The circle C has equation $x^{2} + y^{2} - 10x + 6y + 30 = 0$ Find (a) the coordinates of the centre of C, (b) the radius of C, (c) the y coordinates of the points where the circle C crosses the line with equation $x = 4$, giving your answers as simplified surds. - Edexcel - A-Level Maths Pure - Question 6 - 2017 - Paper 3

The radius can be determined from the standard form of the circle's equation. From
$(x - 5)^{2} + (y + 3)^{2} = 4$
we see that the radius $r$ is given by:
$r = ext{sqrt}(4) = 2.$
Thus, the radius of circle C is 2.

To find the y-coordinates where the circle crosses the line $x = 4$, we substitute $x = 4$ into the circle's equation:
$(4 - 5)^{2} + (y + 3)^{2} = 4$
This simplifies to:
$1 + (y + 3)^{2} = 4$
Leading to:
$(y + 3)^{2} = 3$
Taking the square root of both sides:
$y + 3 = ext{±} ext{sqrt}(3)$
Thus,
$y = -3 + ext{sqrt}(3) ext{ and } y = -3 - ext{sqrt}(3).$
The y-coordinates where the circle C crosses the line are therefore:
$y = -3 + ext{sqrt}(3)$ and $y = -3 - ext{sqrt}(3)$.