AQA Level 2 Further Maths – June 2022 – Paper 1

Question 1 (3 marks)

The value of $(x + 1)$ is increased by 20%.

Its value is now the same as $(x + 6)$

Work out the value of $x$.

✓ Worked Solution

Step 1: Understanding the Question

💡 What are we being asked to find?

We need to find the value of $x$ by setting up an equation that represents the given information: increasing $(x+1)$ by 20% makes it equal to $(x+6)$.

Step 2: Set up and Simplify the Equation

🌱 Why we do this:

An increase of 20% means multiplying the original amount by a multiplier of $1 + 0.20 = 1.2$. This lets us translate the word problem into a single algebraic equation.

✍️ Working:

\[ 1.2(x + 1) = x + 6 \]

Expand the left-hand side:

\[ 1.2x + 1.2 = x + 6 \]

✓ (M1) Multiplier of 1.2 (or $\frac{6}{5}$) used correctly to set up the equation.

🧠 What this tells us:

We now have a simple linear equation that we can solve by collecting the $x$ terms on one side and the constant terms on the other.

Step 3: Solve the Linear Equation

🌱 Why we do this:

We isolate $x$ to find its value.

Subtract $x$ from both sides:

\[ 0.2x + 1.2 = 6 \]

Subtract $1.2$ from both sides:

\[ 0.2x = 4.8 \]

✓ (M1 dep) Correctly isolating the $x$ term to get $0.2x = 4.8$ (or equivalent).

Divide by $0.2$ (which is the same as multiplying by $\frac{1}{0.2} = 5$):

\[ x = \frac{4.8}{0.2} = 24 \]

🧠 What this tells us:

The value of $x$ is 24. We can check this by substituting $x=24$ into the original statement. $(x+1) = 25$. Increased by 20%: $25 \times 1.2 = 30$. $(x+6) = 24 + 6 = 30$. Since $30 = 30$, the answer is correct.

Final Answer:

24

Total: 3 marks

↑ Back to Top

Question 2 (2 marks)

The point $(-6, -4)$ lies on a straight line with gradient $\frac{3}{2}$.

Work out the coordinates of the point where the line crosses the $y$-axis.

↑ Back to Top

Question 3 (6 marks)

$$ f(x) = \begin{cases} 4-x & 0 \le x < 1 \\ 4x - x^2 & 1 \le x < 4 \\ 2x - 8 & 4 \le x \le 6 \end{cases} $$

3 (a) On the grid, draw the graph of $y = f(x)$.

3 (b) $g(x) = 6 – 3x$

Work out $g^{-1}(x)$.

✓ Worked Solution

Part (a): Drawing the Piecewise Graph [4 marks]

Step A1: Analyze Each Function Segment

🌱 Why we do this:

The function is defined by three different rules over three domains. We must calculate the endpoints and key features (like the vertex for the quadratic) for each segment.

Segment 1: $y = 4 – x$ for $0 \le x < 1$ (Straight Line)

$x=0 \implies y=4$: Point $(0, 4)$
$x=1 \implies y=3$: Point $(1, 3)$ (Hollow circle at $(1, 3)$ on the graph, but solid since it’s defined by the next function).
✓ (B1) Line joining $(0, 4)$ and $(1, 3)$.

Segment 2: $y = 4x – x^2$ for $1 \le x < 4$ (Quadratic Curve)

$x=1 \implies y=4(1) – 1^2 = 3$: Point $(1, 3)$
Vertex: $x = -\frac{b}{2a} = -\frac{4}{2(-1)} = 2$. $y = 4(2) – 2^2 = 4$: Point $(2, 4)$
$x=4 \implies y=4(4) – 4^2 = 0$: Point $(4, 0)$ (Hollow circle at $(4, 0)$, but solid since it’s defined by the next function).
✓ (M1) $(2, 4)$ plotted or implied as a maximum value (the curve shows a maximum value at $(2, 4)$).

✓ (A1) Correct curve drawn through $(1, 3)$, $(2, 4)$ and $(4, 0)$.

Segment 3: $y = 2x – 8$ for $4 \le x \le 6$ (Straight Line)

$x=4 \implies y=2(4) – 8 = 0$: Point $(4, 0)$
$x=6 \implies y=2(6) – 8 = 4$: Point $(6, 4)$
✓ (B1) Line joining $(4, 0)$ and $(6, 4)$.

🧠 What this tells us:

The three segments connect smoothly at $(1, 3)$ and $(4, 0)$, forming a continuous graph.

Graph for 3(a)

Part (b): Inverse Function $g^{-1}(x)$ [2 marks]

Step B1: Find the Inverse Function $g^{-1}(x)$

🌱 Why we do this:

To find the inverse function, we first write $g(x)$ as $y$, then swap $x$ and $y$, and finally rearrange the equation to make $y$ the subject.

Start with $y = g(x)$:

\[ y = 6 – 3x \]

Swap $x$ and $y$:

\[ x = 6 – 3y \]

✓ (M1) Rearranging the expression to find $x$ in terms of $g(x)$ or $y$.

Rearrange to make $y$ the subject:

\[ 3y = 6 – x \] \[ y = \frac{6 – x}{3} \] \[ y = 2 – \frac{1}{3}x \]

🧠 What this tells us:

The inverse function is $g^{-1}(x) = \frac{6-x}{3}$.

Final Answer (3b):

$g^{-1}(x) = \frac{6 – x}{3}$ or $2 – \frac{1}{3}x$

Total: 6 marks

↑ Back to Top

Question 4 (3 marks)

4 (a) Circle the value of $\tan^2 30^\circ$

$\frac{1}{4}$ $\frac{1}{3}$ $\frac{1}{2}$ $\frac{3}{4}$

4 (b) On the axes, sketch $y = \cos x$ for $0^\circ \le x \le 360^\circ$.

✓ Worked Solution

Part (a): Circle $\tan^2 30^\circ$ [1 mark]

Step A1: Recall and Calculate the Exact Value

🌱 Why we do this:

We must use the known exact value of $\tan 30^\circ$ and then square the result.

The exact value for $\tan 30^\circ$ is:

\[ \tan 30^\circ = \frac{1}{\sqrt{3}} \]

Square this value:

\[ \tan^2 30^\circ = \left(\frac{1}{\sqrt{3}}\right)^2 \] \[ \tan^2 30^\circ = \frac{1^2}{(\sqrt{3})^2} = \frac{1}{3} \]

✓ (B1) Correct answer selected/circled.

🧠 What this tells us:

The correct value is $\frac{1}{3}$.

Part (b): Sketch $y = \cos x$ [2 marks]

Step B1: Plot the Key Points of the Cosine Wave

🌱 Why we do this:

The cosine graph starts at its maximum value at $0^\circ$, reaches zero at $90^\circ$, its minimum value at $180^\circ$, zero again at $270^\circ$, and returns to its maximum at $360^\circ$. We must accurately plot these five points.

Key points for $y = \cos x$ are:

$(0^\circ, 1)$
$(90^\circ, 0)$
$(180^\circ, -1)$
$(270^\circ, 0)$
$(360^\circ, 1)$

✓ (M1) Plotting or implying the key points $(0, 1), (90, 0), (180, -1), (270, 0), (360, 1)$.

Draw a smooth curve through these points.

🧠 What this tells us:

The resulting curve must be smooth, passing through the correct points and showing the correct shape of a cosine wave.

Sketch for 4(b)

Final Answer (4a):

$\frac{1}{3}$

Final Answer (4b):

See SVG Sketch Above

Total: 3 marks

↑ Back to Top

Question 5 (3 marks)

$(3x + a)(5x – 4) = 15x^2 – 2x + b$

Work out the values of $a$ and $b$.

✓ Worked Solution

Step 1: Expand the Left-Hand Side (LHS)

💡 What are we being asked to find?

We are told that the two expressions are identical (an identity). Our strategy is to expand the brackets on the LHS and then compare the coefficients of $x$ and the constant terms to find $a$ and $b$.

Step 2: Expand the Brackets and Collect Terms

🌱 Why we do this:

We expand $(3x + a)(5x – 4)$ using the FOIL method to write it as a standard quadratic expression, ready for comparison.

Expand $(3x + a)(5x – 4)$:

\[ (3x)(5x) + (3x)(-4) + (a)(5x) + (a)(-4) \] \[ 15x^2 – 12x + 5ax – 4a \]

Group the $x$ terms:

\[ 15x^2 + (-12 + 5a)x – 4a \]

✓ (M1) Attempting to expand the brackets to obtain at least 3 correct terms (e.g., $15x^2 – 12x + 5ax$).

🧠 What this tells us:

The expanded form is $15x^2 + (5a – 12)x – 4a$. This must equal $15x^2 – 2x + b$. The $x^2$ term matches, so we can now compare the other terms.

Step 3: Equate the Coefficients of $x$ to find $a$

🌱 Why we do this:

The coefficient of $x$ on the LHS is $(-12 + 5a)$, and on the RHS it is $-2$. Setting them equal allows us to solve for $a$.

\[ 5a – 12 = -2 \] \[ 5a = 10 \] \[ a = 2 \]

✓ (A1) Correctly finding the value $a=2$.

Step 4: Equate the Constant Terms to find $b$

🌱 Why we do this:

The constant term on the LHS is $-4a$, and on the RHS it is $b$. We substitute the value $a=2$ to find $b$.

\[ b = -4a \]

Substitute $a=2$:

\[ b = -4(2) \] \[ b = -8 \]

✓ (A1 ft) Correctly finding the value $b=-8$ (following through from their value of $a$).

🧠 What this tells us:

The values are $a=2$ and $b=-8$. The identity is $(3x+2)(5x-4) = 15x^2 – 2x – 8$, which is correct.

Final Answer:

$a = 2, b = -8$

Total: 3 marks

↑ Back to Top

Question 6 (3 marks)

$$ y = 2x^4 \left(x^3 + 2 – \frac{3}{x}\right) $$

Work out $\frac{dy}{dx}$.

✓ Worked Solution

Step 1: Simplify $y$ into a Sum of Power Terms

🌱 Why we do this:

The easiest way to differentiate this expression is to expand the brackets and rewrite the term $\frac{3}{x}$ using a negative power, so the expression is in the form $y = Ax^n + Bx^m + \dots$. We can then use the rule $\frac{d}{dx}(ax^n) = anx^{n-1}$.

Rewrite $\frac{3}{x}$ as $3x^{-1}$:

\[ y = 2x^4(x^3 + 2 – 3x^{-1}) \]

Expand the brackets by multiplying each term by $2x^4$:

\[ y = (2x^4)(x^3) + (2x^4)(2) – (2x^4)(3x^{-1}) \] \[ y = 2x^{4+3} + 4x^4 – 6x^{4-1} \] \[ y = 2x^7 + 4x^4 – 6x^3 \]

🧠 What this tells us:

The simplified expression $y = 2x^7 + 4x^4 – 6x^3$ is now ready for term-by-term differentiation.

Step 2: Differentiate Each Term with Respect to $x$

🌱 Why we do this:

We apply the power rule, $\frac{d}{dx}(ax^n) = anx^{n-1}$, to each term to find the derivative $\frac{dy}{dx}$.

Differentiate $2x^7$: $2 \times 7 x^{7-1} = 14x^6$

Differentiate $4x^4$: $4 \times 4 x^{4-1} = 16x^3$

Differentiate $-6x^3$: $-6 \times 3 x^{3-1} = -18x^2$

✓ (M1) For correctly differentiating any two terms.

✓ (A2) For all three terms correct. (A1 for one term correct).

Combine the derivatives:

\[ \frac{dy}{dx} = 14x^6 + 16x^3 – 18x^2 \]

🧠 What this tells us:

The resulting expression is the gradient function of the original curve $y$.

Final Answer:

$\frac{dy}{dx} = 14x^6 + 16x^3 – 18x^2$

Total: 3 marks

↑ Back to Top

Question 7 (3 marks)

$ABC$ is a right-angled triangle with vertices $A(-1, 5)$, $B(-2, 5)$ and $C\left(-1, 5\frac{3}{4}\right)$.

Work out the length of $BC$.

✓ Worked Solution

Step 1: Identify Coordinates and the Distance Formula

🌱 Why we do this:

We need to find the distance between the points $B(-2, 5)$ and $C\left(-1, 5\frac{3}{4}\right)$. We use the distance formula: $d = \sqrt{(x_2 – x_1)^2 + (y_2 – y_1)^2}$.

Let $(x_1, y_1) = (-2, 5)$ and $(x_2, y_2) = \left(-1, 5\frac{3}{4}\right)$.

The distance $BC$ is given by:

\[ BC = \sqrt{(-1 – (-2))^2 + \left(5\frac{3}{4} – 5\right)^2} \]

🧠 What this tells us:

We need to calculate the difference in the $x$ and $y$ coordinates before squaring them.

Step 2: Calculate the Square of the Differences

🌱 Why we do this:

We calculate the changes in $x$ and $y$: $\Delta x = x_2 – x_1$ and $\Delta y = y_2 – y_1$.

Difference in $x$ coordinates ($\Delta x$):

\[ x_2 – x_1 = -1 – (-2) = -1 + 2 = 1 \]

Difference in $y$ coordinates ($\Delta y$):

\[ y_2 – y_1 = 5\frac{3}{4} – 5 = \frac{3}{4} \]

Apply to the distance formula (before the square root):

\[ BC^2 = 1^2 + \left(\frac{3}{4}\right)^2 \]

✓ (M1) For correct change in $x$ (1) and change in $y$ ($\frac{3}{4}$).

\[ BC^2 = 1 + \frac{9}{16} \]

✓ (M1 dep) Correctly setting up the expression for $BC^2$ (or $d^2$), e.g., $1^2 + (\frac{3}{4})^2$.

Add the fractions:

\[ BC^2 = \frac{16}{16} + \frac{9}{16} = \frac{25}{16} \]

🧠 What this tells us:

The square of the length $BC$ is $\frac{25}{16}$. We now take the square root to find the final length.

Step 3: Calculate $BC$

🌱 Why we do this:

We take the square root of $BC^2$ to find the length $BC$.

\[ BC = \sqrt{\frac{25}{16}} \] \[ BC = \frac{\sqrt{25}}{\sqrt{16}} = \frac{5}{4} \]

🧠 What this tells us:

The length of $BC$ is $\frac{5}{4}$ units, or 1.25 units.

Final Answer:

$\frac{5}{4}$ or $1\frac{1}{4}$ or $1.25$ units

Total: 3 marks

↑ Back to Top

Question 8 (3 marks)

Use matrix multiplication to show that, in the $x$-$y$ plane,

a rotation, $90^\circ$ anticlockwise about the origin, followed by
a reflection in the line $y=x$

is equivalent to a reflection in the $x$-axis.

✓ Worked Solution

Step 1: Identify the Transformation Matrices

🌱 Why we do this:

To use matrix multiplication, we must first find the correct $2 \times 2$ matrix for each transformation. We must also identify the final transformation’s matrix for comparison.

Transformation 1 (T1): Rotation $90^\circ$ anticlockwise about the origin.

\[ \text{Rotation matrix } (\mathbf{R}) = \begin{pmatrix} \cos 90^\circ & -\sin 90^\circ \\ \sin 90^\circ & \cos 90^\circ \end{pmatrix} = \begin{pmatrix} 0 & -1 \\ 1 & 0 \end{pmatrix} \]

Transformation 2 (T2): Reflection in the line $y=x$.

\[ \text{Reflection matrix } (\mathbf{F}) = \begin{pmatrix} 0 & 1 \\ 1 & 0 \end{pmatrix} \]

Target Result (T3): Reflection in the $x$-axis.

\[ \text{Reflection in } x\text{-axis matrix } (\mathbf{X}) = \begin{pmatrix} 1 & 0 \\ 0 & -1 \end{pmatrix} \]

✓ (M1) Identifying one of the correct transformation matrices ($\mathbf{R}$ or $\mathbf{F}$).

🧠 What this tells us:

The combined transformation must be $\mathbf{F} \times \mathbf{R}$, as the rotation is “followed by” the reflection, meaning the rotation is done first (closest to the object/coordinate vector). The matrix product must equal $\mathbf{X}$.

Step 2: Calculate the Combined Matrix $\mathbf{F}\mathbf{R}$

🌱 Why we do this:

We multiply the matrices in the correct order to find the single matrix that represents the combined transformation.

\[ \mathbf{T} = \mathbf{F} \mathbf{R} = \begin{pmatrix} 0 & 1 \\ 1 & 0 \end{pmatrix} \begin{pmatrix} 0 & -1 \\ 1 & 0 \end{pmatrix} \]

✓ (M1 dep) Both matrices correct and in the correct order $\begin{pmatrix} 0 & 1 \\ 1 & 0 \end{pmatrix} \begin{pmatrix} 0 & -1 \\ 1 & 0 \end{pmatrix}$.

Multiply the matrices:

\[ \mathbf{T} = \begin{pmatrix} (0)(0) + (1)(1) & (0)(-1) + (1)(0) \\ (1)(0) + (0)(1) & (1)(-1) + (0)(0) \end{pmatrix} \] \[ \mathbf{T} = \begin{pmatrix} 1 & 0 \\ 0 & -1 \end{pmatrix} \]

🧠 What this tells us:

The resulting matrix is $\begin{pmatrix} 1 & 0 \\ 0 & -1 \end{pmatrix}$.

Step 3: Compare the Result with the Target

🌱 Why we do this:

We compare the matrix obtained from the combined transformations with the matrix for a reflection in the $x$-axis to complete the proof.

The resulting matrix is $\begin{pmatrix} 1 & 0 \\ 0 & -1 \end{pmatrix}$.

The matrix for a reflection in the $x$-axis is also $\begin{pmatrix} 1 & 0 \\ 0 & -1 \end{pmatrix}$.

Since the matrices are equal, the two combined transformations are equivalent to a reflection in the $x$-axis.

✓ (A1) Correctly multiplied matrix and a statement concluding the proof.

🧠 What this tells us:

The process of matrix multiplication successfully showed that the two sequential transformations yield the same result as a single reflection in the $x$-axis.

Final Answer:

$\begin{pmatrix} 0 & 1 \\ 1 & 0 \end{pmatrix} \begin{pmatrix} 0 & -1 \\ 1 & 0 \end{pmatrix} = \begin{pmatrix} 1 & 0 \\ 0 & -1 \end{pmatrix}$, which is the matrix for reflection in the $x$-axis.

Total: 3 marks

↑ Back to Top

Question 9 (6 marks)

9 (a) A quadratic sequence starts $-2, -1, 4, 13, \dots$

Work out an expression for the $n$th term.

9 (b) A different quadratic sequence has $n$th term $n^2 + 10n$

Use an algebraic method to work out how many terms in the sequence are less than 2000.

Do not use trial and improvement. You must show your working.

✓ Worked Solution

Part (a): Find the $n$th term of the sequence [3 marks]

Step A1: Find the First and Second Differences

🌱 Why we do this:

For a quadratic sequence, the $n$th term is $an^2 + bn + c$. The second difference is always $2a$.

Sequence terms ($T_n$):

-2 -1 4 13

First differences ($\Delta_1$):

1 5 9

Second differences ($\Delta_2$):

4 4

Since the second difference is 4, we have $2a = 4$, so $a=2$.

✓ (M1) Finding the second difference of 4.

Step A2: Find $b$ and $c$

🌱 Why we do this:

We know the $n$th term is $T_n = 2n^2 + bn + c$. We can use simultaneous equations or compare the sequence to $2n^2$.

We will compare the original sequence with $2n^2$:

$n$: 1 2 3 4

Sequence $T_n$: -2 -1 4 13

$2n^2$: 2(1) 2(4) 2(9) 2(16)

$2n^2$: 2 8 18 32

Difference $D_n = T_n – 2n^2$:

$D_n$: -4 -9 -14 -19

This new sequence $D_n$ must be linear, of the form $bn + c$. The difference between these terms is $-5$. So $b = -5$.

✓ (M1 dep) Correctly finding the first difference of the sequence minus $2n^2$ (or solving simultaneous equations).

The sequence is $-5n + c$. For $n=1$, $-5(1) + c = -4$, so $c = -4 + 5 = 1$.

Therefore, the $n$th term is $2n^2 – 5n + 1$.

🧠 What this tells us:

The expression $T_n = 2n^2 – 5n + 1$ generates the given sequence. We can quickly check the first term: $2(1)^2 – 5(1) + 1 = 2 – 5 + 1 = -2$. Correct.

Final Answer (9a):

$2n^2 – 5n + 1$

(A1)

Part (b): Find how many terms are less than 2000 [3 marks]

Step B1: Set up the Inequality

🌱 Why we do this:

We need to find the number of terms ($n$) for which the value is less than 2000. We set up an inequality and solve it algebraically, as required by the question.

\[ n^2 + 10n < 2000 \] \[ n^2 + 10n - 2000 < 0 \]

✓ (M1) Setting up the correct inequality in this form.

Step B2: Find the Roots of the Corresponding Equation

🌱 Why we do this:

The roots of $n^2 + 10n – 2000 = 0$ tell us the boundaries for $n$. We can solve this by factoring or using the quadratic formula. Since $10$ is the difference between $-40$ and $50$, and their product is $-2000$, factoring is the fastest method.

Factorising $n^2 + 10n – 2000$:

\[ (n – 40)(n + 50) = 0 \]

The roots are $n = 40$ and $n = -50$.

✓ (M1) Correct method to solve the equation (e.g., factoring or quadratic formula).

Alternatively, using the quadratic formula:

\[ n = \frac{-10 \pm \sqrt{10^2 – 4(1)(-2000)}}{2} \] \[ n = \frac{-10 \pm \sqrt{100 + 8000}}{2} \] \[ n = \frac{-10 \pm \sqrt{8100}}{2} = \frac{-10 \pm 90}{2} \] \[ n = \frac{80}{2} = 40 \quad \text{or} \quad n = \frac{-100}{2} = -50 \]

🧠 What this tells us:

The graph of $y = n^2 + 10n – 2000$ is a U-shaped parabola crossing the $n$-axis at $-50$ and $40$. The expression $n^2 + 10n – 2000$ is less than 0 (i.e., the term is less than 2000) when $-50 < n < 40$.

Step B3: Interpret the Inequality for $n$

🌱 Why we do this:

Since $n$ must be a positive integer (term number), we use the condition $-50 < n < 40$ to find the valid values of $n$.

We need $n^2 + 10n – 2000 < 0$, which means $-50 < n < 40$.

Since $n$ is the term number, $n$ must be a positive integer, so $n \ge 1$.

The terms that are less than 2000 are for $n = 1, 2, 3, \dots, 39$.

The number of terms is $39$.

✓ (A1) Correct answer 39.

Final Answer (9b):

39

Total: 6 marks

↑ Back to Top

Question 10 (3 marks)

Rationalise and simplify fully

\[ \frac{\sqrt{3}}{3 + \sqrt{3}} \]

✓ Worked Solution

Step 1: Identify the Conjugate and Strategy

🌱 Why we do this:

To rationalise a denominator of the form $a + \sqrt{b}$, we multiply the numerator and the denominator by the conjugate, which is $a – \sqrt{b}$. The conjugate of $3 + \sqrt{3}$ is $3 – \sqrt{3}$.

\[ \frac{\sqrt{3}}{3 + \sqrt{3}} \times \frac{3 – \sqrt{3}}{3 – \sqrt{3}} \]

✓ (M1) Multiplying by $\frac{3 – \sqrt{3}}{3 – \sqrt{3}}$ (or equivalent conjugate fraction).

🧠 What this tells us:

The next step is to perform the multiplication for both the numerator and the denominator.

Step 2: Calculate the New Numerator and Denominator

🌱 Why we do this:

The multiplication $(a+b)(a-b) = a^2 – b^2$ simplifies the denominator to remove the surd.

Numerator:

\[ \sqrt{3}(3 – \sqrt{3}) = 3\sqrt{3} – \sqrt{3}\sqrt{3} = 3\sqrt{3} – 3 \]

Denominator:

\[ (3 + \sqrt{3})(3 – \sqrt{3}) = 3^2 – (\sqrt{3})^2 = 9 – 3 = 6 \]

The new fraction is:

\[ \frac{3\sqrt{3} – 3}{6} \]

✓ (M1 dep) Correctly expanding the numerator and denominator (e.g., obtaining $3\sqrt{3} – 3$ in the numerator and 6 in the denominator).

🧠 What this tells us:

The denominator is now rational (the surd is removed). We can now simplify the fraction by dividing all terms by the common factor of 3.

Step 3: Simplify the Fraction

🌱 Why we do this:

We divide every term in the numerator and the denominator by the common factor of 3 to simplify the expression fully.

\[ \frac{3\sqrt{3} – 3}{6} = \frac{3(\sqrt{3} – 1)}{6} \]

Divide numerator and denominator by 3:

\[ \frac{\sqrt{3} – 1}{2} \]

🧠 What this tells us:

The final, fully simplified and rationalised expression is $\frac{\sqrt{3} – 1}{2}$.

Final Answer:

$\frac{\sqrt{3} – 1}{2}$ or $\frac{\sqrt{3}}{2} – \frac{1}{2}$

Total: 3 marks

↑ Back to Top

Question 11 (4 marks)

Expand and simplify fully $(3 + 2x)^5$.

✓ Worked Solution

Step 1: Identify Binomial Coefficients

🌱 Why we do this:

We use the binomial expansion $(a+b)^n = \sum_{k=0}^{n} \binom{n}{k} a^{n-k} b^k$ with $n=5$, $a=3$, and $b=2x$. We first need the coefficients for $n=5$, which are the numbers in the 5th row of Pascal’s triangle.

The coefficients for $n=5$ are:

\[ \binom{5}{0}, \binom{5}{1}, \binom{5}{2}, \binom{5}{3}, \binom{5}{4}, \binom{5}{5} \]

Coefficients: $1, 5, 10, 10, 5, 1$.

✓ (M1) Evidence of using the coefficients 1, 5, 10, 10, 5, 1.

🧠 What this tells us:

We will have 6 terms in the expansion, and we must apply the correct powers of $a=3$ and $b=2x$ to each coefficient.

Step 2: Write out the Full Expansion

🌱 Why we do this:

We systematically write out the 6 terms, ensuring the powers of $3$ decrease from 5 to 0 and the powers of $(2x)$ increase from 0 to 5. Crucially, we treat $2x$ as a single term $(2x)$ when applying the power.

Expansion of $(3 + 2x)^5$:

\[ (1)(3^5)(2x)^0 + (5)(3^4)(2x)^1 + (10)(3^3)(2x)^2 + (10)(3^2)(2x)^3 + (5)(3^1)(2x)^4 + (1)(3^0)(2x)^5 \]

✓ (M1 dep) All terms correct, including powers and the bracket $(2x)$.

🧠 What this tells us:

We now calculate the value of each term by applying the powers and multiplying the coefficients.

Step 3: Calculate the Value of Each Term

🌱 Why we do this:

We perform the arithmetic, noting that $(2x)^k = 2^k x^k$.

Term 1: $1 \times 3^5 \times 1 = 1 \times 243 = 243$

Term 2: $5 \times 3^4 \times (2x) = 5 \times 81 \times 2x = 810x$

Term 3: $10 \times 3^3 \times (4x^2) = 10 \times 27 \times 4x^2 = 1080x^2$

Term 4: $10 \times 3^2 \times (8x^3) = 10 \times 9 \times 8x^3 = 720x^3$

Term 5: $5 \times 3^1 \times (16x^4) = 5 \times 3 \times 16x^4 = 240x^4$

Term 6: $1 \times 1 \times (32x^5) = 32x^5$

✓ (M1 dep) At least four terms correctly simplified.

Summing the terms:

\[ 243 + 810x + 1080x^2 + 720x^3 + 240x^4 + 32x^5 \]

🧠 What this tells us:

We have now fully expanded and simplified the expression.

Final Answer:

$243 + 810x + 1080x^2 + 720x^3 + 240x^4 + 32x^5$

Total: 4 marks

↑ Back to Top

Question 12 (3 marks)

The $n$th term of a sequence is

\[ \frac{3n^2}{n^2 + 2} \]

12 (a) One term in the sequence is $\frac{32}{11}$.

Work out the value of $n$.

12 (b) Write down the limiting value of the sequence as $n \to \infty$.

✓ Worked Solution

Part (a): Find the value of $n$ [2 marks]

Step A1: Form the Equation and Cross-Multiply

🌱 Why we do this:

We set the $n$th term expression equal to the given term value and solve for $n$. Cross-multiplication is the algebraic method to clear the denominators.

\[ \frac{3n^2}{n^2 + 2} = \frac{32}{11} \]

Cross-multiply (multiply both sides by $11$ and by $(n^2 + 2)$):

\[ 11(3n^2) = 32(n^2 + 2) \] \[ 33n^2 = 32n^2 + 64 \]

✓ (M1) Setting up the correct equation and clearing both denominators (or equivalent).

🧠 What this tells us:

The result is a simple quadratic equation in terms of $n^2$.

Step A2: Solve the Equation for $n$

🌱 Why we do this:

We rearrange the equation to isolate $n^2$ and then take the square root to find $n$.

Subtract $32n^2$ from both sides:

\[ 33n^2 – 32n^2 = 64 \] \[ n^2 = 64 \]

Take the square root:

\[ n = \pm \sqrt{64} = \pm 8 \]

Since $n$ must be a positive integer (term number), $n=8$.

✓ (A1) Correct answer $n=8$.

Final Answer (12a):

8

(Total: 2 marks)

Part (b): Limiting value as $n \to \infty$ [1 mark]

Step B1: Analyze the Limit of the Sequence

🌱 Why we do this:

As $n \to \infty$, the constant term $+2$ in the denominator becomes insignificant compared to $n^2$. A formal way to find the limit of an algebraic fraction is to divide the numerator and the denominator by the highest power of $n$, which is $n^2$.

\[ \lim_{n \to \infty} \left(\frac{3n^2}{n^2 + 2}\right) = \lim_{n \to \infty} \left(\frac{\frac{3n^2}{n^2}}{\frac{n^2}{n^2} + \frac{2}{n^2}}\right) \] \[ = \lim_{n \to \infty} \left(\frac{3}{1 + \frac{2}{n^2}}\right) \]

As $n \to \infty$, $\frac{2}{n^2} \to 0$:

\[ \text{Limit} = \frac{3}{1 + 0} = 3 \]

✓ (B1) Correct limiting value.

🧠 What this tells us:

For large $n$, the terms of the sequence will get closer and closer to 3.

Final Answer (12b):

3

(Total: 3 marks)

↑ Back to Top

Question 13 (3 marks)

Simplify fully $(6x^3y^{-2} + 9x^5y) \div 3x^2y^{-3}$.

✓ Worked Solution

Step 1: Convert Division to a Fraction and Separate Terms

🌱 Why we do this:

The expression involves two terms being divided by a single term. We can simplify this by splitting the fraction into two separate terms, each divided by $3x^2y^{-3}$.

\[ \frac{6x^3y^{-2} + 9x^5y}{3x^2y^{-3}} = \frac{6x^3y^{-2}}{3x^2y^{-3}} + \frac{9x^5y}{3x^2y^{-3}} \]

✓ (B1) Dividing both terms in the numerator by the denominator (implied by correct final powers/coefficients).

🧠 What this tells us:

We now have two simpler fractions to simplify using the rules of indices: $a^m \div a^n = a^{m-n}$ and constant division.

Step 2: Simplify the First Term $\frac{6x^3y^{-2}}{3x^2y^{-3}}$

🌱 Why we do this:

We simplify the coefficients, and subtract the powers for the $x$ and $y$ terms.

Coefficient: $6 \div 3 = 2$

$x$ power: $x^{3-2} = x^1 = x$

$y$ power: $y^{-2 – (-3)} = y^{-2 + 3} = y^1 = y$

First term simplified: $2xy$

✓ (B1) Correctly simplifying the coefficients (2 and 3) OR the $x$ terms ($x$ and $x^3$) OR the $y$ terms ($y$ and $y^4$).

Step 3: Simplify the Second Term $\frac{9x^5y}{3x^2y^{-3}}$

🌱 Why we do this:

We repeat the process for the second term.

Coefficient: $9 \div 3 = 3$

$x$ power: $x^{5-2} = x^3$

$y$ power: $y^{1 – (-3)} = y^{1 + 3} = y^4$

Second term simplified: $3x^3y^4$

✓ (B1) Correctly simplifying the coefficients (2 and 3) OR the $x$ terms ($x$ and $x^3$) OR the $y$ terms ($y$ and $y^4$).

Step 4: Combine the Simplified Terms

🧠 What this tells us:

The full simplified expression is the sum of the two simplified terms.

\[ 2xy + 3x^3y^4 \]

Final Answer:

$2xy + 3x^3y^4$

Total: 3 marks

↑ Back to Top

Question 14 (3 marks)

Rearrange $ef = \frac{5e + 4}{3}$ to make $e$ the subject.

✓ Worked Solution

Step 1: Eliminate the Denominator

🌱 Why we do this:

To begin rearranging for $e$, we must first clear the fraction by multiplying both sides of the equation by 3.

\[ ef = \frac{5e + 4}{3} \]

Multiply both sides by 3:

\[ 3ef = 5e + 4 \]

✓ (M1) Multiplying by 3 to eliminate the fraction, or equivalent first step (e.g., $ef – \frac{5e}{3} = \frac{4}{3}$).

🧠 What this tells us:

The equation is now linear, but the subject variable $e$ appears in two separate terms on opposite sides.

Step 2: Collect all Terms Containing $e$

🌱 Why we do this:

We move all terms containing $e$ to one side (the left side) and all other terms (constants and terms not containing $e$) to the other side.

Subtract $5e$ from both sides:

\[ 3ef – 5e = 4 \]

🧠 What this tells us:

The $e$ terms are now collected. We can now factor out $e$ using the reverse of the distributive property.

Step 3: Factorise and Divide

🌱 Why we do this:

Factorising $e$ allows us to have a single instance of $e$ multiplied by a bracket, which we can then divide by to make $e$ the subject.

Factor out $e$:

\[ e(3f – 5) = 4 \]

✓ (M1 dep) Correctly isolating the $e$ term and factorising $e$.

Divide both sides by $(3f – 5)$:

\[ e = \frac{4}{3f – 5} \]

🧠 What this tells us:

The variable $e$ is now the subject of the formula.

Final Answer:

$e = \frac{4}{3f – 5}$

Total: 3 marks

↑ Back to Top

Question 15 (5 marks)

$B$, $C$ and $D$ are points on a circle, centre $P$.

$AB$ and $AC$ are tangents to the circle.

Prove that $y = 90 + \frac{x}{2}$

✓ Worked Solution

Step 1: Find the angles $\angle PBA$ and $\angle PCA$

🌱 Why we do this:

The radius to the point of tangency is perpendicular to the tangent. This establishes two right angles in the quadrilateral $ABPC$. This is a key geometric relationship for this proof.

Since $AB$ is a tangent to the circle and $PB$ is a radius:

\[ \angle PBA = 90^\circ \]

Since $AC$ is a tangent to the circle and $PC$ is a radius:

\[ \angle PCA = 90^\circ \]

✓ (B1) States $\angle PBA = 90^\circ$ or $\angle PCA = 90^\circ$ (or $\angle ABP = 90$ etc.).

Step 2: Find the Central Angle $\angle BPC$

🌱 Why we do this:

The sum of interior angles in the quadrilateral $ABPC$ is $360^\circ$. We can use this to express the angle $\angle BPC$ (let’s call it the minor angle for now) in terms of $x$.

In quadrilateral $ABPC$:

\[ \angle BAC + \angle PBA + \angle PCA + \angle BPC = 360^\circ \] \[ x + 90^\circ + 90^\circ + \angle BPC = 360^\circ \] \[ x + 180^\circ + \angle BPC = 360^\circ \]

Minor $\angle BPC = 180^\circ – x$

✓ (B1) Correct expression for minor $\angle BPC$, i.e., $180^\circ – x$.

Step 3: Find the Angle $\angle BDC$ in terms of $x$

🌱 Why we do this:

The angle at the centre is twice the angle at the circumference subtended by the same arc. The reflex angle $\angle BPC$ subtends the major arc $BDC$, and $\angle BDC$ (angle $y$) is the angle at the circumference.

First, find the reflex angle $\angle BPC$:

\[ \text{Reflex } \angle BPC = 360^\circ – \text{Minor } \angle BPC \] \[ \text{Reflex } \angle BPC = 360^\circ – (180^\circ – x) = 180^\circ + x \]

Angle at the circumference ($\angle BDC = y$) is half the reflex angle:

\[ y = \frac{\text{Reflex } \angle BPC}{2} \] \[ y = \frac{180^\circ + x}{2} \]

✓ (B1) Correct expression for reflex $\angle BPC$, i.e., $180^\circ + x$.

Step 4: Final Rearrangement

🌱 Why we do this:

We simplify the fraction to match the required form $y = 90 + \frac{x}{2}$.

\[ y = \frac{180^\circ}{2} + \frac{x}{2} \] \[ y = 90^\circ + \frac{x}{2} \]

✓ (B1 dep) Correct equation in terms of $x$ and $y$ and correctly rearranged to $y = 90 + \frac{x}{2}$.

Step 5: State the Three Geometric Reasons

🌱 Why we do this:

A full proof requires justification of the geometric steps. The main theorems used are the Tangent-Radius theorem, Angles in a Quadrilateral, and Angle at Centre vs. Angle at Circumference.

Reason 1: The radius to the point of tangency is perpendicular to the tangent ($\angle PBA = \angle PCA = 90^\circ$).

Reason 2: Angles in a quadrilateral ($ABPC$) sum to $360^\circ$.

Reason 3: The angle at the centre (Reflex $\angle BPC$) is twice the angle at the circumference ($\angle BDC$) subtended by the same arc ($BDC$).

✓ (B1 dep) Three correct reasons for the steps used.

Final Answer:

Proof shown using geometric theorems.

Total: 5 marks

↑ Back to Top

Question 16 (6 marks)

Solve the simultaneous equations

\[ x – y = \frac{19}{4} \] \[ xy = -3 \]

Do not use trial and improvement. You must show your working.

✓ Worked Solution

Step 1: Rearrange the Linear Equation and Substitute

🌱 Why we do this:

We rearrange the linear equation ($x – y = \frac{19}{4}$) to express one variable in terms of the other, which allows us to substitute it into the quadratic equation ($xy = -3$). It’s easiest to make $y$ the subject of the linear equation.

Rearrange $x – y = \frac{19}{4}$ to make $y$ the subject:

\[ y = x – \frac{19}{4} \]

Substitute this expression for $y$ into the equation $xy = -3$:

\[ x \left(x – \frac{19}{4}\right) = -3 \]

✓ (M1) Correct substitution of one variable from the linear equation into the quadratic equation.

🧠 What this tells us:

The system is now reduced to a single quadratic equation in terms of $x$, which we need to solve.

Step 2: Simplify to a Standard Quadratic Form

🌱 Why we do this:

We expand the brackets and clear the fraction to get a quadratic equation in the form $ax^2 + bx + c = 0$ with integer coefficients, which is easier to solve.

Expand the brackets:

\[ x^2 – \frac{19}{4}x = -3 \]

Multiply by 4 to clear the fraction and add 3 to both sides:

\[ 4x^2 – 19x = -12 \] \[ 4x^2 – 19x + 12 = 0 \]

✓ (M1 dep) Forming a quadratic equation with integer coefficients (e.g., $4x^2 – 19x + 12 = 0$).

🧠 What this tells us:

We have a quadratic equation we can now solve by factoring or using the quadratic formula.

Step 3: Solve the Quadratic Equation for $x$

🌱 Why we do this:

We find the two possible values of $x$.

Using the quadratic formula for $4x^2 – 19x + 12 = 0$, with $a=4$, $b=-19$, $c=12$:

\[ x = \frac{-(-19) \pm \sqrt{(-19)^2 – 4(4)(12)}}{2(4)} \] \[ x = \frac{19 \pm \sqrt{361 – 192}}{8} \] \[ x = \frac{19 \pm \sqrt{169}}{8} \] \[ x = \frac{19 \pm 13}{8} \]

✓ (M1 dep) Correct substitution into the quadratic formula or finding factors/roots correctly.

Case 1 (using +): $x = \frac{19 + 13}{8} = \frac{32}{8} = 4$

Case 2 (using -): $x = \frac{19 – 13}{8} = \frac{6}{8} = \frac{3}{4}$

The two values for $x$ are $4$ and $\frac{3}{4}$.

✓ (A1) Both correct values for $x$ (4 and $\frac{3}{4}$).

Step 4: Find the Corresponding Values of $y$

🌱 Why we do this:

We use the simpler quadratic equation $xy = -3$ (or the rearranged linear equation) to find the $y$ value for each $x$ value.

Use $y = \frac{-3}{x}$:

For $x = 4$: $y = \frac{-3}{4}$

For $x = \frac{3}{4}$: $y = \frac{-3}{\frac{3}{4}} = -3 \times \frac{4}{3} = -4$

✓ (A2) All four values correct and paired. (A1 for finding one correct pair).

🧠 What this tells us:

The solutions are the pairs $(4, -\frac{3}{4})$ and $(\frac{3}{4}, -4)$.

Final Answer:

$x = 4, y = -\frac{3}{4}$ and $x = \frac{3}{4}, y = -4$

Total: 6 marks

↑ Back to Top

Question 17 (6 marks)

The point $P$ lies on the circle $x^2 + y^2 = 16$.

The line $OP$ is at an angle of $60^\circ$ to the positive $x$-axis.

17 (a) Show that the coordinates of point $P$ are $(2, 2\sqrt{3})$.

17 (b) Work out the equation of the tangent to the circle at $P$.

Write your answer in the form $x + ay = b$, where $a$ and $b$ are constants.

✓ Worked Solution

Part (a): Show coordinates of $P$ are $(2, 2\sqrt{3})$ [2 marks]

Step A1: Use Polar Coordinates and Exact Values

🌱 Why we do this:

The equation $x^2 + y^2 = 16$ tells us the radius $r$ is $\sqrt{16} = 4$. The line $OP$ forms a right-angled triangle with the axes, so we can find the coordinates $(x, y)$ using $x = r \cos \theta$ and $y = r \sin \theta$.

Radius $r = \sqrt{16} = 4$. Angle $\theta = 60^\circ$.

x-coordinate:

\[ x = r \cos \theta = 4 \cos 60^\circ \]

Since $\cos 60^\circ = \frac{1}{2}$:

\[ x = 4 \times \frac{1}{2} = 2 \]

y-coordinate:

\[ y = r \sin \theta = 4 \sin 60^\circ \]

Since $\sin 60^\circ = \frac{\sqrt{3}}{2}$:

\[ y = 4 \times \frac{\sqrt{3}}{2} = 2\sqrt{3} \]

✓ (M1) Use of $4 \cos 60^\circ$ and $4 \sin 60^\circ$ or correct ratio work on a 1:$\sqrt{3}$:2 triangle for a radius of 4.

The coordinates of $P$ are $(2, 2\sqrt{3})$.

✓ (A1) Both coordinates correct, showing the result is $(2, 2\sqrt{3})$.

🧠 What this tells us:

The exact coordinates of $P$ are confirmed to be $(2, 2\sqrt{3})$.

Part (b): Find the equation of the tangent at $P$ [4 marks]

Step B1: Find the Gradient of the Radius $OP$

🌱 Why we do this:

The tangent is perpendicular to the radius at the point of contact, $P$. We first find the gradient of the radius $OP$ using the formula $m = \frac{y_2 – y_1}{x_2 – x_1}$.

Points are $O(0, 0)$ and $P(2, 2\sqrt{3})$.

\[ m_{OP} = \frac{2\sqrt{3} – 0}{2 – 0} = \frac{2\sqrt{3}}{2} = \sqrt{3} \]

Alternatively, since the angle is $60^\circ$, $m_{OP} = \tan 60^\circ = \sqrt{3}$.

✓ (M1) Finding the gradient of the radius $OP$, $\sqrt{3}$.

Step B2: Find the Gradient of the Tangent

🌱 Why we do this:

The gradient of the tangent $m_T$ is the negative reciprocal of the radius gradient $m_{OP}$, so $m_T = -\frac{1}{m_{OP}}$.

\[ m_{T} = -\frac{1}{\sqrt{3}} \]

✓ (M1) Correctly finding the gradient of the tangent $-\frac{1}{\sqrt{3}}$ (or equivalent).

Step 3: Determine the Equation of the Tangent

🌱 Why we do this:

We use the point-gradient form, $y – y_1 = m(x – x_1)$, with $m = -\frac{1}{\sqrt{3}}$ and $(x_1, y_1) = (2, 2\sqrt{3})$, and then rearrange it into the required form $x + ay = b$.

\[ y – 2\sqrt{3} = -\frac{1}{\sqrt{3}}(x – 2) \]

Multiply both sides by $\sqrt{3}$ to clear the fraction:

\[ \sqrt{3}y – 2\sqrt{3}(\sqrt{3}) = -1(x – 2) \] \[ \sqrt{3}y – 6 = -x + 2 \]

✓ (M1 dep) Correctly setting up the equation of the line and expanding/clearing the surd (e.g., $\sqrt{3}y – 6 = -x + 2$).

Rearrange into the form $x + ay = b$:

Add $x$ to both sides and add 6 to both sides:

\[ x + \sqrt{3}y = 2 + 6 \] \[ x + \sqrt{3}y = 8 \]

🧠 What this tells us:

The equation of the tangent is $x + \sqrt{3}y = 8$, which is in the required form with $a = \sqrt{3}$ and $b = 8$.

Final Answer (17a): Show that the coordinates of point $P$ are $(2, 2\sqrt{3})$. (Shown in Step A1)

Final Answer (17b):

$x + \sqrt{3}y = 8$

Total: 6 marks

↑ Back to Top

Question 18 (3 marks)

In triangle $RST$, $RS : ST = 1 : 4$.

Work out the exact value of $\sin \theta$.

✓ Worked Solution

Step 1: Apply the Sine Rule

🌱 Why we do this:

We are given a side ratio ($RS:ST$) and two opposite angles ($\angle T = \theta$ and $\angle R = 135^\circ$). The Sine Rule relates the ratio of a side length to the sine of its opposite angle: $\frac{a}{\sin A} = \frac{b}{\sin B}$.

The side opposite $\angle T$ is $RS$. The side opposite $\angle R$ is $ST$.

\[ \frac{RS}{\sin T} = \frac{ST}{\sin R} \]

Substitute the known angle and variable:

\[ \frac{RS}{\sin \theta} = \frac{ST}{\sin 135^\circ} \]

✓ (M1) Correctly applying the Sine Rule.

🧠 What this tells us:

We can rearrange this equation to solve for $\sin \theta$: $\sin \theta = \sin 135^\circ \times \frac{RS}{ST}$.

Step 2: Substitute the Side Ratio and Exact Trig Value

🌱 Why we do this:

We use the given ratio $RS:ST = 1:4$, which means $\frac{RS}{ST} = \frac{1}{4}$. We also recall the exact value for $\sin 135^\circ$.

From $RS:ST = 1:4$, we have $\frac{RS}{ST} = \frac{1}{4}$.

The exact value for $\sin 135^\circ$ is $\sin(180^\circ – 45^\circ) = \sin 45^\circ$:

\[ \sin 135^\circ = \frac{1}{\sqrt{2}} \text{ or } \frac{\sqrt{2}}{2} \]

✓ (B1) Correct exact value for $\sin 135^\circ$ (e.g., $\frac{\sqrt{2}}{2}$ or $\frac{1}{\sqrt{2}}$).

Substitute these into the rearranged Sine Rule $\sin \theta = \sin 135^\circ \times \frac{RS}{ST}$:

\[ \sin \theta = \left(\frac{\sqrt{2}}{2}\right) \times \left(\frac{1}{4}\right) \]

🧠 What this tells us:

The final calculation is simple multiplication.

Step 3: Calculate the Final Exact Value

🌱 Why we do this:

We multiply the two fractions to get the exact value of $\sin \theta$.

\[ \sin \theta = \frac{\sqrt{2} \times 1}{2 \times 4} = \frac{\sqrt{2}}{8} \]

✓ (A1) Correct exact value $\frac{\sqrt{2}}{8}$ (or equivalent).

Final Answer:

$\frac{\sqrt{2}}{8}$

Total: 3 marks

↑ Back to Top

Question 19 (3 marks)

Write $6x^2 – 24x + 17$ in the form $a(x + b)^2 + c$, where $a$, $b$ and $c$ are integers.

✓ Worked Solution

Step 1: Factor out $a$ from the first two terms

🌱 Why we do this:

To put a quadratic expression into the completed square form $a(x + b)^2 + c$, we first factor out the coefficient of $x^2$, which is $a=6$, from the terms involving $x$.

\[ 6x^2 – 24x + 17 = 6(x^2 – 4x) + 17 \]

✓ (M1) Factorising 6 out of the first two terms (e.g., $6(x^2 – 4x)$).

🧠 What this tells us:

We now complete the square on the simpler quadratic expression inside the bracket, $x^2 – 4x$.

Step 2: Complete the Square on the Inner Expression

🌱 Why we do this:

We write $x^2 – 4x$ as a perfect square, $(x – 2)^2$, and adjust for the constant term introduced by squaring.

Complete the square for $x^2 – 4x$:

\[ x^2 – 4x = (x – 2)^2 – 2^2 = (x – 2)^2 – 4 \]

Substitute this back into the full expression:

\[ 6[(x – 2)^2 – 4] + 17 \]

✓ (M1 dep) Correctly completing the square on the bracketed term (e.g., $6[(x-2)^2 – 4]\dots$).

Step 3: Expand and Simplify to the Final Form

🌱 Why we do this:

We expand the outer bracket to combine the constant terms and achieve the final required form $a(x + b)^2 + c$.

Distribute the 6:

\[ 6(x – 2)^2 – 6(4) + 17 \] \[ 6(x – 2)^2 – 24 + 17 \]

Combine the constant terms:

\[ 6(x – 2)^2 – 7 \]

This is in the form $a(x+b)^2 + c$ with $a=6$, $b=-2$, and $c=-7$.

✓ (A1) Correct final expression $6(x-2)^2 – 7$.

Final Answer:

$6(x – 2)^2 – 7$

Total: 3 marks

↑ Back to Top

Question 20 (6 marks)

The curve $y = x^4 – 18x^2$ has three stationary points.

Work out the coordinates of the three stationary points and determine their nature.

You must show your working.

✓ Worked Solution

Step 1: Find $\frac{dy}{dx}$ and Set to Zero

🌱 Why we do this:

Stationary points occur where the gradient is zero. We use differentiation to find the gradient function $\frac{dy}{dx}$ and set it equal to 0 to find the $x$-coordinates.

Differentiate $y = x^4 – 18x^2$:

\[ \frac{dy}{dx} = 4x^3 – 36x \]

✓ (M1) Correctly differentiating one term (e.g., $4x^3$ or $-36x$).

Set $\frac{dy}{dx} = 0$:

\[ 4x^3 – 36x = 0 \]

🧠 What this tells us:

We have a cubic equation to solve for $x$, which should yield three roots (the $x$-coordinates of the stationary points).

Step 2: Solve for $x$ and Find $y$-coordinates

🌱 Why we do this:

We factorise the expression to find the roots, and then substitute each $x$ value back into the original equation, $y = x^4 – 18x^2$, to find the corresponding $y$-coordinate.

Factor out $4x$:

\[ 4x(x^2 – 9) = 0 \]

Factorise the difference of two squares $x^2 – 9$:

\[ 4x(x – 3)(x + 3) = 0 \]

✓ (M1 dep) Correctly factoring $\frac{dy}{dx}$ to find the three $x$ values ($0, 3, -3$).

The $x$-coordinates are $x=0$, $x=3$, and $x=-3$.

Find $y$-coordinates:

For $x=0$: $y = (0)^4 – 18(0)^2 = 0$. Point: $(0, 0)$.

For $x=3$: $y = (3)^4 – 18(3)^2 = 81 – 18(9) = 81 – 162 = -81$. Point: $(3, -81)$.

For $x=-3$: $y = (-3)^4 – 18(-3)^2 = 81 – 18(9) = 81 – 162 = -81$. Point: $(-3, -81)$.

✓ (A1) All three pairs of coordinates correct: $(0, 0), (3, -81), (-3, -81)$.

🧠 What this tells us:

The three stationary points are $(0, 0)$, $(3, -81)$, and $(-3, -81)$.

Step 3: Find $\frac{d^2y}{dx^2}$ for Nature Test

🌱 Why we do this:

The second derivative test determines the nature of each stationary point: if $\frac{d^2y}{dx^2} > 0$ it’s a minimum, and if $\frac{d^2y}{dx^2} < 0$ it's a maximum.

Differentiate $\frac{dy}{dx} = 4x^3 – 36x$:

\[ \frac{d^2y}{dx^2} = 12x^2 – 36 \]

✓ (M1) Finding the second derivative $\frac{d^2y}{dx^2}$ (e.g., $12x^2 – 36$).

Step 4: Test Each Point

🌱 Why we do this:

We substitute each $x$-coordinate into $\frac{d^2y}{dx^2}$ to find the nature.

At $(0, 0)$:

\[ \frac{d^2y}{dx^2} = 12(0)^2 – 36 = -36 \]

Since $-36 < 0$, the point $(0, 0)$ is a **Maximum**.

At $(3, -81)$:

\[ \frac{d^2y}{dx^2} = 12(3)^2 – 36 = 12(9) – 36 = 108 – 36 = 72 \]

Since $72 > 0$, the point $(3, -81)$ is a **Minimum**.

At $(-3, -81)$:

\[ \frac{d^2y}{dx^2} = 12(-3)^2 – 36 = 12(9) – 36 = 108 – 36 = 72 \]

Since $72 > 0$, the point $(-3, -81)$ is a **Minimum**.

✓ (M1 dep) Correctly determining the nature of any one stationary point.

✓ (A1) All three points and their nature correctly identified.

Final Answer:

Stationary point $(0, 0)$ Nature: Maximum

Stationary point $(3, -81)$ Nature: Minimum

Stationary point $(-3, -81)$ Nature: Minimum

Total: 6 marks

↑ Back to Top

Question 21 (3 marks)

Show that

\[ \frac{4\cos^2 x + 3\sin^2 x – 4}{\cos^2 x} \equiv -\tan^2 x \]

✓ Worked Solution

Step 1: Use the Identity $\sin^2 x + \cos^2 x = 1$

🌱 Why we do this:

We start with the Left-Hand Side (LHS) and aim to simplify it to the Right-Hand Side (RHS), which is $-\tan^2 x$. The core Pythagorean identity, $\sin^2 x + \cos^2 x = 1$, allows us to rewrite the numerator in a simpler form, ideally in terms of a single trigonometric function.

Start with the LHS:

\[ \text{LHS} = \frac{4\cos^2 x + 3\sin^2 x – 4}{\cos^2 x} \]

Rewrite $4$ as $4 \times 1$ and substitute the identity: $1 = \sin^2 x + \cos^2 x$.

\[ 4 = 4(\sin^2 x + \cos^2 x) \]

Substitute this into the numerator of the LHS:

\[ \text{Numerator} = 4\cos^2 x + 3\sin^2 x – 4(\sin^2 x + \cos^2 x) \]

✓ (M1) Using the identity $\cos^2 x + \sin^2 x = 1$ to replace 1 or 4 (or another term) in the numerator.

🧠 What this tells us:

The numerator is now in a form where the terms can be combined.

Step 2: Collect Like Terms in the Numerator

🌱 Why we do this:

We expand the brackets in the numerator and simplify by collecting $\cos^2 x$ and $\sin^2 x$ terms.

\[ \text{Numerator} = 4\cos^2 x + 3\sin^2 x – 4\sin^2 x – 4\cos^2 x \]

Collect the terms:

\[ \text{Numerator} = (4\cos^2 x – 4\cos^2 x) + (3\sin^2 x – 4\sin^2 x) \] \[ \text{Numerator} = 0 – \sin^2 x = -\sin^2 x \]

The LHS becomes:

\[ \text{LHS} = \frac{-\sin^2 x}{\cos^2 x} \]

✓ (M1 dep) Simplifying the numerator to $-\sin^2 x$ (or $ \cos^2 x – 1 $ if rearranging the identity).

🧠 What this tells us:

The expression is now in terms of a familiar quotient identity.

Step 3: Convert to $\tan^2 x$

🌱 Why we do this:

We use the quotient identity $\tan x = \frac{\sin x}{\cos x}$, which means $\tan^2 x = \frac{\sin^2 x}{\cos^2 x}$, to match the RHS.

\[ \text{LHS} = \frac{-\sin^2 x}{\cos^2 x} = – \left(\frac{\sin^2 x}{\cos^2 x}\right) = -\tan^2 x \] \[ \text{LHS} \equiv -\tan^2 x = \text{RHS} \]

The identity is shown.

✓ (A1) Correctly showing that the LHS simplifies to $-\tan^2 x$.

Final Answer:

Proof shown (LHS $\equiv$ RHS).

Total: 3 marks

↑ Back to Top

Level 2 Certificate FURTHER MATHEMATICS (8365/1) – Paper 1 Non-Calculator

Mark Scheme Legend

Table of Contents (Total: 21 Questions)

Question 1 (3 marks)

✓ Worked Solution

Step 1: Understanding the Question

Step 2: Set up and Simplify the Equation

Step 3: Solve the Linear Equation

Question 2 (2 marks)

✓ Worked Solution

Step 1: Understand the Goal

Step 2: Substitute the Point and Gradient

Question 3 (6 marks)

✓ Worked Solution

Part (a): Drawing the Piecewise Graph [4 marks]

Step A1: Analyze Each Function Segment

Part (b): Inverse Function \(g^{-1}(x)\) [2 marks]

Step B1: Find the Inverse Function \(g^{-1}(x)\)

Question 4 (3 marks)

✓ Worked Solution

Part (a): Circle \(\tan^2 30^\circ\) [1 mark]

Step A1: Recall and Calculate the Exact Value

Part (b): Sketch \(y = \cos x\) [2 marks]

Step B1: Plot the Key Points of the Cosine Wave

Question 5 (3 marks)

✓ Worked Solution

Step 1: Expand the Left-Hand Side (LHS)

Step 2: Expand the Brackets and Collect Terms

Step 3: Equate the Coefficients of \(x\) to find \(a\)

Step 4: Equate the Constant Terms to find \(b\)

Question 6 (3 marks)

✓ Worked Solution

Step 1: Simplify \(y\) into a Sum of Power Terms

Step 2: Differentiate Each Term with Respect to \(x\)

Question 7 (3 marks)

✓ Worked Solution

Step 1: Identify Coordinates and the Distance Formula

Step 2: Calculate the Square of the Differences

Step 3: Calculate \(BC\)

Question 8 (3 marks)

✓ Worked Solution

Step 1: Identify the Transformation Matrices

Step 2: Calculate the Combined Matrix \(\mathbf{F}\mathbf{R}\)

Step 3: Compare the Result with the Target

Question 9 (6 marks)

✓ Worked Solution

Part (a): Find the \(n\)th term of the sequence [3 marks]

Step A1: Find the First and Second Differences

Step A2: Find \(b\) and \(c\)

Part (b): Find how many terms are less than 2000 [3 marks]

Step B1: Set up the Inequality

Step B2: Find the Roots of the Corresponding Equation

Step B3: Interpret the Inequality for \(n\)

Question 10 (3 marks)

✓ Worked Solution

Step 1: Identify the Conjugate and Strategy

Step 2: Calculate the New Numerator and Denominator

Step 3: Simplify the Fraction

Question 11 (4 marks)

✓ Worked Solution

Step 1: Identify Binomial Coefficients

Step 2: Write out the Full Expansion

Step 3: Calculate the Value of Each Term

Question 12 (3 marks)

✓ Worked Solution

Part (a): Find the value of \(n\) [2 marks]

Step A1: Form the Equation and Cross-Multiply

Step A2: Solve the Equation for \(n\)

Part (b): Limiting value as \(n \to \infty\) [1 mark]

Step B1: Analyze the Limit of the Sequence

Question 13 (3 marks)

✓ Worked Solution

Step 1: Convert Division to a Fraction and Separate Terms

Step 2: Simplify the First Term \(\frac{6x^3y^{-2}}{3x^2y^{-3}}\)

Step 3: Simplify the Second Term \(\frac{9x^5y}{3x^2y^{-3}}\)

Step 4: Combine the Simplified Terms

Question 14 (3 marks)

✓ Worked Solution

Step 1: Eliminate the Denominator

Step 2: Collect all Terms Containing \(e\)