Rate of change in terms of output

Rate of change in terms of input

Graphical representation of functions

Integration of functions

It is not mathematically possible

It complicates the calculation of rate of change

It is not commonly taught in calculus

It requires a different approach to solve

Integration

Differentiation

Algebra

Graphing

By eliminating the need for constants

By connecting volume with time and height

By providing a direct solution

By simplifying the derivative

It complicates the solution

It is always zero

It can be ignored

It helps in defining the initial conditions

A constant rate of change

A reflection of the cubic function

An exponential growth

A linear relationship

The height increases but slows down

The height increases exponentially

The height decreases

The height remains constant