A circle is a two-dimensional shape whose points are all equidistant from the center.
All circles with centers located at the origin (0, 0) have the equation:
Where r is the radius of the circle.
Standard Form of a Circle’s Equation
A circle whose center is located at point (a, b) having a radius of length r has the equation:
A circle’s center coordinates and radius can be easily determined from the standard form.
A circle’s center would be found at point (a, b) and its radius equals the square root of r².
So, for example, a circle with the equation (x -2)² + (y -1)² = 25
Would have its center located at (2, 1) and would have a radius equal to the square root of 25 or 5.
A circle with the equation (x +2)² + (y -1)² = 36
Would have its center located at (-2, 1) and would have a radius equal to the square root of 36 or 6.
General Form of a Circle’s Equation
Multiplying out a circle’s standard form: (x -a)² + (y -b)² = r²
produces the general form of a circle’s equation: x² + y² + cx + dy + e = 0
Figure 1 below shows a circle whose center is at point (4, 3) with a radius of 2.
How do we find the standard form equation of this circle?
We put the center coordinates (4, 3) into the a and b variables and we square the radius for r²
x² +y² -8x -6y +21 = 0
Going From General Form To Standard Form
How do you convert a general form equation into a standard form equation?
1) Let’s take this general form equation as an example.
divide both these numbers by two, giving us (8, -9)
Insert these numbers into equation 2, paying attention to the signs.
A calculator that computes a circle’s equation after 3 points have been input is located here.