Edexcel Higher June 2018 Paper 3

Question 1 (3 marks)

The scatter diagram shows information about 12 girls[cite: 180]. It shows the age of each girl and the best time she takes to run 100 metres[cite: 181].

(a) Write down the type of correlation[cite: 209].

(b) Kristina is 11 years old. Her best time to run 100 metres is 12 seconds. The point representing this information would be an outlier on the scatter diagram. Explain why[cite: 217, 218, 219, 220].

(c) Debbie is 15 years old. Debbie says, “The scatter diagram shows I should take less than 12 seconds to run 100 metres.” Comment on what Debbie says[cite: 221, 222, 223].

Worked Solution

Step 1: Identifying the Correlation (Part a)

Why we do this:

We need to observe the general pattern of the points on the graph. As the age (x-axis) increases, the time taken (y-axis) tends to decrease. A line of best fit would slope downwards from left to right.

✓ (B1) Correctly identifying the correlation[cite: 101].

Step 2: Understanding Outliers (Part b)

Why we do this:

We are told Kristina’s point (11 years, 12 seconds) is an outlier. If we plot \((11, 12)\) on the grid, it sits far below the main cluster of points for 11-year-olds. An outlier is a data point that differs significantly from other observations.

The point \((11, 12)\) does not fit the negative correlation pattern shown by the rest of the data.

✓ (C1) Providing a correct explanation[cite: 101].

Step 3: Analyzing Extrapolation (Part c)

What this tells us:

Debbie is 15. Look at the x-axis: the data only goes up to around 14 years of age. Predicting a value outside the range of given data is called extrapolation, and it is unreliable because we don’t know if the trend continues.

✓ (C1) Explaining that the point would be outside the reliable range of the scatter diagram[cite: 101].

Final Answer:

(a) Negative correlation [cite: 101]

(b) The point is not in line with the trend of the other points[cite: 101].

(c) The point would be outside of the range of the scatter diagram (extrapolation is unreliable)[cite: 101].

Total: 3 marks

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Question 2 (2 marks)

Expand and simplify \( 5(p+3) – 2(1-2p) \) [cite: 226]

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Question 3 (2 marks)

Here is a trapezium drawn on a centimetre grid[cite: 234]. On the grid, draw a triangle equal in area to this trapezium[cite: 235].

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Question 4 (2 marks)

When a biased 6-sided dice is thrown once, the probability that it will land on 4 is 0.65[cite: 246]. The biased dice is thrown twice.

Amir draws this probability tree diagram. The diagram is not correct[cite: 247].

Write down two things that are wrong with the probability tree diagram[cite: 262].

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Question 5 (3 marks)

ABC is a right-angled triangle[cite: 267].

(a) Work out the size of angle ABC. Give your answer correct to 1 decimal place[cite: 273, 274].

The length of the side AB is reduced by 1 cm[cite: 275]. The length of the side BC is still 7 cm. Angle ACB is still 90°[cite: 276].

(b) Will the value of \(\cos ABC\) increase or decrease? You must give a reason for your answer[cite: 277, 278].

Worked Solution

Step 1: Finding angle ABC (Part a)

Why we do this:

We need to find the size of the angle at B. Looking from angle B, we know the Adjacent side (BC = 7 cm) and the Hypotenuse (AB = 11 cm). Because we have Adjacent and Hypotenuse, we use the Cosine ratio: \(\cos(\theta) = \frac{\text{Adjacent}}{\text{Hypotenuse}}\).

Working:

\[ \cos(ABC) = \frac{7}{11} \]

✓ (M1) For writing the complete statement for cos[cite: 102].

Calculator Steps:

Ensure calculator is in DEGREES mode.
Use the inverse cosine function: \(\cos^{-1}(\frac{7}{11})\)
Press: SHIFT cos (7 ÷ 11) =

\[ ABC = \cos^{-1}\left(\frac{7}{11}\right) = 50.4788…^\circ \]

Rounding to 1 decimal place gives 50.5°.

✓ (A1) Answer in the range 50.4 to 50.51[cite: 102].

Step 2: Evaluating the change in cosine (Part b)

Why we do this:

We are asked how the value of \(\cos ABC\) changes. The new hypotenuse AB is \(11 – 1 = 10 \text{ cm}\). The adjacent BC is still 7 cm.

Working:

The original value was \(\cos ABC = \frac{7}{11} \approx 0.636\).

The new value is \(\cos ABC = \frac{7}{10} = 0.7\).

Since \(0.7\) is greater than \(0.636\), the value of \(\cos ABC\) increases.

✓ (C1) States increase with supporting reason (e.g., 7/10 is greater than 7/11)[cite: 102].

Final Answer:

(a) 50.5° [cite: 102]

(b) Increase, because \(\frac{7}{10}\) is greater than \(\frac{7}{11}\)[cite: 102].

Total: 3 marks

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Question 6 (5 marks)

There are some counters in a bag. The counters are red or white or blue or yellow. Bob is going to take at random a counter from the bag.

The table shows each of the probabilities that the counter will be blue or will be yellow.

There are 18 blue counters in the bag.

The probability that the counter Bob takes will be red is twice the probability that the counter will be white.

(a) Work out the number of red counters in the bag.

A marble is going to be taken at random from a box of marbles. The probability that the marble will be silver is 0.5. There must be an even number of marbles in the box.

(b) Explain why.

Worked Solution

Step 1: Finding the total number of counters (Part a)

Why we do this:

We know that the probability of picking a blue counter is \(0.45\), and there are exactly 18 blue counters. This means that \(0.45\) (or 45%) of the total counters equals 18. We can use this to find the total number of counters in the bag.

Working:

\[ \text{Total counters} = 18 \div 0.45 \] \[ \text{Total counters} = 40 \]

✓ (P1) Process to find the total number of counters.

Step 2: Finding the probabilities for red and white (Part a)

Why we do this:

All probabilities in an experiment must add up to \(1\). We can subtract the known probabilities for blue and yellow to find the combined probability of drawing red or white.

Working:

\[ P(\text{red or white}) = 1 – 0.45 – 0.25 \] \[ P(\text{red}) + P(\text{white}) = 0.3 \]

We are told that \( P(\text{red}) = 2 \times P(\text{white}) \).

Let \( P(\text{white}) = x \). Then \( P(\text{red}) = 2x \).

\[ 2x + x = 0.3 \] \[ 3x = 0.3 \] \[ x = 0.1 \]

So, \( P(\text{red}) = 2 \times 0.1 = 0.2 \).

✓ (P1, P1) Process to find sum of unknown probabilities, and deriving/solving the equation.

Step 3: Calculating the number of red counters (Part a)

Why we do this:

Now that we know the probability of picking a red counter (\(0.2\)) and the total number of counters (\(40\)), we can find exactly how many red counters there are.

Working:

\[ \text{Number of red counters} = 0.2 \times 40 = 8 \]

✓ (A1) Correct answer only.

Step 4: Explaining the even number of marbles (Part b)

Why we do this:

If the probability of picking a silver marble is \(0.5\) (or exactly half), the number of silver marbles must be exactly half of the total number of marbles. Since we cannot have a fraction of a marble, the total must be divisible by 2.

Working:

To find the number of silver marbles, you multiply the total by 0.5. Half of an odd number results in a decimal, which implies half a marble (impossible). Therefore, the total number of marbles must be even to yield a whole number.

✓ (C1) Valid explanation linking the probability to the requirement of integer marbles.

Final Answer:

(a) 8

(b) 0.5 multiplied by an odd number will never be a whole number. Since you cannot have half a marble, the total number of marbles must be even.

Total: 5 marks

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Question 7 (3 marks)

Solve \(\frac{5-x}{2} = 2x – 7\)

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Question 8 (5 marks)

ABCDE is a pentagon.

Angle BCD = 2 \(\times\) angle ABC

Work out the size of angle BCD. You must show all your working.

Worked Solution

Step 1: Determine the total sum of angles in a pentagon

Why we do this:

To find the missing angles inside the shape, we first need to know what all the angles inside a pentagon add up to. The formula for the sum of interior angles in an \(n\)-sided polygon is \((n – 2) \times 180^\circ\).

Working:

A pentagon has 5 sides, so \(n = 5\).

\[ (5 – 2) \times 180^\circ = 3 \times 180^\circ = 540^\circ \]

✓ (P1, A1) Process to find sum of interior angles, and evaluating to 540.

Step 2: Find the sum of the two unknown angles

Why we do this:

We know three of the angles: \(125^\circ\), \(115^\circ\), and \(90^\circ\) (the right angle at D). We can subtract these from the total \(540^\circ\) to find what the remaining two angles (ABC and BCD) must add up to.

Working:

\[ \text{Sum of known angles} = 125^\circ + 115^\circ + 90^\circ = 330^\circ \] \[ \text{Angle ABC} + \text{Angle BCD} = 540^\circ – 330^\circ = 210^\circ \]

✓ (P1) Start to process to find angle ABC/BCD.

Step 3: Using algebra to find the specific angles

Why we do this:

The problem tells us that angle BCD is twice as big as angle ABC. We can set up an equation. If we let angle ABC be \(x\), then angle BCD must be \(2x\).

Working:

\[ x + 2x = 210^\circ \] \[ 3x = 210^\circ \] \[ x = 210^\circ \div 3 = 70^\circ \]

So, angle ABC = \(70^\circ\).

✓ (P1) Process to find the base angle components using the ratio 1:2.

Step 4: Calculate angle BCD

What this tells us:

The question specifically asks for angle BCD, which we established is \(2x\).

Working:

\[ \text{Angle BCD} = 2 \times 70^\circ = 140^\circ \]

✓ (A1) Correct answer only.

Final Answer:

140°

Total: 5 marks

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Question 9 (4 marks)

\( T = \sqrt{\frac{w}{d^3}} \)

\( w = 5.6 \times 10^{-5} \)
\( d = 1.4 \times 10^{-4} \)

(a) Work out the value of T. Give your answer in standard form correct to 3 significant figures.

w is increased by 10%
d is increased by 5%

Lottie says, “The value of T will increase because both w and d are increased.”

(b) Lottie is wrong. Explain why.

Worked Solution

Step 1: Calculating T (Part a)

Why we do this:

We need to substitute the given standard form values into the formula and calculate the result carefully using our calculator.

Working:

\[ T = \sqrt{\frac{5.6 \times 10^{-5}}{(1.4 \times 10^{-4})^3}} \]

First, calculate the denominator:

\[ (1.4 \times 10^{-4})^3 = 2.744 \times 10^{-12} \]

Next, perform the division:

\[ \frac{5.6 \times 10^{-5}}{2.744 \times 10^{-12}} = 20408163.27… \]

Finally, square root the answer:

\[ T = \sqrt{20408163.27…} = 4517.5395… \]

Convert to standard form to 3 significant figures:

\[ T = 4.52 \times 10^3 \]

✓ (M1, A1) For correct internal calculation and final standard form format.

Step 2: Testing the percentage changes (Part b)

Why we do this:

To prove Lottie wrong, we can mathematically check the impact of the percentage increases using decimal multipliers. Increasing by 10% is a multiplier of \(1.1\). Increasing by 5% is a multiplier of \(1.05\).

Working:

Let’s look at the effect of just the multipliers on the formula \( \sqrt{\frac{w}{d^3}} \):

\[ \text{Multiplier Effect} = \sqrt{\frac{1.1}{(1.05)^3}} \] \[ \text{Multiplier Effect} = \sqrt{\frac{1.1}{1.157625}} \] \[ \text{Multiplier Effect} = \sqrt{0.9502…} \approx 0.975 \]

Because the overall multiplier (\(0.975\)) is less than 1, multiplying the original T by this number will decrease the value, not increase it.

✓ (M1, C1) Calculating the scale factor and concluding that since it is < 1, T decreases.

Final Answer:

(a) \( 4.52 \times 10^3 \)

(b) Lottie is wrong because the denominator increases by a larger scale factor (\(1.05^3 \approx 1.158\)) than the numerator (\(1.1\)). The overall multiplier is \(\sqrt{\frac{1.1}{1.05^3}} \approx 0.975\), which is less than 1, causing the value of T to decrease.

Total: 4 marks

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Question 10 (3 marks)

There are three lamps, lamp A, lamp B and lamp C.

Lamp A flashes every 20 seconds.
Lamp B flashes every 45 seconds.
Lamp C flashes every 120 seconds.

The three lamps start flashing at the same time.

How many times in one hour will the three lamps flash at the same time?

Worked Solution

Step 1: Find when they next flash together

Why we do this:

The lamps will flash together at a time (in seconds) that is a common multiple of their individual flashing intervals: 20, 45, and 120. We need to find the Lowest Common Multiple (LCM) to find out how many seconds it takes for all three to sync up again.

Working:

Write each number as a product of prime factors:

\( 20 = 4 \times 5 = 2^2 \times 5 \)
\( 45 = 9 \times 5 = 3^2 \times 5 \)
\( 120 = 12 \times 10 = 2^3 \times 3 \times 5 \)

To find the LCM, take the highest power of each prime factor present:

\[ \text{LCM} = 2^3 \times 3^2 \times 5 \] \[ \text{LCM} = 8 \times 9 \times 5 = 360 \text{ seconds} \]

This means all three lamps flash together every 360 seconds (which is exactly 6 minutes).

✓ (P1) Process to find the LCM of 20, 45, and 120.

Step 2: Calculate how many times this happens in an hour

Why we do this:

We need to know how many 360-second intervals fit into one hour. First, convert one hour into seconds, then divide by 360.

Working:

1 hour = 60 minutes = \( 60 \times 60 = 3600 \text{ seconds} \).

\[ \text{Number of flashes} = 3600 \div 360 = 10 \]

Note: If you count the flash at time = 0, there would be 11 flashes in total over the duration. The mark scheme accepts both 10 and 11.

✓ (P1, A1) Process to find number of times per hour, and accurate final answer.

Final Answer:

10 (or 11)

Total: 3 marks

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Question 11 (3 marks)

In 2003, Jerry bought a house.

In 2007, Jerry sold the house to Mia.
He made a profit of 20%

In 2012, Mia sold the house for £162 000.
She made a loss of 10%

Work out how much Jerry paid for the house in 2003.

Worked Solution

Step 1: Finding the 2007 price (Reverse Percentage)

Why we do this:

We need to work backwards from 2012 to 2003. First, we find out what Mia originally paid Jerry in 2007. Because Mia made a 10% loss, the £162,000 she sold it for represents 90% of what she paid (100% – 10% = 90%). We use reverse percentages (dividing by the decimal multiplier) to find the original 100%.

Working:

Multiplier for a 10% loss = \(0.9\)

\[ \text{Price in 2007} \times 0.9 = \pounds 162,000 \] \[ \text{Price in 2007} = \pounds 162,000 \div 0.9 \]

Calculator Steps:

Type: 162000 ÷ 0.9 =

\[ \text{Price in 2007} = \pounds 180,000 \]

✓ (P1) Process to find cost in 2007.

Step 2: Finding the 2003 price (Reverse Percentage)

Why we do this:

Now we know Jerry sold the house for £180,000. He made a 20% profit on his original 2003 purchase price. This means the £180,000 represents 120% of what he paid (100% + 20% = 120%). Again, we divide by the decimal multiplier to find his starting price.

Working:

Multiplier for a 20% profit = \(1.2\)

\[ \text{Price in 2003} \times 1.2 = \pounds 180,000 \] \[ \text{Price in 2003} = \pounds 180,000 \div 1.2 \]

Calculator Steps:

Type: 180000 ÷ 1.2 =

\[ \text{Price in 2003} = \pounds 150,000 \]

✓ (P1, A1) Process to find cost in 2003, and the final accurate answer.

Final Answer:

£150,000

Total: 3 marks

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Question 12 (4 marks)

The graph shows the volume of liquid (\(L\) litres) in a container at time \(t\) seconds.

(a) Find the gradient of the graph.

(b) Explain what this gradient represents.

The graph intersects the volume axis at \(L = 4\)

(c) Explain what this intercept represents.

Worked Solution

Step 1: Calculating the gradient (Part a)

Why we do this:

The gradient of a straight line is a measure of its steepness, calculated as “change in \(y\)” divided by “change in \(x\)”. First, we identify two clear points on the line. The line starts at \((0, 4)\) and ends cleanly at \((8, 16)\).

Working:

Change in \(y\) (Volume) \(= 16 – 4 = 12\)

Change in \(x\) (Time) \(= 8 – 0 = 8\)

\[ \text{Gradient} = \frac{\text{Change in Volume}}{\text{Change in Time}} = \frac{12}{8} \] \[ \text{Gradient} = 1.5 \]

✓ (M1, A1) Method to find the gradient of the line using scales, and obtaining 1.5.

Step 2: Interpreting the gradient (Part b)

What this tells us:

The gradient tells us how much the y-value changes for every 1 unit of the x-value. Here, it is the change in Volume (litres) per unit of Time (seconds). Therefore, the gradient represents the rate at which liquid is filling the container in litres per second.

✓ (C1) Explanation relating to the rate of change of volume with time.

Step 3: Interpreting the y-intercept (Part c)

What this tells us:

The y-intercept is where the line crosses the y-axis, which corresponds to \(t = 0\) (time is zero). At this exact starting moment, the volume is already 4 litres. This represents the initial amount of liquid in the container before any more was added.

✓ (C1) Explanation relating to the volume (amount) of liquid in the container at the start.

Final Answer:

(a) 1.5

(b) The rate at which the container fills (the change in litres per second).

(c) The amount of liquid in the container to start with (at \(t = 0\)).

Total: 4 marks

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Question 13 (3 marks)

Here are two similar solid shapes, shape A and shape B.

surface area of shape A : surface area of shape B = \( 3 : 4 \)

The volume of shape B is \( 10 \text{ cm}^3 \)

Work out the volume of shape A.
Give your answer correct to 3 significant figures.

Worked Solution

Step 1: Find the length scale factor (LSF)

Why we do this:

We are given the ratio of the surface areas (Area Scale Factor). To convert between areas and volumes, we must first find the linear (Length) Scale Factor. We do this by square-rooting the Area Scale Factor.

Working:

Area ratio (A : B) = \( 3 : 4 \)

Length ratio (A : B) = \( \sqrt{3} : \sqrt{4} \)

Length ratio = \( \sqrt{3} : 2 \)

This means the linear scale factor to go from B to A is \( \frac{\sqrt{3}}{2} \).

✓ (M1) Method to find ratio or scale factor of lengths.

Step 2: Calculate the volume of Shape A

Why we do this:

Once we have the linear ratio, we cube it to find the Volume Scale Factor. We then apply this to the volume of shape B to find the volume of shape A.

Working:

Volume ratio (A : B) = \( (\sqrt{3})^3 : (2)^3 \)

Volume ratio = \( 3\sqrt{3} : 8 \)

Volume of A = Volume of B \(\times\) Volume Scale Factor (B to A)

\[ \text{Volume of A} = 10 \times \frac{3\sqrt{3}}{8} \]

Calculator Steps:

Type: 10 × (3 × √3 ÷ 8) =

\[ \text{Volume of A} = 6.49519… \]

Rounding to 3 significant figures gives \( 6.50 \).

✓ (M1, A1) Complete method to find ratio of volumes and correct evaluated answer.

Final Answer:

\( 6.50 \text{ cm}^3 \)

Total: 3 marks

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Question 14 (2 marks)

There are 16 hockey teams in a league.

Each team played two matches against each of the other teams.

Work out the total number of matches played.

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Question 15 (4 marks)

The graph shows the speed of a car, in metres per second, during the first 20 seconds of a journey.

(a) Work out an estimate for the distance the car travelled in the first 20 seconds.
Use 4 strips of equal width.

(b) Is your answer to part (a) an underestimate or an overestimate of the actual distance the car travelled in the first 20 seconds? Give a reason for your answer.

Worked Solution

Step 1: Reading values from the graph for 4 strips

Why we do this:

The distance travelled is equal to the area under a speed-time graph. We are asked to estimate this area using 4 strips over 20 seconds. The width of each strip is \( \frac{20}{4} = 5 \) seconds. We need to read the speeds (y-values) at \( t = 0, 5, 10, 15, \) and \( 20 \).

Working:

Reading from the graph:

At \( t = 0 \), Speed \( = 0 \)
At \( t = 5 \), Speed \( \approx 22 \)
At \( t = 10 \), Speed \( \approx 28 \)
At \( t = 15 \), Speed \( \approx 32 \)
At \( t = 20 \), Speed \( \approx 35 \)

Step 2: Calculating the area of the strips

Why we do this:

We use the trapezium rule to find the area of each strip. The area of a trapezium is \( \frac{1}{2}(a+b)h \), where \(a\) and \(b\) are the parallel vertical heights (the speeds) and \(h\) is the strip width (5).

Working:

Area 1 (Triangle): \( \frac{1}{2} \times 5 \times (0 + 22) = 55 \)

Area 2 (Trapezium): \( \frac{1}{2} \times 5 \times (22 + 28) = 125 \)

Area 3 (Trapezium): \( \frac{1}{2} \times 5 \times (28 + 32) = 150 \)

Area 4 (Trapezium): \( \frac{1}{2} \times 5 \times (32 + 35) = 167.5 \)

Total Area \( = 55 + 125 + 150 + 167.5 = 497.5 \)

✓ (M1, M1) Method to find area of one strip, and complete correct method to find total area.

Step 3: Determining if it’s an underestimate or overestimate

What this tells us:

When you draw straight lines between the points on this specific curve to make trapezia, the straight lines sit slightly below the actual curve (because the curve is bending downwards or is concave). This means the area of the trapezia misses a small sliver of area under the curve.

✓ (C1) Underestimate (supported), since parts are not included below the graph.

Final Answer:

(a) 497.5 metres (Any estimate from 488 to 507 is acceptable)

(b) Underestimate, because the straight lines of the trapezia are drawn below the actual curve.

Total: 4 marks

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Question 16 (6 marks)

The \(n\)th term of a sequence is given by \(an^2 + bn\) where \(a\) and \(b\) are integers.

The 2nd term of the sequence is \(-2\)
The 4th term of the sequence is \(12\)

(a) Find the 6th term of the sequence.

Here are the first five terms of a different quadratic sequence.

0 2 6 12 20

(b) Find an expression, in terms of \(n\), for the \(n\)th term of this sequence.

Worked Solution

Step 1: Set up simultaneous equations (Part a)

Why we do this:

We are given the general formula \(an^2 + bn\) and two specific terms. By substituting \(n=2\) and \(n=4\) into the formula, we can create two equations with two unknowns (\(a\) and \(b\))[cite: 109].

Working:

For the 2nd term (\(n = 2\)):

\[ a(2)^2 + b(2) = -2 \] \[ 4a + 2b = -2 \quad \text{— (Equation 1)} \]

For the 4th term (\(n = 4\)):

\[ a(4)^2 + b(4) = 12 \] \[ 16a + 4b = 12 \quad \text{— (Equation 2)} \]

✓ (P1) Process to find an equation in a and b.

Step 2: Solve the simultaneous equations (Part a)

Why we do this:

To find \(a\) and \(b\), we can eliminate \(b\) by making the coefficients of \(b\) the same. Let’s multiply Equation 1 by 2.

Working:

\[ 8a + 4b = -4 \quad \text{— (Equation 1 multiplied by 2)} \] \[ 16a + 4b = 12 \quad \text{— (Equation 2)} \]

Subtract the top equation from the bottom equation:

\[ (16a – 8a) + (4b – 4b) = (12 – -4) \] \[ 8a = 16 \] \[ a = 2 \]

Substitute \(a = 2\) back into Equation 1:

\[ 4(2) + 2b = -2 \] \[ 8 + 2b = -2 \] \[ 2b = -10 \] \[ b = -5 \]

✓ (P1, A1) Process to eliminate one unknown, leading to \(a=2\) and \(b=-5\).

Step 3: Find the 6th term (Part a)

What this tells us:

Now we know the full \(n\)th term formula is \(2n^2 – 5n\). We substitute \(n = 6\) into this formula to answer the question.

Working:

\[ \text{6th term} = 2(6)^2 – 5(6) \] \[ \text{6th term} = 2(36) – 30 \] \[ \text{6th term} = 72 – 30 = 42 \]

✓ (A1) Correct answer only.

Step 4: Finding the nth term of a quadratic sequence (Part b)

Why we do this:

To find the formula for a quadratic sequence, we first look at the differences between consecutive terms. The second difference will be constant, and half of this second difference gives us the coefficient of \(n^2\).

Working:

Sequence: 0, 2, 6, 12, 20

1st differences: \(2, 4, 6, 8\)

2nd differences: \(2, 2, 2\)

The \(n^2\) coefficient is \( 2 \div 2 = 1 \). So the formula starts with \(1n^2\).

Now, compare the sequence to the standard \(n^2\) sequence:

\(n\)	1	2	3	4	5
Original Sequence	0	2	6	12	20
\(n^2\)	1	4	9	16	25
Difference (Orig – \(n^2\))	-1	-2	-3	-4	-5

The difference sequence \(-1, -2, -3, -4, -5\) is simply the linear sequence \(-n\).

Combining them gives: \(n^2 – n\)

✓ (M1, A1) Correct method to establish \(n^2\) term and full correct expression.

Final Answer:

(a) 42

(b) \( n^2 – n \)

Total: 6 marks

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Question 17 (5 marks)

Work out the length of AD.
Give your answer correct to 3 significant figures.

Worked Solution

Step 1: Planning the strategy

Why we do this:

We need to find the length of AD, which is in triangle ABD. To solve a triangle, we need at least three pieces of information. Right now, in triangle ABD, we only know one side (\(11.4\)) and one angle (\(86^\circ\)). However, triangle ABD shares the side BD with triangle BCD. We can use the information in triangle BCD to find the length of BD first.

Step 2: Use the Sine Rule in triangle BCD

Why we do this:

In triangle BCD, we know a side (\(12.5\)) and its opposite angle (\(109^\circ\)). We want to find the side BD, and we know its opposite angle is \(34^\circ\). Because we have matching “side-opposite angle” pairs, the Sine Rule is the perfect tool[cite: 110].

Working:

\[ \frac{a}{\sin A} = \frac{b}{\sin B} \] \[ \frac{BD}{\sin 34^\circ} = \frac{12.5}{\sin 109^\circ} \]

Multiply both sides by \(\sin 34^\circ\):

\[ BD = \frac{12.5}{\sin 109^\circ} \times \sin 34^\circ \]

Calculator Steps:

Make sure calculator is in DEGREES mode.
Type: (12.5 ÷ sin(109)) × sin(34) =

\[ BD = 7.39268… \text{ cm} \]

✓ (P1, P1) Process to use Sine Rule and find length of BD.

Step 3: Use the Cosine Rule in triangle ABD

Why we do this:

Now look at triangle ABD. We know two sides (\(AB = 11.4\) and \(BD = 7.392…\)) and the angle between them (\(86^\circ\)). When you know two sides and the included angle, use the Cosine Rule to find the third side (\(AD\))[cite: 110].

Working:

\[ a^2 = b^2 + c^2 – 2bc \cos A \] \[ AD^2 = 11.4^2 + (7.392…)^2 – 2 \times 11.4 \times (7.392…) \times \cos 86^\circ \]

Calculate parts carefully (keep the exact value of BD in your calculator memory):

\[ AD^2 \approx 129.96 + 54.65 – 168.55 \times 0.069756 \] \[ AD^2 \approx 184.61 – 11.75… = 172.85… \]

Square root to find AD:

\[ AD = \sqrt{172.85…} = 13.147… \text{ cm} \]

✓ (P1, P1) Process to use Cosine Rule and correctly apply order of operations.

Final Answer:

13.1 cm

Total: 5 marks

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Question 18 (6 marks)

(a) Show that the equation \(x^3 + x = 7\) has a solution between 1 and 2

(b) Show that the equation \(x^3 + x = 7\) can be rearranged to give \(x = \sqrt[3]{7-x}\)

(c) Starting with \(x_0 = 2\),
use the iteration formula \(x_{n+1} = \sqrt[3]{7 – x_n}\) three times to find an estimate for a solution of \(x^3 + x = 7\)

Worked Solution

Step 1: Finding the change of sign (Part a)

Why we do this:

To prove a solution exists between two numbers, we substitute both numbers into the left side of the equation. If one result is below 7 and the other is above 7, the graph must cross 7 in between them[cite: 111].

Working:

Let \(f(x) = x^3 + x\)

When \(x = 1\):

\[ f(1) = 1^3 + 1 = 1 + 1 = 2 \]

When \(x = 2\):

\[ f(2) = 2^3 + 2 = 8 + 2 = 10 \]

Since \( 2 < 7 \) and \( 10 > 7 \) (one is below the target and one is above), there must be a solution between \(x=1\) and \(x=2\).

✓ (C1, C1) Correct substitution and valid concluding statement.

Step 2: Algebraic rearrangement (Part b)

Why we do this:

We need to manipulate the equation to isolate the \(x^3\) term first, and then undo the cube by taking the cube root.

Working:

\[ x^3 + x = 7 \]

Subtract \(x\) from both sides to isolate \(x^3\):

\[ x^3 = 7 – x \]

Take the cube root of both sides:

\[ x = \sqrt[3]{7 – x} \]

✓ (C1) For correct algebraic rearrangement.

Step 3: Iteration process (Part c)

Why we do this:

Iteration means repeating a process. We put our starting value (\(x_0 = 2\)) into the formula to get \(x_1\). Then we take \(x_1\) and put it back into the formula to get \(x_2\), and repeat this one more time to find \(x_3\)[cite: 111].

Working:

Start with \(x_0 = 2\):

\[ x_1 = \sqrt[3]{7 – x_0} = \sqrt[3]{7 – 2} = \sqrt[3]{5} = 1.7099759… \]

Calculator trick: Press 2 =. Then type \(\sqrt[3]{7 - \text{Ans}}\) and press = for each step.

Second iteration (plugging in \(1.70997…\)):

\[ x_2 = \sqrt[3]{7 – 1.7099759…} = 1.7424188… \]

Third iteration (plugging in \(1.74241…\)):

\[ x_3 = \sqrt[3]{7 – 1.7424188…} = 1.7388495… \]

✓ (M1, M1, A1) Correct substitution of values, evaluating iterations, and accurate final answer.

Final Answer:

(a) \(f(1)=2\) and \(f(2)=10\). The values are below and above 7, meaning there is a solution between 1 and 2.

(b) Proof shown.

(c) 1.739 (or anything from 1.738 to 1.74)

Total: 6 marks

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Question 19 (5 marks)

Here are two right-angled triangles.

Given that \(\tan e = \tan f\)
find the value of \(x\). You must show all your working.

Worked Solution

Step 1: Set up the equation using Trigonometry

Why we do this:

We use SOH CAH TOA. The tangent of an angle is the Opposite side divided by the Adjacent side (\(\tan \theta = \frac{O}{A}\)). We can write an expression for \(\tan e\) and \(\tan f\) using the algebraic side lengths, and set them equal because we are told \(\tan e = \tan f\).

Working:

For angle \(e\): Opposite = \(x\), Adjacent = \(4x – 1\)

\[ \tan e = \frac{x}{4x – 1} \]

For angle \(f\): Opposite = \(6x + 5\), Adjacent = \(12x + 31\)

\[ \tan f = \frac{6x + 5}{12x + 31} \]

Since \(\tan e = \tan f\):

\[ \frac{x}{4x – 1} = \frac{6x + 5}{12x + 31} \]

✓ (P1) Process to derive equation in x.

Step 2: Solve the algebraic fraction equation

Why we do this:

To solve an equation with fractions on both sides, we “cross-multiply” to get rid of the denominators. This involves multiplying the top of one side by the bottom of the other[cite: 112].

Working:

\[ x(12x + 31) = (6x + 5)(4x – 1) \]

Expand both sides:

\[ 12x^2 + 31x = 24x^2 – 6x + 20x – 5 \] \[ 12x^2 + 31x = 24x^2 + 14x – 5 \]

✓ (P1) Process to remove fractions and expand brackets.

Step 3: Rearrange into a quadratic equation

Why we do this:

We now have \(x^2\) terms, \(x\) terms, and numbers. To solve a quadratic equation, we must move all terms to one side so the equation equals zero.

Working:

Subtract \(12x^2\) and \(31x\) from both sides:

\[ 0 = (24x^2 – 12x^2) + (14x – 31x) – 5 \] \[ 0 = 12x^2 – 17x – 5 \]

✓ (P1) Process to reduce to a 3-term quadratic equation.

Step 4: Solve the quadratic equation

Why we do this:

We can solve this using the quadratic formula, or by factorising. Let’s use factorisation. We need two numbers that multiply to \(12 \times -5 = -60\) and add to \(-17\). Those numbers are \(-20\) and \(3\).

Working:

Rewrite \(-17x\) as \(-20x + 3x\):

\[ 12x^2 – 20x + 3x – 5 = 0 \]

Factorise the first two terms and last two terms:

\[ 4x(3x – 5) + 1(3x – 5) = 0 \] \[ (4x + 1)(3x – 5) = 0 \]

So the solutions are:

\[ 4x + 1 = 0 \Rightarrow x = -0.25 \] \[ 3x – 5 = 0 \Rightarrow x = \frac{5}{3} \]

Because \(x\) represents a length in a triangle, it must be positive. Therefore we discard \(-0.25\).

✓ (P1, A1) Correct method to solve quadratic and select correct positive answer.

Final Answer:

\( x = \frac{5}{3} \)

Total: 5 marks

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Question 20 (5 marks)

50 people were asked if they speak French or German or Spanish.
Of these people,

31 speak French
2 speak French, German and Spanish
4 speak French and Spanish but not German
7 speak German and Spanish
8 do not speak any of the languages
all 10 people who speak German speak at least one other language

Two of the 50 people are chosen at random.
Work out the probability that they both only speak Spanish.

Worked Solution

Step 1: Translating information into a Venn Diagram

Why we do this:

To find how many people speak ONLY Spanish, we need to map out the overlapping groups. A Venn Diagram is the best way to sort this[cite: 114]. Let’s break down the clues:

Working:

8 do not speak any language (outside circles).
2 speak all three (centre intersection).
4 speak F and S but not G (intersection of F & S, outside G).
7 speak G and S. Since 2 speak all three, the ‘G and S only’ section is \( 7 – 2 = 5 \).
All 10 who speak German speak another language. This means ‘German ONLY’ = 0.

✓ (P1) Started to process info into Venn diagram.

Step 2: Find how many speak ONLY Spanish

Why we do this:

We need to figure out the empty regions to eventually find “Spanish ONLY”. We can deduce the F&G region using the German total, and the F ONLY region using the French total.

Working:

German Total = 10: The G circle has 0 (only G) + 5 (G&S) + 2 (all three) + x (F&G only) = 10. So, F&G only = 3.

French Total = 31: The F circle has 4 (F&S) + 2 (all) + 3 (F&G) + y (F only) = 31. This is \( 9 + y = 31 \), so F only = 22.

Total People = 50: Summing everything up:

\[ \text{Total} = 8 (\text{outside}) + 22 (\text{F}) + 0 (\text{G}) + \text{S} (\text{S only}) + 3 (\text{F\&G}) + 4 (\text{F\&S}) + 5 (\text{G\&S}) + 2 (\text{All}) \] \[ 50 = 44 + \text{Spanish ONLY} \] \[ \text{Spanish ONLY} = 6 \]

✓ (P1, P1) Processes to find remaining unknown amounts leading to 6 Spanish ONLY speakers.

Step 3: Calculating probability for two selections

Why we do this:

We are picking two people at random. This means we calculate the probability of picking one “Spanish only” speaker, and multiply it by the probability of picking a second one. Because the first person isn’t replaced, the total number of people drops by 1.

Working:

Probability the 1st person speaks only Spanish: \( \frac{6}{50} \)

Probability the 2nd person speaks only Spanish: \( \frac{5}{49} \)

\[ P(\text{Both}) = \frac{6}{50} \times \frac{5}{49} \] \[ P(\text{Both}) = \frac{30}{2450} \]

Simplifying the fraction:

\[ \frac{30}{2450} = \frac{3}{245} \quad \text{or} \quad \frac{6}{490} \]

✓ (P1, A1) Correct method for combined probability and final answer[cite: 113].

Final Answer:

\( \frac{6}{490} \) (or \( \frac{3}{245} \))

Total: 5 marks

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Question 21 (5 marks)

ABCD is a parallelogram.
ABP and QDC are straight lines.
Angle ADP = angle CBQ = 90°

(a) Prove that triangle ADP is congruent to triangle CBQ.

(b) Explain why AQ is parallel to PC.

Worked Solution

Step 1: Planning the congruence proof (Part a)

Why we do this:

To prove two triangles are congruent (identical in shape and size), we need to find three matching features. This can be SSS (Side-Side-Side), SAS (Side-Angle-Side), ASA (Angle-Side-Angle), or RHS (Right angle-Hypotenuse-Side). Let’s list the facts we know about triangles ADP and CBQ.

Working:

Fact 1: Side \( AD = BC \)
Reason: They are opposite sides of the parallelogram ABCD, which are always equal in length.

Fact 2: Angle \( ADP = \) Angle \( CBQ = 90^\circ \)
Reason: This information is given directly in the question.

Fact 3: Angle \( PAD = \) Angle \( QCB \)
Reason: In a parallelogram, opposite angles are equal (Angle DAB = Angle BCD). Because ABP and QDC are straight lines, the angle PAD is the exact same angle as DAB, and QCB is the exact same angle as DCB.

✓ (C1, C1) Identifying all three equal aspects with their correct geometric reasons.

Step 2: Concluding the proof (Part a)

What this tells us:

We have two pairs of matching angles and one matching pair of included sides. We must state the final condition (ASA) to complete the proof formally.

Working:

Because we have two angles and the side included between them, Triangle ADP is congruent to Triangle CBQ by the ASA (Angle-Side-Angle) condition.

✓ (C1) Conclusion of congruency proof including a reference to ASA.

Step 3: Explaining why AQ is parallel to PC (Part b)

Why we do this:

Now we look at the larger shape APCQ. We need to prove its opposite sides AQ and PC are parallel. We can do this by proving APCQ is a parallelogram. A quadrilateral is a parallelogram if one pair of opposite sides is both parallel and equal in length.

Working:

Since Triangle ADP is congruent to Triangle CBQ, all their corresponding parts are equal. Therefore, the side \( AP = QC \).

We already know that the line ABP is parallel to the line QDC (as they contain the top and bottom sides of the original parallelogram ABCD). This means the segment AP is parallel to the segment QC.

Because AP and QC are both equal in length and parallel, the quadrilateral APCQ must be a parallelogram.

Since APCQ is a parallelogram, its other pair of opposite sides, AQ and PC, must also be parallel.

✓ (C1, C1) Identifying AP = QC from the congruent triangles, and reasoning that this makes APCQ a parallelogram, meaning opposite sides are parallel.

Final Answer:

(a) \(AD = BC\) (opposite sides of parallelogram), \(\angle ADP = \angle CBQ = 90^\circ\) (given), \(\angle PAD = \angle QCB\) (opposite angles of parallelogram). Therefore, congruent by ASA.

(b) Since triangles ADP and CBQ are congruent, \(AP = QC\). Because AP is also parallel to QC, APCQ is a parallelogram, which means its other opposite sides (AQ and PC) must be parallel.

Total: 5 marks

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Edexcel GCSE Mathematics – Higher Paper 3 (June 2018)

Mark Scheme Legend

Table of Contents

Question 1 (3 marks)

Worked Solution

Step 1: Identifying the Correlation (Part a)

Step 2: Understanding Outliers (Part b)

Step 3: Analyzing Extrapolation (Part c)

Question 2 (2 marks)

Worked Solution

Step 1: Expanding the brackets

Step 2: Collecting like terms

Question 3 (2 marks)

Worked Solution

Step 1: Finding the area of the trapezium

Step 2: Drawing the triangle

Question 4 (2 marks)

Worked Solution

Step 1: Check the probability sums

Step 2: Check the labels on the second throw

Question 5 (3 marks)

Worked Solution

Step 1: Finding angle ABC (Part a)

Step 2: Evaluating the change in cosine (Part b)

Question 6 (5 marks)

Worked Solution

Step 1: Finding the total number of counters (Part a)

Step 2: Finding the probabilities for red and white (Part a)

Step 3: Calculating the number of red counters (Part a)

Step 4: Explaining the even number of marbles (Part b)

Question 7 (3 marks)

Worked Solution

Step 1: Removing the fraction

Step 2: Isolating terms with x

Step 3: Finding x

Question 8 (5 marks)

Worked Solution

Step 1: Determine the total sum of angles in a pentagon

Step 2: Find the sum of the two unknown angles

Step 3: Using algebra to find the specific angles

Step 4: Calculate angle BCD

Question 9 (4 marks)

Worked Solution

Step 1: Calculating T (Part a)

Step 2: Testing the percentage changes (Part b)

Question 10 (3 marks)

Worked Solution

Step 1: Find when they next flash together

Step 2: Calculate how many times this happens in an hour

Question 11 (3 marks)

Worked Solution

Step 1: Finding the 2007 price (Reverse Percentage)

Step 2: Finding the 2003 price (Reverse Percentage)

Question 12 (4 marks)

Worked Solution

Step 1: Calculating the gradient (Part a)

Step 2: Interpreting the gradient (Part b)

Step 3: Interpreting the y-intercept (Part c)

Question 13 (3 marks)

Worked Solution

Step 1: Find the length scale factor (LSF)

Step 2: Calculate the volume of Shape A

Question 14 (2 marks)

Worked Solution

Step 1: Calculating combinations

Question 15 (4 marks)

Worked Solution

Step 1: Reading values from the graph for 4 strips

Step 2: Calculating the area of the strips

Step 3: Determining if it’s an underestimate or overestimate

Question 16 (6 marks)

Worked Solution

Step 1: Set up simultaneous equations (Part a)

Step 2: Solve the simultaneous equations (Part a)

Step 3: Find the 6th term (Part a)

Step 4: Finding the nth term of a quadratic sequence (Part b)

Question 17 (5 marks)

Worked Solution

Step 1: Planning the strategy

Step 2: Use the Sine Rule in triangle BCD