Understanding three-dimensional vector fields

Exploring the relationship between x and y

Examining a two-dimensional example

Discussing the importance of output dimensions

By ignoring the input variables

By treating x as a constant and y as a variable

By treating y as a constant and x as a variable

By considering both x and y as constants

(2, 3)

(4, 1)

(3, 2)

(1, 4)

The position of vectors

The exact length of each vector

The relative length of vectors

The direction of vectors

It represents a large change in the y direction

It indicates a slight change in the x direction

It shows a constant change in both x and y

It has no impact on the vector field

As a scalar value

As a constant

As another vector

As a new input point

Ignoring their differences

Changing their directions

Moving them to a common origin

Scaling them to different sizes