Questions — AQA Further Paper 2 (101 questions)

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AQA AS Paper 1 AS Paper 2 C1 C2 C3 C4 D1 D2 FP1 FP2 FP3 Further AS Paper 1 Further AS Paper 2 Discrete Further AS Paper 2 Mechanics Further AS Paper 2 Statistics Further Paper 1 Further Paper 2 Further Paper 3 Discrete Further Paper 3 Mechanics Further Paper 3 Statistics M1 M2 M3 Paper 1 Paper 2 Paper 3 S1 S2 S3 CAIE FP1 FP2 Further Paper 1 Further Paper 2 Further Paper 3 Further Paper 4 M1 M2 P1 P2 P3 S1 S2 Edexcel AEA AS Paper 1 AS Paper 2 C1 C12 C2 C3 C34 C4 CP AS CP1 CP2 D1 D2 F1 F2 F3 FD1 FD1 AS FD2 FD2 AS FM1 FM1 AS FM2 FM2 AS FP1 FP1 AS FP2 FP2 AS FP3 FS1 FS1 AS FS2 FS2 AS M1 M2 M3 M4 M5 P1 P2 P3 P4 PMT Mocks Paper 1 Paper 2 Paper 3 S1 S2 S3 S4 OCR AS Pure C1 C2 C3 C4 D1 D2 FD1 AS FM1 AS FP1 FP1 AS FP2 FP3 FS1 AS Further Additional Pure Further Additional Pure AS Further Discrete Further Discrete AS Further Mechanics Further Mechanics AS Further Pure Core 1 Further Pure Core 2 Further Pure Core AS Further Statistics Further Statistics AS H240/01 H240/02 H240/03 M1 M2 M3 M4 Mechanics 1 PURE Pure 1 S1 S2 S3 S4 Stats 1 OCR MEI AS Paper 1 AS Paper 2 C1 C2 C3 C4 D1 D2 FP1 FP2 FP3 Further Extra Pure Further Mechanics A AS Further Mechanics B AS Further Mechanics Major Further Mechanics Minor Further Numerical Methods Further Pure Core Further Pure Core AS Further Pure with Technology Further Statistics A AS Further Statistics B AS Further Statistics Major Further Statistics Minor M1 M2 M3 M4 Paper 1 Paper 2 Paper 3 S1 S2 S3 S4 SPS SPS ASFM SPS ASFM Mechanics SPS ASFM Pure SPS ASFM Statistics SPS FM SPS FM Mechanics SPS FM Pure SPS FM Statistics SPS SM SPS SM Mechanics SPS SM Pure SPS SM Statistics WJEC Further Unit 1 Further Unit 2 Further Unit 3 Further Unit 4 Further Unit 5 Further Unit 6 Unit 1 Unit 2 Unit 3 Unit 4
AQA Further Paper 2 Specimen Q1
1 marks
1 Given that \(z _ { 1 } = 4 e ^ { \mathrm { i } \frac { \pi } { 3 } }\) and \(z _ { 2 } = 2 e ^ { \mathrm { i } \frac { \pi } { 4 } }\)
state the value of \(\arg \left( \frac { z _ { 1 } } { z _ { 2 } } \right)\)
Circle your answer.
[0pt] [1 mark]
\(\frac { \pi } { 12 }\)
\(\frac { 4 } { 3 }\)
\(\frac { 7 \pi } { 12 }\)
2
AQA Further Paper 2 Specimen Q2
3 marks
2 Given that \(z\) is a complex number and that \(z ^ { * }\) is the complex conjugate of \(z\)
prove that \(z z ^ { * } - | z | ^ { 2 } = 0\)
[0pt] [3 marks] LL
AQA Further Paper 2 Specimen Q3
3 marks
3 The transformation T is defined by the matrix \(\mathbf { M }\). The transformation S is defined by the matrix \(\mathbf { M } ^ { - 1 }\). Given that the point \(( x , y )\) is invariant under transformation T , prove that \(( x , y )\) is also an invariant point under transformation S .
[0pt] [3 marks]
AQA Further Paper 2 Specimen Q4
4 marks
4 Solve the equation \(z ^ { 3 } = i\), giving your answers in the form \(e ^ { i \theta }\), where \(- \pi < \theta \leq \pi\)
[0pt] [4 marks]
AQA Further Paper 2 Specimen Q5
4 marks
5 Find the smallest value \(\theta\) of for which $$( \cos \theta + \mathrm { i } \sin \theta ) ^ { 5 } = \frac { 1 } { \sqrt { 2 } } ( 1 - \mathrm { i } ) \{ \theta \in \mathbb { R } : \theta > 0 \}$$ [4 marks]
AQA Further Paper 2 Specimen Q6
5 marks
6 Prove that \(8 ^ { n } - 7 n + 6\) is divisible by 7 for all integers \(n \geq 0\)
[0pt] [5 marks]
AQA Further Paper 2 Specimen Q7
2 marks
7 A small, hollow, plastic ball, of mass \(m \mathrm {~kg}\) is at rest at a point \(O\) on a polished horizontal surface. The ball is attached to two identical springs. The other ends of the springs are attached to the points \(P\) and \(Q\) which are 1.8 metres apart on a straight line through \(O\). The ball is struck so that it moves away from \(O\), towards \(P\) with a speed of \(0.75 \mathrm {~m} \mathrm {~s} ^ { - 1 }\). As the ball moves, its displacement from \(O\) is \(x\) metres at time \(t\) seconds after the motion starts. The force that each of the springs applies to the ball is \(12.5 m x\) newtons towards \(O\). The ball is to be modelled as a particle. The surface is assumed to be smooth and it is assumed that the forces applied to the ball by the springs are the only horizontal forces acting on the ball. 7
  1. Find the minimum distance of the ball from \(P\), in the subsequent motion. 7
  2. In practice the minimum distance predicted by the model is incorrect.
    Is the minimum distance predicted by the model likely to be too big or too small?
    Explain your answer with reference to the model.
    [0pt] [2 marks]
AQA Further Paper 2 Specimen Q8
5 marks
8 Given that \(I _ { n } = \int _ { 0 } ^ { \frac { \pi } { 2 } } \sin ^ { n } x \mathrm {~d} x \quad n \geq 0\)
show that \(n I _ { n } = ( n - 1 ) I _ { n - 2 } \quad n \geq 2\)
[0pt] [5 marks]
AQA Further Paper 2 Specimen Q9
6 marks
9 A student claims:
"Given any two non-zero square matrices, \(\mathbf { A }\) and \(\mathbf { B }\), then \(( \mathbf { A B } ) ^ { - 1 } = \mathbf { B } ^ { - 1 } \mathbf { A } ^ { - 1 }\) " 9
  1. Explain why the student's claim is incorrect giving a counter example.
    [0pt] [2 marks]
    9
  2. Refine the student's claim to make it fully correct.
    [0pt] [1 mark]
    9
  3. Prove that your answer to part (b) is correct.
    [0pt] [3 marks]
AQA Further Paper 2 Specimen Q10
8 marks
10 Evaluate the improper integral \(\int _ { 0 } ^ { \infty } \frac { 4 x - 30 } { \left( x ^ { 2 } + 5 \right) ( 3 x + 2 ) } \mathrm { d } x\), showing the limiting process used. Give your answer as a single term.
[0pt] [8 marks]
AQA Further Paper 2 Specimen Q11
4 marks
11 The diagram shows a sketch of a curve \(C\), the pole \(O\) and the initial line.
\includegraphics[max width=\textwidth, alt={}, center]{21084ed7-43f8-47c6-80c2-930ccf340d37-14_622_978_374_571} The polar equation of \(C\) is \(r = 4 + 2 \cos \theta , \quad - \pi \leq \theta \leq \pi\) 11
  1. Show that the area of the region bounded by the curve \(C\) is \(18 \pi\)
    11
  2. Points \(A\) and \(B\) lie on the curve \(C\) such that \(- \frac { \pi } { 2 } < \theta < \frac { \pi } { 2 }\) and \(A O B\) is an equilateral triangle. Find the polar equation of the line segment \(A B\)
    [0pt] [4 marks]
    \(12 \quad \mathbf { M } = \left[ \begin{array} { r r r } - 1 & 2 & - 1
    2 & 2 & - 2
    - 1 & - 2 & - 1 \end{array} \right]\)
AQA Further Paper 2 Specimen Q12
18 marks
12
  1. Given that 4 is an eigenvalue of \(\mathbf { M }\), find a corresponding eigenvector.
    [0pt] [3 marks] 12
  2. Given that \(\mathbf { M U } = \mathbf { U D }\), where \(\mathbf { D }\) is a diagonal matrix, find possible matrices for \(\mathbf { D }\) and \(\mathbf { U }\). [8 marks]
    \(13 \quad \mathbf { S }\) is a singular matrix such that $$\operatorname { det } \mathbf { S } = \left| \begin{array} { c c c } a & a & x
    x - b & a - b & x + 1
    x ^ { 2 } & a ^ { 2 } & a x \end{array} \right|$$ Express the possible values of \(x\) in terms of \(a\) and \(b\).
    [0pt] [7 marks]
AQA Further Paper 2 Specimen Q14
9 marks
14 Given that the vectors \(\mathbf { a }\) and \(\mathbf { b }\) are perpendicular, prove that
\(| ( \mathbf { a } + 5 \mathbf { b } ) \times ( \mathbf { a } - 4 \mathbf { b } ) | = k | \mathbf { a } | | \mathbf { b } |\), where \(k\) is an integer to be found. Explicitly state any properties of the vector product that you use within your proof.
[0pt] [9 marks] LL
AQA Further Paper 2 Specimen Q15
8 marks
15
  1. Show that \(\left( 1 - \frac { 1 } { 4 } \mathrm { e } ^ { 2 \mathrm { i } \theta } \right) \left( 1 - \frac { 1 } { 4 } \mathrm { e } ^ { - 2 \mathrm { i } \theta } \right) = \frac { 1 } { 16 } ( 17 - 8 \cos 2 \theta )\)
    [0pt] [3 marks]
    15
  2. Given that the series \(\mathrm { e } ^ { 2 \mathrm { i } \theta } + \frac { 1 } { 4 } \mathrm { e } ^ { 4 \mathrm { i } \theta } + \frac { 1 } { 16 } \mathrm { e } ^ { 6 \mathrm { i } \theta } + \frac { 1 } { 64 } \mathrm { e } ^ { 8 \mathrm { i } \theta } + \ldots\). has a sum to infinity, express this sum to infinity in terms of \(\mathrm { e } ^ { 2 \mathrm { i } \theta }\)
    15
  3. Hence show that \(\sum _ { n = 1 } ^ { \infty } \frac { 1 } { 4 ^ { n - 1 } } \cos 2 n \theta = \frac { 16 \cos 2 \theta - 4 } { 17 - 8 \cos 2 \theta }\)
    [0pt] [4 marks]
    15
  4. Deduce a similar expression for \(\sum _ { n = 1 } ^ { \infty } \frac { 1 } { 4 ^ { n - 1 } } \sin 2 n \theta\)
    [0pt] [1 mark]
AQA Further Paper 2 Specimen Q16
9 marks
16 A designer is using a computer aided design system to design part of a building. He models part of a roof as a triangular prism \(A B C D E F\) with parallel triangular ends \(A B C\) and \(D E F\), and a rectangular base \(A C F D\). He uses the metre as the unit of length.
\includegraphics[max width=\textwidth, alt={}, center]{21084ed7-43f8-47c6-80c2-930ccf340d37-22_510_766_484_776} The coordinates of \(B , C\) and \(D\) are ( \(3,1,11\) ), ( \(9,3,4\) ) and ( \(- 4,12,4\) ) respectively.
He uses the equation \(x - 3 y = 0\) for the plane \(A B C\).
He uses \(\left[ \mathbf { r } - \left( \begin{array} { c } - 4
12
4 \end{array} \right) \right] \times \left( \begin{array} { c } 4
- 12
0 \end{array} \right) = \left( \begin{array} { l } 0
0
0 \end{array} \right)\) for the equation of the line \(A D\).
Find the volume of the space enclosed inside this section of the roof.
[0pt] [9 marks]
AQA Further Paper 2 2019 June Q1
1 marks
1 Given that \(z\) is a complex number, and that \(z ^ { * }\) is the complex conjugate of \(z\), which of the following statements is not always true? Circle your answer.
[0pt] [1 mark] $$\left( z ^ { * } \right) ^ { * } = z \quad z z ^ { * } = | z | ^ { 2 } \quad ( - z ) ^ { * } = - \left( z ^ { * } \right) \quad z - z ^ { * } = z ^ { * } - z$$
AQA Further Paper 2 2019 June Q2
1 marks
2 Which of the straight lines given below is an asymptote to the curve $$y = \frac { a x ^ { 2 } } { x - 1 }$$ where \(a\) is a non-zero constant? Circle your answer.
[0pt] [1 mark]
\(y = a x + a\)
\(y = a x\)
\(y = a x - a\)
\(y = a\)
AQA Further Paper 2 2019 June Q3
1 marks
3 The set \(\mathcal { A }\) is defined by \(\mathcal { A } = \{ x : - \sqrt { } 2 < x < 0 \} \cup \{ x : 0 < x < \sqrt { } 2 \}\)
Which of the inequalities given below has \(\mathcal { A }\) as its solution?
Circle your answer.
[0pt] [1 mark]
\(\left| x ^ { 2 } - 1 \right| > 1\)
\(\left| x ^ { 2 } - 1 \right| \geq 1\)
\(\left| x ^ { 2 } - 1 \right| < 1\)
\(\left| x ^ { 2 } - 1 \right| \leq 1\)
AQA Further Paper 2 2019 June Q4
4 The positive integer \(k\) is such that $$\sum _ { r = 1 } ^ { k } ( 3 r - k ) = 90$$ Find the value of \(k\).
AQA Further Paper 2 2019 June Q5
5 A curve has equation \(y = \cosh x\) Show that the arc length of the curve from \(x = a\) to \(x = b\), where \(0 < a < b\), is equal to
\(\sinh b - \sinh a\)
\(6 \quad\) A circle \(C\) in the complex plane has equation \(| z - 2 - 5 \mathrm { i } | = a\) The point \(z _ { 1 }\) on \(C\) has the least argument of any point on \(C\), and \(\arg \left( z _ { 1 } \right) = \frac { \pi } { 4 }\) Prove that \(a = \frac { 3 \sqrt { } 2 } { 2 }\)
AQA Further Paper 2 2019 June Q7
4 marks
7 The points \(A , B\) and \(C\) have coordinates \(A ( 4,5,2 ) , B ( - 3,2 , - 4 )\) and \(C ( 2,6,1 )\) 7
  1. Use a vector product to show that the area of triangle \(A B C\) is \(\frac { 5 \sqrt { 11 } } { 2 }\)
    [0pt] [4 marks]
    7
  2. The points \(A , B\) and \(C\) lie in a plane.
    Find a vector equation of the plane in the form r.n \(= k\)
    7
  3. Hence find the exact distance of the plane from the origin.
AQA Further Paper 2 2019 June Q8
8
  1. The line \(y = m x\) is a tangent to \(P _ { 2 }\)
    Prove that \(m = \pm \sqrt { \frac { a } { b } }\)
    Solutions using differentiation will be given no marks.
    8
  2. The line \(y = \sqrt { \frac { a } { b } } x\) meets \(P _ { 2 }\) at the point \(D\).
    The finite region \(R\) is bounded by the \(x\)-axis, \(P _ { 2 }\) and a line through \(D\) perpendicular to the \(x\)-axis. The region \(R\) is rotated through \(2 \pi\) radians about the \(x\)-axis to form a solid.
    Find, in terms of \(a\) and \(b\), the volume of this solid.
    Fully justify your answer.
  3. Find the eigenvalues and corresponding eigenvectors of the matrix
AQA Further Paper 2 2019 June Q9
4 marks
9
  1. Find the eigenvalues and corresponding eigenvectors of the matrix $$\mathbf { M } = \left[ \begin{array} { c c } \frac { 1 } { 5 } & \frac { 2 } { 5 }
    \frac { - 3 } { 5 } & \frac { 13 } { 10 } \end{array} \right]$$ 9
  2. Find matrices \(\mathbf { U }\) and \(\mathbf { D }\) such that \(\mathbf { D }\) is a diagonal matrix and \(\mathbf { M } = \mathbf { U D U } ^ { - 1 }\)
    9
  3. Given that \(\mathbf { M } ^ { n } \rightarrow \mathbf { L }\) as \(n \rightarrow \infty\), find the matrix \(\mathbf { L }\).
    [0pt] [4 marks]
    9
  4. The transformation represented by \(\mathbf { L }\) maps all points onto a line. Find the equation of this line.
    \begin{center} \begin{tabular}{ | l | }
AQA Further Paper 2 2019 June Q10
7 marks
10
- \(\begin{array} { c } \text { Prove by induction that } \mathrm { f } ( n ) = n ^ { 3 } + 3 n ^ { 2 } + 8 n \text { is divisible by } 6 \text { for all integers } n \geq 1
\text { [7 marks] }
\text { - }
\text { - }
\text { - }
\text { - }
\text { - }
\text { - }
\text { - }
\text { - } \end{array}\)
-
\end{tabular} \end{center}
\includegraphics[max width=\textwidth, alt={}]{f1ec515d-184a-4462-a6d2-5876d3e19117-13_2488_1716_219_153}
AQA Further Paper 2 2019 June Q11
11 The line \(L _ { 1 }\) has equation $$\frac { x - 2 } { 3 } = \frac { y + 4 } { 8 } = \frac { 4 z - 5 } { 5 }$$ The line \(L _ { 2 }\) has equation $$\left( \mathbf { r } - \left[ \begin{array} { c } - 2
0
3 \end{array} \right] \right) \times \left[ \begin{array} { l } 2
1
3 \end{array} \right] = \mathbf { 0 }$$ Find the shortest distance between the two lines, giving your answer to three significant figures.