14. A circle C with radius r - lies only in the 1st quadrant - touches the x-axis and touches the y-axis The line l has equation 2x + y = 12 (a) Show that the x coordinates of the points of intersection of l with C satisfy 5x² + (2r - 48)x + (r² - 24r + 144) = 0 (b) Given also that l is a tangent to C, find the two possible values of r, giving your answers as fully simplified surds. - Edexcel - A-Level Maths Pure - Question 14 - 2020 - Paper 2

Given that the line l is a tangent to the circle C, we can set the discriminant of the quadratic to zero:

$b^2 - 4ac = 0$

Using coefficients from our earlier derived equation, we assign:

• a = 5
• b = (2r - 48)
• c = (r^2 - 24r + 144)

The discriminant becomes:

$(2r - 48)^2 - 4 imes 5 imes (r^2 - 24r + 144) = 0$

Expanding this equation:

$(2r - 48)^2 = 100(r^2 - 24r + 144)$

Solving leads to:

$4r^2 - 192r + 2304 = 100r^2 - 2400r + 14400$

Rearranging terms:

$96r^2 - 720r + 12096 = 0$

Simplifying:

$r^2 - 7.5r + 126 = 0$

Using the quadratic formula:

$r = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}$

Substituting the values gives:

$r = \frac{7.5 \pm \sqrt{(7.5)^2 - 4(1)(126)}}{2(1)}$

This results in:

$r = \frac{7.5 \pm 9\sqrt{3}}{2}$

Thus, the two possible values for r are:

$r = 9 + 3\sqrt{3}$ and $r = 9 - 3\sqrt{3}$