Question 1 - A-Level Maths

CAIE FP2 2019 November — Question 1 5 marks

Exam Board	CAIE
Module	FP2 (Further Pure Mathematics 2)
Year	2019
Session	November
Marks	5
Paper	Download PDF ↗
Mark scheme	Download PDF ↗
Topic	Moments
Type	Lamina on surface with string or rod support
Difficulty	Standard +0.8 This is a multi-part statics problem requiring resolution of forces, moments about two points, and friction at limiting equilibrium. While the geometry is straightforward (given tan θ), students must carefully handle the normal reactions at both E and B, apply moment equilibrium strategically, and combine results to find μ. More demanding than standard A-level mechanics but typical for Further Mechanics.
Spec	6.04e Rigid body equilibrium: coplanar forces 6.05e Radial/tangential acceleration

1 A particle \(P\) is moving in a circle of radius 2 m . At time \(t\) seconds, its velocity is \(( t - 1 ) ^ { 2 } \mathrm {~m} \mathrm {~s} ^ { - 1 }\). At a particular time \(T\) seconds, where \(T > 0\), the magnitude of the radial component of the acceleration of \(P\) is \(8 \mathrm {~m} \mathrm {~s} ^ { - 2 }\). Find the magnitude of the transverse component of the acceleration of \(P\) at this instant.
[0pt] [5] \includegraphics[max width=\textwidth, alt={}, center]{0f39ff02-a4fc-49ce-b87e-f70bef5a58b6-04_591_805_262_671} A uniform square lamina \(A B C D\) of side \(4 a\) and weight \(W\) rests in a vertical plane with the edge \(A B\) inclined at an angle \(\theta\) to the horizontal, where \(\tan \theta = \frac { 1 } { 3 }\). The vertex \(B\) is in contact with a rough horizontal surface for which the coefficient of friction is \(\mu\). The lamina is supported by a smooth peg at the point \(E\) on \(A B\), where \(B E = 3 a\) (see diagram).

Find expressions in terms of \(W\) for the normal reaction forces at \(E\) and \(B\).
Given that the lamina is about to slip, find the value of \(\mu\).

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Question 1:

Answer	Marks	Guidance
Answer	Marks	Guidance
\((T-1)^4/2 = 8\)	M1 A1	Equate radial acceleration to 8 at \(t = T\) from \(v^2/r\)
\(T = 3\) (or \(T - 1 = 2\))	A1	Hence find positive value of \(T\) (or of \(T-1\))
\(a_T = 2(T-1) = 4\) [m s\(^{-2}\)]	M1 A1	Find magnitude of transverse acceleration at \(t = T\)
5

## Question 1:

| Answer | Marks | Guidance |
|--------|-------|----------|
| $(T-1)^4/2 = 8$ | M1 A1 | Equate radial acceleration to 8 at $t = T$ from $v^2/r$ |
| $T = 3$ (or $T - 1 = 2$) | A1 | Hence find positive value of $T$ (or of $T-1$) |
| $a_T = 2(T-1) = 4$ [m s$^{-2}$] | M1 A1 | Find magnitude of transverse acceleration at $t = T$ |
| | **5** | |

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Show LaTeX source

1 A particle $P$ is moving in a circle of radius 2 m . At time $t$ seconds, its velocity is $( t - 1 ) ^ { 2 } \mathrm {~m} \mathrm {~s} ^ { - 1 }$. At a particular time $T$ seconds, where $T > 0$, the magnitude of the radial component of the acceleration of $P$ is $8 \mathrm {~m} \mathrm {~s} ^ { - 2 }$. Find the magnitude of the transverse component of the acceleration of $P$ at this instant.\\[0pt]
[5]\\

\includegraphics[max width=\textwidth, alt={}, center]{0f39ff02-a4fc-49ce-b87e-f70bef5a58b6-04_591_805_262_671}

A uniform square lamina $A B C D$ of side $4 a$ and weight $W$ rests in a vertical plane with the edge $A B$ inclined at an angle $\theta$ to the horizontal, where $\tan \theta = \frac { 1 } { 3 }$. The vertex $B$ is in contact with a rough horizontal surface for which the coefficient of friction is $\mu$. The lamina is supported by a smooth peg at the point $E$ on $A B$, where $B E = 3 a$ (see diagram).\\
(i) Find expressions in terms of $W$ for the normal reaction forces at $E$ and $B$.\\

(ii) Given that the lamina is about to slip, find the value of $\mu$.\\

\hfill \mbox{\textit{CAIE FP2 2019 Q1 [5]}}

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