Given that $f(x) = 7\cos x + \sin x$, where $R > 0$ and $0 < \alpha < 90^\circ$, (a) find the exact value of $R$ and the value of $\alpha$ to one decimal place. (b) Hence solve the equation $$7\cos x + \sin x = 5$$ for $0 \leq x < 360^\circ$, giving your answers to one decimal place. (c) State the values of $k$ for which the equation $$7\cos x + \sin x = k$$ has only one solution in the interval $0 \leq x < 360^\circ$.

A-Level Edexcel Maths Pure Solving Equations: Given that $f(x) = 7\cos x + \si

Given that $f(x) = 7\cos x + \sin x$, where $R > 0$ and $0 < \alpha < 90^\circ$, (a) find the exact value of $R$ and the value of $\alpha$ to one decimal place - Edexcel - A-Level Maths Pure - Question 4 - 2013 - Paper 8

Question 4

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Given that $f(x) = 7\cos x + \sin x$, where $R > 0$ and $0 < \alpha < 90^\circ$, (a) find the exact value of $R$ and the value of $\alpha$ to one decimal place. (b... show full transcript

Worked Solution & Example Answer:Given that $f(x) = 7\cos x + \sin x$, where $R > 0$ and $0 < \alpha < 90^\circ$, (a) find the exact value of $R$ and the value of $\alpha$ to one decimal place - Edexcel - A-Level Maths Pure - Question 4 - 2013 - Paper 8

Step 1

find the exact value of R and the value of α to one decimal place.

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Answer

To find the value of $R$ , we use the formula: $R = \sqrt{(7^2 + 1^2)} = \sqrt{49 + 1} = \sqrt{50} = 5\sqrt{2}$

Next, we find $\alpha$ using the tangent ratio: $\tan \alpha = \frac{1}{7}$ Thus, $\alpha = \arctan\left(\frac{1}{7}\right) \approx 8.1^\circ$

Therefore, the values are:

Exact value of $R$ : $5\sqrt{2}$
Value of $\alpha$ : $8.1^\circ$ .

Step 2

Hence solve the equation 7cos x + sin x = 5

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Answer

Rearranging the equation: $7\cos x + \sin x = 5$

We express it in terms of $R\cos (x - \alpha)$ :

$\sqrt{50}\cos(x - 8.1^\circ) = 5$

Using $R = 5\sqrt{2}$ , we have:

$\cos(x - 8.1^\circ) = \frac{5}{\sqrt{50}} = \frac{5}{5\sqrt{2}} = \frac{1}{\sqrt{2}}$

Thus, $x - 8.1^\circ = 45^\circ \implies x = 53.1^\circ$

Also, $x - 8.1^\circ = 315^\circ \implies x = 323.1^\circ$

The two solutions are:

$x \approx 53.1^\circ$
$x \approx 323.1^\circ$ .

Step 3

State the values of k for which the equation 7cos x + sin x = k has only one solution in the interval 0 ≤ x < 360°.

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Answer

The equation $7\cos x + \sin x = k$ has only one solution when the line $y = k$ is tangent to the curve $y = 7\cos x + \sin x$ .

The maximum value of $7\cos x + \sin x$ is: $R = 5\sqrt{2} \approx 7.07$

Hence, the only value of $k$ for which there is one solution must be: $k = \pm 5\sqrt{2}$

Thus, the required values are:

$k = 5\sqrt{2}$
$k = -5\sqrt{2}$ .

Given that $f(x) = 7\cos x + \sin x$, where $R > 0$ and $0 < \alpha < 90^\circ$, (a) find the exact value of $R$ and the value of $\alpha$ to one decimal place - Edexcel - A-Level Maths Pure - Question 4 - 2013 - Paper 8

Worked Solution & Example Answer:Given that $f(x) = 7\cos x + \sin x$, where $R > 0$ and $0 < \alpha < 90^\circ$, (a) find the exact value of $R$ and the value of $\alpha$ to one decimal place - Edexcel - A-Level Maths Pure - Question 4 - 2013 - Paper 8

find the exact value of R and the value of α to one decimal place.

Hence solve the equation 7cos x + sin x = 5

State the values of k for which the equation 7cos x + sin x = k has only one solution in the interval 0 ≤ x < 360°.

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