Volumes

V = ∫[a,b] (f(x))^2 dx

V = π∫[a,b] (f(x))^3 dx

V = π∫[a,b] (f(x))^2 dy

V = π∫[a,b] (f(x))^2 dx

squares

rectangles

circles

triangles

π/3

3π/7

π/5

2π/5

diameter

radius

height

volume

The disk method uses spheres for integration, while the washer method uses cylinders.

The disk method uses disks for integration, while the washer method uses washers (rings).

The disk method uses squares for integration, while the washer method uses rectangles.

The disk method uses triangles for integration, while the washer method uses circles.

pi/5

3pi/5

4pi/5

2pi/5

V = π∫[a,b] (R + r)dx

V = π∫[a,b] (R^2 + r^2)dx

V = π∫[a,b] (R - r)dx

V = π∫[a,b] (R^2 - r^2)dx

circle

ellipse

triangle

square

The volume of revolution is 10π/3 cubic units

The volume of revolution generated by rotating the region bounded by y = 2x, y = 0, and x = 2 about the y-axis is 8π/3 cubic units.

The volume of revolution is 6π/3 cubic units

The volume of revolution is 4π/3 cubic units

Slicing only considers the outer surface of the solid, ignoring the inner layers

Slicing is a method used to break down a solid into infinitesimally thin slices perpendicular to the axis of revolution, allowing for the calculation of volume by summing the volumes of these slices.

Slicing is a method used to calculate area instead of volume

Slicing involves rotating the solid around an axis without breaking it down into slices