Physics
NYA Mechanics
Examination

Part I

A water balloon is thrown by Sandra out of her dormitory window at an angle of 60º. It lands at the feet of Chris, who is standing a horizontal distance of 6.00 m from the building. If it takes 2.50 s to reach Chris’s feet, determine the height h that Sandra threw it from.

The equations of the motion of the ballon are:

y = h + vo sin 60 t - (1/2) g t²
x = vo cos 60 t

y = h + (√3 /2) vo t - (g/2) t²
x = (vo/2) t

At t = 2.50 s, x = 6.00 m and y = 0 . So

6 = (vo/2) 2.5. Hence vo = = 6 x 2 /2.5 = 4.8 m/s

vo = 4.8 m/s

0 = h + (√3 /2) (4.8) (2.50) - (g/2) (2.50)²

h = (9.8/2) (2.50)² - (√3 /2) (4.8) (2.50)
h = 20.23 m

h = 20.23 m

The tub of your top-loading washing machine goes into its spin cycle, starting from rest and increasing its angular speed at the rate of 8.00 rad/s². At the moment its angular speed reaches 5.00 revolutions per second, you open the lid and the safety switch turns it off; the tub then takes 12.0 s to come to rest with a uniform acceleration.

a) What is the angular speed in rad/s when you open the lid ?

b) What is the angular acceleration of the tub, in rad/s2, for the last 12.0 s of the motion ?

c) Through how many revolutions does the tub turn in the last 12.0 s ?

d) The tub of the washer has a radius of 20.0 cm. For a point on the edge of the tub at the instant immediately before you open the lid of the machine determine:

(i) The radial (centripetal) acceleration,
(ii) The tangential acceleration,
(iii) The magnitude of the total (net) acceleration.


Answers

a) ω = 5 x 2 π = 31.4 rad/s

ω = 31.4 rad/s

b) ω = ω_o + αt

α = (ω - ω_o)/t = (0 - 31.4)/12 = - 2.62 rad/s2

α = - 2.62 rad/s²

c) θ = θ_o + ω_o t + (1/2) α t²
= 0 + 31.4 x 12 + (1/2)(-2.62)(12²) = 189 rad = 189/2Ï€ = 30 rev

θ = 189 rad = 30 rev

d) i) a_r = (31.4)² x 20 /100 = 197.2 m/s²

a_r = 197.2 m/s²

ii) a_t = 8.00 x 20 /100 = 1.6 m/s²

a_t = 1.6 m/s²

a² = a_r² + a_t² = (197.2)² + (1.6)²

a = 197 m/s²

a = 197 m/s²

A bag of cement, of mass m, hangs from three wires as shown in the figure. Two of the wires make angles θ1 and θ2, respectively, with the horizontal. Show that if the system is in equilibrium then:

T1 = mg/(sin θ1 + cos θ1 tan θ2)


Answers

An horizontal projection of the forces gives :

T1 cos θ1 = T2 cos θ2         (1)

An vertical projection of the forces gives :

T1 sin θ1 + T2 sin θ2 = m g         (2)

Substituting (1) in (2) yields:

T1 = mg/(sin θ1 + cos θ1 tan θ2)

T1 = mg/(sin θ1 + cos θ1 tan θ2)

A stunt plane does a series of vertical loop-the-loops. Assuming the pilot is moving at constant speed throughout the trajectory, at what point in the circle does the pilot feel the heaviest (have the greatest apparent weight)?

Explain in sentence form. Include free-body diagrams with your explanation.

At your job at a warehouse, you have designed a method to help get heavy packages up a 15° ramp.

The package is attached to a rope that runs parallel to the ramp and passes over a massive pulley with a moment of inertia I = 10.0 kg·m2 and radius of 0.20 m, at the top of the ramp.

The other end of the rope is attached to a counterweight that hangs straight down. The mass of the counterweight is always adjusted to be twice the mass of the package.

However, your boss is worried that the acceleration of the package will make it too difficult to handle at the top of the ramp and tells you to calculate the acceleration of the package.

To determine the influence of friction on the package by the ramp, you run some tests and find that using a horizontal force of 250 N, you can push a 50.0 kg package at a constant speed along a level floor made of the same material as the ramp. What will be the acceleration of the package up the ramp ?

Answers

We want then to calculate the acceleration a:

P1x = m1 g sin θ
P1y = m1 g cos θ


On the y-axis:

N = m1 g cos θ
f = ν N
f = μ m1 g cos θ

On the x axis:

T1 - P1x - f = m1 a

T1 = m1 a + m1 g sin α + μ m1 g cos θ

On the z-axis :

m2 g - T2 = m2 a

T2 = m2 g - m2 a

Σ τi = τ1 + τ2 = + T1 R - T2 R = - α I

α = a /R , and
I = (1/2) m_p R²

So

R(T2 - T1) = (a/R) (1/2) m_p R ². So

T2 - T1 = ( a) (1/2) m_p
= m2 g - m2 a - ( m1 a + m1 g sin α + μ m1 g cos θ)

(a) (1/2) m_p = m2 g - m2 a - m1 a - m1 g sin α - μ m1 g cos θ)

Then:

a = (m2g - m1g(sin θ + μ cos θ)/(m1 + m2 + m_p/2)

a = (m2g - m1g(sin θ + μ cos θ)/(m1 + m2 + m_p/2)

We have the following values:

μ = 250/50 x g = 5/g
m2 = 2 m1
(1/2) m_p = I /R ² = 250

With all these values, we obtain:

a = (2g - g sin θ + 5 cos θ)/(3 + m_p/2m1) =
( g(2 - sin θ) + 5 cos θ)/(3 + 250/50) = (9.8(2 - 0.26) - 4.83)/8 = 1.53 m/s

a = 1.53 m/s

A 0.350 kg block is attached by a string to a post in the centre of a horizontal frictionless air table. The block revolves around the post with a constant speed of 5.00 m/s and takes 1.20 s for each rotation.

a) Draw a fully labelled free body diagram of the block as it revolves.
b) Find the length of the string connecting the block to the centre.
c) Find the tension in the string while the block is rotating.

Answers

a) The free body diagram is drawn on the figure.

b) We have for a circular motion:

v = ω r , and ω = Δθ /Δt

So

ω = 2π rad/1.2 s
r = v/ω = 1.2 v/ 2π = 1.2 x 5.00 /2 π = 0.955 m

r = 0.955 m

c) The centripetal force F_c = m v²/r =
0.350 x (5.00)²/0.955 = 9.16 N

F_c = 9.16 N

A block of mass 200 g is sent up a 25° ramp with an initial speed of 6.50 m/s. The coefficient of friction between the block and the ramp is 0.180. After travelling up the ramp a distance of 50.0 cm, it encounters a spring (k = 400 N/m), and continues up the ramp as it compresses the spring.

What is the maximum compression of the spring ?

Answers

According to the work-kinetic energy theorem , we write :

KE(B) - KE(A) = W (masse) + W(friction)

(1/2) m (6.5)² - KE(A) = (m g sin 25 + μ m g cos 25 ) x 50.0

So

KE(A) = (1/2) (0.2) (6.5)² - 0.2 x 9.8 (sin 25 + 0.18 cos 25) x 50.0 = 3.6507

KE(A) = 3.6507 (J)

This energy will be used to compress the spring by a width equal to x such that :

KE(A) = (1/2) k x ²

Then

(1/2) (400) x ² = 3.6507

Hence:

(1/2) (400) x ² = 3.6507 x 2/400

x = 0.135 m

x = 0.135 m

An air puck of mass 375 g (A) on a flat horizontal table has an initial velocity of 4.00 m/s at 270° as shown. It collides with a second puck of mass 450 g (B); as a result the original puck glides away with a velocity of 2.80 m/s at 203°.

a) What is the velocity (magnitude and direction) of the 450 g puck after the collision ?

b) The pucks were in contact for a period of 0.010 s, with a changing force between them that can be represented with the simplified graph below. Using this graph, what was the maximum force between them during the collision ?

Answers

According to the conservation of the momentum , we write:

m1 v1i = m1 v1f cos 67 + m2 v2f sin θ
m1 v1f cos 23 = m2 v2f cos θ

The quotient of the two equalities gives:

tang &thea; = .375(4 - 2.8 cos 67)/0.375 x 2.8 cos 23 = 2.9/2.577 = 1.125

Hence &thea; = 48.3750^o = 360^o - 48.3750^o = 312^o

θ = 312^o

v2f = 0.375 x 2.8 cos 23 /0.450 cos 48.375 = 3.24 m/s

v2f = 3.24 m/s

b) We have

v2i = 0
Area = ∫ F . dt = Δp

Here Area = A = area of the triangle = F_max . Δt /2 =
F_max x (0.01 - 0)/2 = 0.01 F_max /2

According to the impulse-momentum theorem, which is the impulse is equal to tthe change in the momentum : F Δ t = m &Delta v

0.01 F_max /2 = m2 v2f - m2 v2i = m2 v2f

So F_max = 2 m2 v2f /0.01

F_max = 2 x 0.45 x 3.24/0.01 = 291.6 N

F_max = 292 N

A ball attached to the end of a string is held horizontal and released, hitting a cart in a collision which is not perfectly elastic. The cart then rolls away as the ball swings back. For each of the three parts of the motion (a) as the ball falls down, (b) as it hits the cart, and (c) as the two separate after collision, describe how the concept of either conservation of momentum or conservation of mechanical energy applies.

(a) as the ball falls down
(b) as it hits the cart
(c) as the cart and ball move away from each other after the collision (c) as the cart and ball move away from each other after the collision

Answers

a) As the ball falls down the work done by gravity is positive and the kinetic energy increases, as ΔK = Wg , (also the loss in potential energy is equal to the gain in kinetic energy).

b) Momentum is conserved when the ball hits the cart, and the initial momentum of the ball is “shared” between the ball and the cart. The collision is not elastic, so kinetic energy is lost in the collision (mainly converted to heat).

c) As the ball swings back up work done by gravity is negative, so the kinetic energy decreases by the same amount. (Also the loss in potential energy will be converted to potential energy). As the cart moves away after the collision it’s kinetic energy will remain constant, unless there is a loss due to work done by friction.

The earth has a mass of 5.97 × 1024 kg, the moon has a mass of 7.35 × 1022 kg. A spaceship (mship = 2.60 × 104 kg) is located in space so that it is 3.30 × 108 m from the earth and 1.10 × 108 m from the moon at 20° and 40° from the line joining them as shown.

Calculate the magnitude of the gravitational force on the spaceship, and the angle this force makes with the line from the earth to the moon.

Answers

Fm = G m_ship m_moon/r_m²
Fe = G m_ship m_earth/r_e²

G : gravitation constant = 6.67 x 10^{- 11} N · m²/kg²

According to the Al-Kachi law, we write:

F_net² = Fe² + Fm² - 2 Fe Fm cos 60^o

F_net = 90.4 N

According to the sinus law, we write:

90/ sin 60 = Fm/sin θ . So

sin θ = (√3 /180) F_m =
(√3 /180)x 6.67 x 10 ^-11 7.35 x 10²²x 2.6 10⁴/(1.1)² x 10¹⁶ = 0.1014

Hence θ = 5.82^o

The angle between the net force and the line from the earth to the moon is :
20 + 5.8 + 180 = 205.8^o

Angle = 206^o