Circle (General Form → Centre & Radius)
\( x^2+y^2+gx+fy+c=0\;\Rightarrow\; \text{centre }(-\tfrac{g}{2},-\tfrac{f}{2}),\ r=\sqrt{\left(\tfrac{g}{2}\right)^2+\left(\tfrac{f}{2}\right)^2-c} \)
Statement
The general equation of a circle can be written in the form \[ x^2 + y^2 + g x + f y + c = 0. \] From this we can read off the circle’s centre and radius directly: \[ \text{Centre } = \left(-\frac{g}{2},\; -\frac{f}{2}\right), \qquad \text{Radius } = \sqrt{\left(\frac{g}{2}\right)^2 + \left(\frac{f}{2}\right)^2 - c }. \]
Why it’s true (short reason)
- Start from the standard form \((x-h)^2 + (y-k)^2 = r^2\) with centre \((h,k)\) and radius \(r\).
- Expand: \(x^2 -2hx + h^2 + y^2 -2ky + k^2 = r^2\).
- Collect terms: \(x^2 + y^2 + (-2h)x + (-2k)y + (h^2 + k^2 - r^2) = 0.\)
- Compare with \(x^2 + y^2 + g x + f y + c = 0\): \(g = -2h\), \(f = -2k\), \(c = h^2 + k^2 - r^2\).
- Hence \(h = -g/2\), \(k = -f/2\), and \(r^2 = h^2 + k^2 - c = (g/2)^2 + (f/2)^2 - c\).
Recipe (how to use it)
- Identify g, f, c. Compare the given equation to \(x^2 + y^2 + g x + f y + c = 0\) and read the coefficients of \(x\), \(y\), and the constant term.
- Centre: \( \bigl(-\tfrac{g}{2}, -\tfrac{f}{2}\bigr) \).
- Radius: \( \sqrt{ \bigl(\tfrac{g}{2}\bigr)^2 + \bigl(\tfrac{f}{2}\bigr)^2 - c } \).
- If the quantity inside the square root is negative, the equation does not represent a real circle (no real points).
Spotting it
Look for equations with \(x^2\) and \(y^2\) both having coefficient 1 and no \(xy\) term:
- “Find the centre and radius of \(x^2 + y^2 - 4x + 6y + 5 = 0\).”
- “Write this equation in standard form to identify the centre and radius.”
- “Does the equation represent a real circle?” (check the discriminant inside the square root).
Common pairings
- Completing the square: a manual way to derive the same centre and radius.
- Distance formula: to check points lie on the circle once centre and radius are known.
- Coordinate geometry proofs: using circle properties in GCSE and A-level problems.
Mini examples
- \(x^2 + y^2 - 4x - 6y + 9 = 0\) \(g = -4,\; f = -6,\; c = 9\). Centre \(=\bigl(2,3\bigr)\), Radius \(=\sqrt{(2)^2 + (3)^2 - 9} = \sqrt{13 - 9} = 2.\)
- \(x^2 + y^2 + 8x - 10y + 20 = 0\) \(g = 8,\; f = -10,\; c = 20\). Centre \(=\bigl(-4,5\bigr)\), Radius \(=\sqrt{(4)^2 + (−5)^2 - 20} = \sqrt{16 + 25 - 20} = \sqrt{21}.\)
- \(x^2 + y^2 - 4x - 6y + 20 = 0\) \(g = -4,\; f = -6,\; c = 20\). Inside the square root: \((2)^2 + (3)^2 - 20 = 4 + 9 - 20 = -7\). Negative ⇒ no real circle (empty set).
Pitfalls
- Wrong signs: remember the formula uses \(-g/2\) and \(-f/2\).
- Coefficient of x² or y² not 1: first divide the whole equation so that those coefficients are 1 before applying the formula.
- Negative radius squared: if the expression inside the square root is negative, the equation has no real solutions (no actual circle).
- Mixing with ellipse/hyperbola: check that the coefficients of \(x^2\) and \(y^2\) are equal and there is no \(xy\) term.
Exam strategy
- Write down g, f, c explicitly from the equation to avoid sign errors.
- Compute centre first, then radius carefully.
- If the question asks for standard form, rewrite as \((x-h)^2 + (y-k)^2 = r^2\) using completing the square.
- Quickly check your answer: plug the centre into the equation; the constant term should match \(r^2\).
Extended micro-examples
- \(x^2 + y^2 + 14x + 10y + 9 = 0\) Centre \(=\bigl(-7,-5\bigr)\), Radius \(=\sqrt{7^2 + 5^2 - 9} = \sqrt{65}\).
- Given centre \((1,-3)\) and radius \(6\), equation is \((x-1)^2 + (y+3)^2 = 36\). Expanding gives \(x^2 + y^2 - 2x + 6y - 26 = 0\).
- \(x^2 + y^2 + 6x - 4y + k = 0\) with radius \(5\). \(25 = 3^2 + (-2)^2 - k\). \(k = -12\).
Summary
To convert a circle’s general equation \[ x^2 + y^2 + g x + f y + c = 0 \] into centre–radius form:
- Centre \(=\bigl(-\tfrac{g}{2},-\tfrac{f}{2}\bigr)\).
- Radius \(=\sqrt{\bigl(\tfrac{g}{2}\bigr)^2 + \bigl(\tfrac{f}{2}\bigr)^2 - c}\).