A lifeboat slides down a straight ramp inclined at an angle of 15° to the horizontal. The lifeboat has mass 800 kg and the length of the ramp is 50 m. The lifeboat is released from rest at the top of the ramp and is moving with a speed of 12.6 m s⁻¹ when it reaches the end of the ramp. By modelling the lifeboat as a particle and the ramp as a rough inclined plane, find the coefficient of friction between the lifeboat and the ramp.

A-Level Edexcel Maths Mechanics Kinematics Graphs: A lifeboat slides down a straigh

A lifeboat slides down a straight ramp inclined at an angle of 15° to the horizontal - Edexcel - A-Level Maths Mechanics - Question 4 - 2013 - Paper 1

Question 4

A lifeboat slides down a straight ramp inclined at an angle of 15° to the horizontal. The lifeboat has mass 800 kg and the length of the ramp is 50 m. The lifeboat i... show full transcript

Worked Solution & Example Answer:A lifeboat slides down a straight ramp inclined at an angle of 15° to the horizontal - Edexcel - A-Level Maths Mechanics - Question 4 - 2013 - Paper 1

Step 1

Calculate the acceleration of the lifeboat using kinematics

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Answer

Using the kinematic equation:

$v^2 = u^2 + 2as$

where:

$v = 12.6 \, \text{m/s}$ (final velocity)
$u = 0 \, \text{m/s}$ (initial velocity)
$s = 50 \, \text{m}$ (distance)

We can rearrange the equation to solve for $a$ :

\Rightarrow a = \frac{12.6^2}{100} = 1.5876 \, \text{m/s}^2$$

Step 2

Establish the forces acting on the lifeboat

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Answer

The forces acting on the lifeboat include:

Gravitational force down the ramp: $F_g = mg \sin(\theta)$
Normal force perpendicular to the ramp: $R = mg \cos(\theta)$
Frictional force: $F_f = \mu R$

Where:

$m = 800 \, \text{kg}$ (mass of the lifeboat)
$g = 9.81 \, \text{m/s}^2$ (acceleration due to gravity)
$\theta = 15°$ (angle of incline)

Step 3

Calculate the normal force and frictional force

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Answer

Calculate the normal force:

$R = 800 \times 9.81 \times \cos(15°) = 800 \times 9.81 \times 0.9659 = 7580.77 \, \text{N}$
Now, express the net force equation:

$800 \times 9.81 \sin(15°) - F_f = 800 \times a$

This becomes:

$800 \times 9.81 \sin(15°) - \mu \times 7580.77 = 800 \times 1.5876$

Step 4

Solve for the coefficient of friction

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Answer

By substituting the known values:

$800 \times 9.81 \sin(15°) - \mu \times 7580.77 = 800 \times 1.5876$

To find $\mu$ , rearranging terms will give us:

$\mu \times 7580.77 = 800 \times 9.81 \sin(15°) - 800 \times 1.5876$

Calculate:

$\mu = \frac{800 \times (9.81 \sin(15°) - 1.5876)}{7580.77}$

Substituting the values of $heta$ :

$\mu \approx 0.10$ .

A lifeboat slides down a straight ramp inclined at an angle of 15° to the horizontal - Edexcel - A-Level Maths Mechanics - Question 4 - 2013 - Paper 1

Worked Solution & Example Answer:A lifeboat slides down a straight ramp inclined at an angle of 15° to the horizontal - Edexcel - A-Level Maths Mechanics - Question 4 - 2013 - Paper 1

Calculate the acceleration of the lifeboat using kinematics

Establish the forces acting on the lifeboat

Calculate the normal force and frictional force

Solve for the coefficient of friction

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