Page 3: Advanced Circle Problems

This page covers more complex problems involving circles, including finding equations for circles passing through multiple points and satisfying specific conditions.

Example: A circle passing through points A(4,6) and B(-2,8) with center on the midpoint of AB has the equation (x-1)² + (y-7)² = 10.

The page also addresses problems where a point on the circle is partially defined.

Example: For a circle with center M(-2,-3) and radius 5, passing through point A(1,k), the positive value of k is found to be 1.

Highlight: A point on a circle must satisfy the circle's equation.

Page 4: Circles and Tangent Lines

This page explores the relationship between circles and tangent lines, particularly focusing on circles tangent to coordinate axes.

Example: A circle with center A(7,4) tangent to the x-axis has the equation (x-7)² + (y-4)² = 16.

The page also demonstrates how to find a circle's equation given three points it passes through.

Example: A circle passing through points A(8,0), B(0,6), and O(0,0) has the equation (x-4)² + (y-3)² = 25.

Highlight: The area of circular segments can be calculated using the formula: Area = πr² * (central angle in radians / 2π) - (r² * sin(central angle) / 2).

Page 6: General Form of Circle Equation

This page introduces the general form of a circle equation and its relationship to the standard form.

Definition: The general form of a circle equation is x² + y² + Dx + Ey + F = 0.

Highlight: In the general form, the coefficients of x² and y² must be equal and typically reduced to 1.

The page explains how to convert between standard and general forms, and how to extract information about the circle's center and radius from the general form.

Example: For a circle with equation x² + y² + 4x - 2y - 7 = 0, the center is (-2, 1) and the radius is 2√3.