Kinematics in One Dimension –Multiple Choice Practice Questions for AP Physics B & C

All posts related to kinematics on this blog can be accessed either by clicking on the label ‘kinematics’ below this post or by performing a search using the search box at the top of this page. Today I give you a few multiple choice practice questions with solution:

(1) A stone projected vertically up is found to be at a height h at times 1 s and 3 s. Neglect air resistance and assume that g = 10 ms^–2. The maximum height reached by the stone is

(a) 60 m

(b) 50 m

(c) 44 m

(d) 22 m

(e) 20 m

Evidently the stone reaches the same height h first during its upward trip and next during its downward trip. But you need not bother about this because everything is contained in the equation of motion, x – x₀ = v₀t + ½ at² (or, s = ut + ½ at²)

Considering the two cases given in the question, since a = – g (taking upwrd as positive and therefore downward negative), we have

h = v₀×1 – ½ ×10×1² = v₀×3 – ½ ×10×3² from which

2v₀ = 40 so that v₀ = 20 ms^–1

The naximum height h_max reached is given by by 0 = v₀² – 2gh_max

[This is the equation, v² = v₀² + 2a(x – x₀) which can also be written as v² = u² + 2as]

Therefore, h_max = v₀²/2g = 20²/(2×10) = 20 m

(2) A food packet is released from a helicopter ascending vertically up with uniform velocity of 2 ms^–1. Neglect air resistance and assume that g = 10 ms^–2. The velocity of the packet at the end of 0.2 s will be

(a) 5 ms^–1

(b) 4 ms^–1

(c) 2 ms^–1

(d) 1 ms^–1

(e) zero

The initial velocity v₀ of the packet is 2 ms^–1 and is directed upwards. The gravitational acceleration is directed downwards. The velocity v of the packet at time t is given by

v = v₀ – gt.

[Note that we have taken the upward vector as positive and hence the downward vector as negative].

Substituting for v₀, g and t, v = 2 – (10×0.2) = 0.

[After getting released, the packet moves upwards for 0.2 s with uniformly decreasing speed, momentarily comes to rest and then moves downwards with uniformly increasing speed].

(3) An astronaut on a planet having no atmosphere throws a stone of mass m vertically upwards with velocity 10 ms^–1. It reaches maximum height of 10 m. If another stone of mass 2m is thrown upwards with velocity 20 ms^–1, the maximum height reached will be

(a) 80 m

(b) 40 m

(c) 30 m

(d) 20 m

(e) 10 m

The maximum height (h_max) reached is given by

h_max = v₀²/2g

[Remember v² = v₀² + 2a(x – x₀) which can be written as v² = v₀² – 2gh_max for projection vertically apwards]

Substituting for h_max (= 10 m) and v₀ (= 10 ms^–1), the acceleration due to gravity (g) on the planet is obtained as 5 ms^–2.

For a given velocity of projection, the height reached is independent of the mass of the stone.

When the velocity of projection is changed to 20 ms^–1, the maximum height reached is 20²/(2×5) = 40 m.

[You may note that the maximum height is directly proportional to the square of the velocity of projection. If the velocity of projection is doubled, the maximum height reached must be quadrupled as in the present problem].

The following question is specifically for AP Physics C aspirants. But AP Physics B aspirants too can ‘enjoy’ it.

(4) A ball thrown vertically up from the ground moves very close to an open window of a room in the first floor of a building. A student in the room sees the ball through the window, when the ball moves up as well as when it move down. The height of the window is 2 m and the ball is in view for a total time of 0.2 s. Take g = 10 ms^–2. How high above the top of the window does the ball go (approximately)?

(a) 19 m

(b) 20 m

(c) 21 m

(d) 24 m

(e) 25 m

Since the total time for which the ball is in view is 0.2 s, the time taken by the ball to traverse the height of the window is 0.1 s. The average upward velocity (v) of the ball while moving past the window is 2/0.1 = 20 ms^–1. We may take this to be very nearly equal to the velocity of the ball at the centre of the window.

Therefore, the maximum height reached by the ball (from the centre of the window) is given by

h_max = v²/2g = 20²/(2×10) = 20 m.

[We have used the equation, v² =u² + 2as where a = – g and s = h_max].

Therefore, the ball goes to a height of nearly 19 m above the top of the window [Option (a)].

[Since the motion of the ball is accelerated, the average velocity is not exactly equal to the velocity at the centre of the window. The answer we obtain is an approximate one.

If you wnt to calculate the exact height, you will proceed as follows:

If t is the time taken by the ball to fall from the topmost point of the trajectory to the top of the window, the maximum height h_max (measured from the top of the window) is given by

h_max = 0 + ½ gt² = 5 t² ………(i)

Also, (h_max + 2) = 0 + ½ g (t +0.1)² = 5t² + 5×0.01 + 5×2×0.1t

Or, h_max + 2 = 5 t² + 0.05 + t ……….(ii)

Subtracting Eq (i) from Eq (ii) we obtain t = 1.95 s.

Therefore, h_max = 5 t² = 5×(1.95)² = 19.0125 m.

Kinematics - Practice Questions (MCQ) for AP Physics B & C

“Clarity about the aims and problems of socialism is of greatest significance in our age of transition.”

–Albert Einstein

You can access all posts on kinematics on this site by clicking on the label ‘kinematics’ below this post. Or, you may try searching for ‘kinematics’ using the search box at the top of this page.

Today I give you three more multiple choice practice questions with solution:

(1) Tom runs from his school to his home with uniform speed v₁ and returns to his school with uniform speed v₂. The average speed of his round trip is

(a) (v₁ + v₂)/2

(b) [(v₁² + v₂²)/2]^1/2

(c) (v₁v₂)^1/2

(d) v₁v₂/(v₁ + v₂)

(e) 2v₁v₂/(v₁ + v₂)

The average speed is the ratio of the total distance traveled to the total time taken.

If the distance between Tom’s school and his home is s, the total distance for the round trip is 2s and the total time for the round trip is (s/v₁ + s/v₂).

Therefore, average speed = 2s/(s/v₁ + s/v₂) = 2v₁v₂/(v₁ + v₂)

(2) The displacement ‘y’ of a particle thrown vertically down is given by the equation, y = 2t + 5t², where y is in metre and t is in second. The average velocity during the time interval from 2 s to 2.1 s is

(a) 12.5 ms^–1

(b) 16 ms^–1

(c) 20.5 ms^–1

(d) 22.5 ms^–1

(e) 32 ms^–1

The velocity ‘v’ of the particle at the instant t is given by

v = dy/dt = 2 + 10t

Therefore, velocities at instants 2 s and 2.1 s are respectively 2 + 10×2 = 22 ms^–1 and 2 + 10×2.1 = 23 ms^–1.

The average velocity v_average during during the time interval from 2 s to 2.1 s is given by

v_average = (22 + 23)/2 = 22.5 ms^–1

[The above question can be answered without using calculus (as in the case of some of the AP Physics B aspirants) like this:

The displacement y is in the form for uniformly accelerated motion in one dimension: y = v₀t + ½ at² where v₀ is the initial velocity and ‘a’ is the acceleration. Therefore, v₀ = 2 ms^–1 and a = 10 ms^–2.

The velocity ‘v’ at the instant t is given by v = v₀ + at = 2 + 10t].

The following question is meant specifically for AP Physics C aspirants:

(3) At the instant t, the position ‘x’ of a particle moving along the x-axis is given by x = 12t² – 2t³ where x is in metre and t is in second. What will be the position of this particle when it moves with the maximum speed along the positive x direction?

(a) 32 m

(b) 36 m

(c) 40 m

(d) 48 m

(e) 52 m

The speed v of the particle is given by

v = dx/dt = 24t – 6t².

When the speed is maximum we have dv/dt = 0

Therefore, 24 – 12t = 0 from which t = 2 s.

The position of the particle at 2 seconds will be 12×(2)² – 2×(2)³ = 48 – 16 = 32 m (as obtained from x = 12t² – 2t³).

Useful posts in this section can be seen at physicsplus.