To explore the historical development of gradients

To understand the computation and geometric interpretation of gradients

To learn about the applications of gradients in physics

To discuss the limitations of gradients in mathematics

sin(y)

x

x^2

y

The sum of all derivatives

The product of all derivatives

All the partial derivatives of a function

The integral of the function

The gradient is the integral of partial derivatives

The gradient is a vector containing all partial derivatives

The gradient is the sum of partial derivatives

The gradient is unrelated to partial derivatives

Pi

Delta

Nabla

Sigma

As a constant multiplier

As a matrix of functions

As a vector of partial derivative operators

As a scalar operator

Three

One

Two

Four

Imagining the gradient as a circle

Considering the gradient as a vector of operators

Visualizing the gradient as a triangle

Thinking of the gradient as a sum of functions

Historical background of the gradient

Geometric interpretation of the gradient

Limitations of the gradient

Applications of gradients in engineering

Solving quadratic equations

Determining the volume of a cube

Finding the directional derivative

Calculating the area of a circle