The lines L₁ and L₂ are parallel - AQA - A-Level Maths Pure - Question 8 - 2022 - Paper 1

To find the value of a, we consider the distance from the center of the circle C at (a, -17) to the tangent point on line L₁.

1. Equation of Lines: The coordinates of the point on L₁ can be calculated using: $5x + 3y = 15\text{ and } P(0, 5)$.

2. Midpoint of PQ: Since Q lies on L₂ and is closest to P, we express the midpoint of PQ as: $x_a = \frac{0 + 10}{2} = 5\text{, and } y_a = \frac{5 + 6}{2} = 5.5$ Substitute these into the distance formula for the tangents: $d = \sqrt{(5 - a)^2 + (5.5 + 17)^2} = r$, where r is the radius.

3. Find a: Implement the conditions for the tangents: $5 + 3(-17) = 49 \Rightarrow 20 + 49 = 49 \\ \sum = 49\text{, solve for } a \\ a = 20$

Thus, the value of a is 20.

Using the value of a found:

1. Circle Equation: The general form of the equation for a circle is: $(x - a)^2 + (y - b)^2 = r^2$ Given a = 20 and b = -17, we thus have: $(x - 20)^2 + (y + 17)^2 = r^2$ where r is derived from the distance to either line L₁ or L₂.

2. Construction of r: If we calculate r using distance from point (20, -17) to line L₁ using distance formula or properties of right triangles, Evaluating yields the equation: $(x - 20)^2 + (y + 17)^2 = 34$.