Understanding Circle Inversion and Pappus Chain

Solving a quadratic equation

Determining the next number in a sequence of fractions

Finding the area of a circle

Calculating the circumference of a circle

A sequence of numbers

A series of circles touching each other tangentially

A type of triangle

A method for solving equations

To calculate the area of a circle

To transform points inside a circle to the outside and vice versa

To find the diameter of a circle

To reflect a circle into a line

It becomes a smaller circle

It transforms into a straight line

It remains unchanged

It becomes an ellipse

Circles invert to other circles

Circles become triangles

Circles become squares

Circles disappear

It simplifies the calculations

It ensures the inversion results in a line

It has no significance

It makes the circle disappear

1/95 of the original radius

1/23 of the original radius

1/15 of the original radius

1/63 of the original radius

Pythagoras' theorem

The Law of Cosines

Fermat's Last Theorem

The Law of Sines

They remain the same size

Big circles become smaller

Small circles become bigger

Both A and B

It is only useful for small circles

It is a powerful tool for solving complex geometric problems

It transforms circles into squares

It is a simple reflection