Before we start solving listed problems, students are advised to keep below information in mind.
The general equation of a circle is as follows:
x2 + y2 + 2gx + 2fy + c = 0
Where g, f and c are constants.
With
Centre: (-g, -f)
(i) (0, 0), (5, 0) and (3, 3)
The Circle equation is:
Let us apply Laplace Expansion to solve this problem:
On comparing above equation with the general form of circle, we get
2g = -5 ⇒ g = -2.5
2f = -1 ⇒ f = -0.5
c = 0
Now,
centre = (2.5, 0.5)
(ii) (1, 2), (3, – 4) and (5, – 6)
The Circle equation is:
Let us apply Laplace Expansion to solve this problem:
On comparing above equation with the general form of circle, we get
2g = -22 ⇒ g = -11
2f = -4 ⇒ f = -2
c = -25
Now,
Centre = (11, 2)
(iii) (20, 3), (19, 8) and (2, – 9)
The Circle equation is:
Let us apply Laplace Expansion to solve this problem:
On comparing above equation with the general form of circle, we get
2g = -14 ⇒ g = -7
2f = -6 ⇒ f = -3
c = -111
Now,
Centre = (7, 3)