Understanding Derivatives and Integrals

Slopes of tangent lines

Lengths of curves

Areas under curves

Volumes of solids

They always increase areas

They rotate the coordinate system

They keep parallel lines parallel

They change the origin

The rotation angle

The scaling factor for lengths

The translation distance

The reflection axis

The curvature of the function

The scaling factor near a point

The rotation of the function

The translation of the function

By differentiating the function twice

By integrating the function

By using the components of the function

By finding the inverse of the function

To find the surface area of the rod

To find the volume of the rod

To find the mass of the rod

To find the length of the rod

The volume of a solid

The length of a curve

The mass of small rectangular regions

The perimeter of a region

It reflects the region

It translates the region

It scales the areas near a point

It determines the rotation angle

To avoid double integration

To ensure the function is injective

To simplify the computation

To account for negative scaling factors

Finding the volume of a cube

Calculating the area of a square

Determining the length of a line

Integrating over a circular region