Multivariable Calculus Transformations

Solving linear equations

Transferring linear concepts to nonlinear problems

Understanding basic algebraic operations

Studying single-variable functions

Transforms a 2D vector into a 3D vector

Transforms a scalar into a vector

Transforms a 2D vector into another 2D vector

Transforms a 3D vector into a 2D vector

It moves vertically by one unit

It moves diagonally by one unit

It remains stationary

It moves horizontally by one unit

They involve more complex information

They are easier to visualize

They maintain parallel and evenly spaced grid lines

They require less information to describe

The function is linear everywhere

The function appears linear when zoomed in on a point

The function is nonlinear everywhere

The function is linear only at the origin

They become less dense

They appear more linear

They disappear

They become more curved

To represent linear transformations around specific points

To calculate the area under a curve

To solve differential equations

To simplify complex numbers

By using a 3D model

By plotting a single point

By showing grid lines and their movement

By using a color gradient

It indicates the maximum value

It highlights the entire grid

It shows the area of interest during zooming

It marks the origin

Complex numbers

Partial derivatives

Differential equations

Integral calculus