A-Level Edexcel Maths Pure Modelling with Trigonometric Functions: 7. (i) Use logarithms to solve t

7. (i) Use logarithms to solve the equation $8^{2x+1} = 24$, giving your answer to 3 decimal places - Edexcel - A-Level Maths Pure - Question 8 - 2015 - Paper 2

Question 8

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7. (i) Use logarithms to solve the equation $8^{2x+1} = 24$, giving your answer to 3 decimal places. (ii) Find the values of $y$ such that $$ ext{log}_{2}(11y - 3) ... show full transcript

Worked Solution & Example Answer:7. (i) Use logarithms to solve the equation $8^{2x+1} = 24$, giving your answer to 3 decimal places - Edexcel - A-Level Maths Pure - Question 8 - 2015 - Paper 2

Step 1

(i) Use logarithms to solve the equation $8^{2x+1} = 24$

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Answer

To solve the equation, we first take the logarithm of both sides:

$ext{log}(8^{2x+1}) = ext{log}(24)$

Applying the power rule of logarithms:

$(2x+1) ext{log}(8) = ext{log}(24)$

We can isolate $2x + 1$ :

$2x + 1 = \frac{ ext{log}(24)}{ ext{log}(8)}$

Next, we can compute this expression. We know that:

$ext{log}(8) = 3 ext{log}(2)$ $ext{log}(24) = 3 + ext{log}(3)$

Thus:

$2x + 1 = \frac{3 + ext{log}(3)}{3 ext{log}(2)}$

Now calculate the value to isolate $x$ :

ightarrow x = \frac{1}{2} \left( \frac{ ext{log}(24)}{ ext{log}(8)} - 1 \right)$$ Substituting the calculated values, we find that: $$x \approx 0.264 ext{ (to 3 decimal places)}$$

Step 2

(ii) Find the values of $y$ such that log_{2}(11y - 3) - log_{2}3 - 2 log_{2}y = 1

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Answer

To find $y$ , we start from the equation:

$ext{log}_{2}(11y - 3) - ext{log}_{2}(3) - 2 ext{log}_{2}(y) = 1$

Using properties of logarithms, we can simplify it to:

$ext{log}_{2}(\frac{11y - 3}{3y^{2}}) = 1$

This means:

$\frac{11y - 3}{3y^{2}} = 2$

Multiplying both sides by $3y^{2}$ gives us:

$11y - 3 = 6y^{2}$

Rearranging leads to:

$6y^{2} - 11y + 3 = 0$

We can now apply the quadratic formula,

$y = \frac{-b \pm \sqrt{b^{2} - 4ac}}{2a} = \frac{11 \pm \sqrt{121 - 72}}{12} = \frac{11 \pm \sqrt{49}}{12}$

Calculating the roots:

$y = \frac{11 + 7}{12} = 1.5, \quad y = \frac{11 - 7}{12} = \frac{1}{3}$

Considering the constraint $y > \frac{3}{11}$ , we find the valid solution:

$y = 1.5$

7. (i) Use logarithms to solve the equation $8^{2x+1} = 24$, giving your answer to 3 decimal places - Edexcel - A-Level Maths Pure - Question 8 - 2015 - Paper 2

Worked Solution & Example Answer:7. (i) Use logarithms to solve the equation $8^{2x+1} = 24$, giving your answer to 3 decimal places - Edexcel - A-Level Maths Pure - Question 8 - 2015 - Paper 2

(i) Use logarithms to solve the equation $8^{2x+1} = 24$

(ii) Find the values of $y$ such that log_{2}(11y - 3) - log_{2}3 - 2 log_{2}y = 1

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