Let $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, \ x > 2.5. (a) Show that $f(x) = 0$ has a root $\alpha$ in the interval [3.5, 4]. A student takes 4 as the first approximation to $\alpha$. Given $f(4) = 3.099$ and $f'(4) = 16.67$ to 4 significant figures. (b) apply the Newton-Raphson procedure once to obtain a second approximation for $\alpha$, giving your answer to 3 significant figures. (c) Show that $\alpha$ is the only root of $f(x) = 0$.

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Let $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, \ x > 2.5 - Edexcel - A-Level Maths Pure - Question 9 - 2017 - Paper 1

Question 9

$Let-$f(x)-=--ext{ln}(2x---5)-+-2x^2---30$,-\-x->-2.5-Edexcel-A-Level Maths Pure-Question 9-2017-Paper 1.png$

Let $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, \ x > 2.5. (a) Show that $f(x) = 0$ has a root $\alpha$ in the interval [3.5, 4]. A student takes 4 as the first approxi... show full transcript

Worked Solution & Example Answer:Let $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, \ x > 2.5 - Edexcel - A-Level Maths Pure - Question 9 - 2017 - Paper 1

Step 1

Show that $f(x) = 0$ has a root $\alpha$ in the interval [3.5, 4]

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Answer

First, evaluate the function at the endpoints of the interval:

Calculate $f(3.5)$ :

$f(3.5) = \text{ln}(2 \times 3.5 - 5) + 2(3.5)^2 - 30 = \text{ln}(2) + 24.5 - 30 \approx -4.8.$
Calculate $f(4)$ :

$f(4) = \text{ln}(2 \times 4 - 5) + 2(4)^2 - 30 = \text{ln}(3) + 32 - 30 \approx 3.1.$

Since $f(3.5) < 0$ and $f(4) > 0$ , there is a change of sign in the interval [3.5, 4], which implies by the Intermediate Value Theorem that there is at least one root $\alpha$ in the interval.

Step 2

apply the Newton-Raphson procedure once to obtain a second approximation for $\alpha$

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Answer

Using the Newton-Raphson method:

Take $x_0 = 4$ as the first approximation.
Evaluate $f(4)$ and $f'(4)$ :
- $f(4) = 3.099$
- $f'(4) = 16.67$
Apply the formula:

$x_1 = x_0 - \frac{f(x_0)}{f'(x_0)} = 4 - \frac{3.099}{16.67} \approx 4 - 0.185 = 3.815.$

Rounding to 3 significant figures, the second approximation is:

$x_1 \approx 3.81.$

Step 3

Show that $\alpha$ is the only root of $f(x) = 0$

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Answer

To show that $\alpha$ is the only root, we must examine the behavior of $f(x)$ :

The function is defined for $x > 2.5$ .
Calculate the derivative:

$f'(x) = \frac{2}{2x - 5} + 4x.$
Identify critical points by setting $f'(x) = 0$ :
- The only critical point occurs when $f'(x)$ does not change sign. This can be shown graphically or by analyzing the sign of $f'(x)$ :
Since both terms are positive for $x > 2.5$ , $f'(x) > 0$ for all $x$ in $(2.5, \infty)$ , indicating that the function is monotonically increasing in this interval.
With $f(x)$ being continuous and strictly increasing, it can have at most one root. Since we found one root in [3.5, 4], we conclude that $\alpha$ is the only root of $f(x) = 0$ .

Let $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, \ x > 2.5 - Edexcel - A-Level Maths Pure - Question 9 - 2017 - Paper 1

Worked Solution & Example Answer:Let $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, \ x > 2.5 - Edexcel - A-Level Maths Pure - Question 9 - 2017 - Paper 1

Show that $f(x) = 0$ has a root $\alpha$ in the interval [3.5, 4]

apply the Newton-Raphson procedure once to obtain a second approximation for $\alpha$

Show that $\alpha$ is the only root of $f(x) = 0$

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