The block-collision puzzle

The conservation of energy

The infinite mirror reflection problem

The kaleidoscope effect

The velocities of the blocks

The angles of incidence and reflection

The distances from the wall to the blocks

The masses of the blocks

It provides a visual representation of block positions

It simplifies the calculation of block velocities

It relates the problem to the conservation of energy and momentum

It shows how light behaves in a vacuum

It aligns the angles of incidence and reflection

It alters the trajectory of the blocks

It changes the mass of the blocks

It ensures constant speed in the configuration space

Quadratic equations

Pythagorean theorem

Dot product

Sine and cosine functions

By measuring the distance between blocks

By determining the speed of light

By calculating the mass ratio of the blocks

By using the concept of light passing through mirrors

The square root of two

Pi

The golden ratio

Euler's number

The angle of light refraction

The angle of the block's trajectory

The angle of the block's velocity

The angle between the mirrors

To calculate the speed of the blocks

To determine the angle of reflection

To measure the distance between blocks

To align the configuration space with optical laws

A change in perspective can simplify complex problems

Perspective is irrelevant in mathematical problems

Perspective only matters in optical problems

Perspective is a distraction in problem-solving