Understanding Differential Equations

Statistical equations

Differential equations

Algebraic equations

Geometric equations

ODEs are simpler than PDEs

ODEs are used in chemistry, PDEs in physics

ODEs involve a single input, PDEs involve multiple inputs

ODEs involve multiple inputs, PDEs involve a single input

Acceleration due to gravity

Gravitational force

Air resistance

Initial velocity

They are not used in physics

They involve complex functions

They are too simple

They have no solutions

It decreases

It remains constant

It increases

It becomes zero

Due to the length of the pendulum

Due to air resistance

Because of the sine function in the equation

Because of the cosine function in the equation

A space representing mass and acceleration

A space representing time and velocity

A space representing position and momentum

A space representing energy and force

To simplify equations

To visualize the rate of change

To eliminate variables

To increase complexity

It shows limits in prediction accuracy

It simplifies predictions

It provides exact solutions

It eliminates the need for initial conditions

By providing exact solutions

By using finite time steps for approximation

By eliminating variables

By reducing dimensions