Figure 2 shows a sketch of part of the curve with equation $y = f(x)$ where $f(x) = 8 \sin \left( \frac{1}{2} x \right) - 3x + 9 \quad (x > 0)$ and $x$ is measured in radians. The point $P$, shown in Figure 2, is a local maximum point on the curve. Using calculus and the sketch in Figure 2, a) find the $x$ coordinate of $P$, giving your answer to 3 significant figures. The curve crosses the $x$-axis at $x = a$, as shown in Figure 2. Given that, to 3 decimal places, $f(4) = 4.274$ and $f(5) = -1.212$ b) explain why $a$ must lie in the interval $[4, 5]$. c) Taking $x_0 = 5$ as a first approximation to $a$, apply the Newton-Raphson method once to $f(x)$ to obtain a second approximation to $a$. Show your method and give your answer to 3 significant figures.

A-Level Edexcel Maths Pure Modelling with Functions: Figure 2 shows a sketch of part

Figure 2 shows a sketch of part of the curve with equation $y = f(x)$ where $f(x) = 8 \sin \left( \frac{1}{2} x \right) - 3x + 9 \quad (x > 0)$ and $x$ is measured in radians - Edexcel - A-Level Maths Pure - Question 7 - 2022 - Paper 2

Question 7

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Figure 2 shows a sketch of part of the curve with equation $y = f(x)$ where $f(x) = 8 \sin \left( \frac{1}{2} x \right) - 3x + 9 \quad (x > 0)$ and $x$ is measured... show full transcript

Worked Solution & Example Answer:Figure 2 shows a sketch of part of the curve with equation $y = f(x)$ where $f(x) = 8 \sin \left( \frac{1}{2} x \right) - 3x + 9 \quad (x > 0)$ and $x$ is measured in radians - Edexcel - A-Level Maths Pure - Question 7 - 2022 - Paper 2

Step 1

a) find the $x$ coordinate of $P$, giving your answer to 3 significant figures.

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Answer

To find the $x$ coordinate of the local maximum point $P$ , we first differentiate the function:

Differentiate $f(x)$ :

$f'(x) = 4\cos\left(\frac{1}{2} x\right) - 3$
To find the critical points, set $f'(x) = 0$ :

$4 \cos\left(\frac{1}{2} x\right) - 3 = 0$

Rearranging gives:

$\cos\left(\frac{1}{2} x\right) = \frac{3}{4}$
Using the inverse cosine function:

$\frac{1}{2} x = \cos^{-1}\left(\frac{3}{4}\right)$
Calculate $\cos^{-1}\left(\frac{3}{4}\right)$ using a calculator:

$\frac{1}{2} x \approx 0.722\text{ (in radians)}$
Therefore,

$x \approx 2 \times 0.722 \approx 1.444$
Finally rounding to 3 significant figures gives:

$x \approx 1.44$ .

Step 2

b) explain why $a$ must lie in the interval $[4, 5]$.

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Answer

To explain why $a$ lies in the interval $[4, 5]$ , we can use the information provided about the function values:

Given that $f(4) = 4.274 > 0$ and $f(5) = -1.212 < 0$ , we see:
- At $x = 4$ , the function is positive.
- At $x = 5$ , the function is negative.
By the Intermediate Value Theorem, since $f(x)$ is continuous, and there is a sign change between $x = 4$ and $x = 5$ , there must be some value $a$ in the interval $[4, 5]$ such that $f(a) = 0$ .

Step 3

c) apply the Newton-Raphson method once to $f(x)$ to obtain a second approximation to $a$.

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Answer

Using the Newton-Raphson formula:

$x_{n+1} = x_n - \frac{f(x_n)}{f'(x_n)}$
We start with $x_0 = 5$ :
- First, calculate $f(5)$ and $f'(5)$ :
- Given previously:
$f(5) = -1.212$ and $f'(5) = 4\cos\left(\frac{1}{2} \times 5\right) - 3 \approx 4\cos(2.5) - 3 \\$

Approximating:

$f'(5) \approx 0.996$ (calculated using a calculator).
Now apply the Newton-Raphson step:

$x_1 = 5 - \frac{-1.212}{0.996} \approx 5 + 1.216 \approx 4.784$
Rounding to 3 significant figures gives:

$x \approx 4.78$ .

Figure 2 shows a sketch of part of the curve with equation $y = f(x)$ where $f(x) = 8 \sin \left( \frac{1}{2} x \right) - 3x + 9 \quad (x > 0)$ and $x$ is measured in radians - Edexcel - A-Level Maths Pure - Question 7 - 2022 - Paper 2

Worked Solution & Example Answer:Figure 2 shows a sketch of part of the curve with equation $y = f(x)$ where $f(x) = 8 \sin \left( \frac{1}{2} x \right) - 3x + 9 \quad (x > 0)$ and $x$ is measured in radians - Edexcel - A-Level Maths Pure - Question 7 - 2022 - Paper 2

a) find the $x$ coordinate of $P$, giving your answer to 3 significant figures.

b) explain why $a$ must lie in the interval $[4, 5]$.

c) apply the Newton-Raphson method once to $f(x)$ to obtain a second approximation to $a$.

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