertical relationship.
• c. Inclined to each other at an angle of 45°: Incorrect. No 45° angle exists; the directions are exactly orthogonal.
• d. 90° to each other: Correct. Velocity has zero vertical component (v_y = 0), leaving only horizontal (v_x); acceleration is g downward.

Projectile Motion Basics

In projectile motion, the initial velocity splits into horizontal (v_x = v₀cosθ) and vertical (v_y = v₀sinθ) components. The horizontal velocity remains constant (ignoring air resistance). The vertical velocity becomes zero at the peak:

v_y = 0 = v₀sinθ − gt, hence t = v₀sinθ / g.

Acceleration remains ⃗a = −gĵ (downward).

Introduction to Ball Trajectory Physics

When a person throws a ball across a field, it follows a parabolic path under gravity. The ball’s highest point of trajectory marks where vertical motion reverses. Here, velocity is horizontal and acceleration vertical — perpendicular at 90°.

Velocity and Acceleration Directions

At the apex:

• Vertical velocity component becomes zero while the horizontal component persists.
• Acceleration due to gravity acts solely downward (g ≈ 9.8 m/s²).

Vectors: ⃗v = v_xî, ⃗a = −gĵ. The dot product ⃗v ⋅ ⃗a = 0 confirms perpendicularity.

Summary:

• Horizontal velocity remains unchanged.
• Vertical velocity becomes zero.
• Acceleration stays constant and downward.

Common Exam Misconceptions

Students often confuse this with a vertical throw, where velocity and acceleration are both vertical (velocity zero, acceleration downward). For an angled projectile, velocity never fully vanishes at the peak. Options like “parallel” or “45°” fail under vector analysis.

Practical Implications

This principle applies in sports, ballistics, and animation physics. Time to reach the peak is given by:

t = v₀sinθ / g

Maximum height achieved:

h = (v₀²sin²θ) / (2g)