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Applications of Integration: Volumes of Solids Using Disk, Washer, and Cross Section Methods

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Applications of Integration

Volume: The Disk Method

The disk method is a fundamental technique in calculus for finding the volume of a solid of revolution. When a region in the plane is revolved about a line (the axis of revolution), it forms a solid whose volume can be calculated using integration.

  • Solid of Revolution: A three-dimensional shape formed by rotating a two-dimensional region about an axis.

  • Disk: The simplest solid of revolution, formed by revolving a rectangle about an axis adjacent to one side.

  • Volume Formula: The volume of a disk is given by , where R is the radius and w is the width.

  • Generalization: For more complex solids, the region is divided into thin rectangles, each generating a disk when revolved.

Rectangle revolved to form a disk

Approximation and Integration: The volume is approximated by summing the volumes of n disks:

Summation formula for disk volumesSummation formula for disk volumes

As the number of disks increases, the approximation improves, leading to the integral formula:

Limit and integral formula for disk methodTransition from summation to integration

  • Horizontal Axis of Revolution:

  • Vertical Axis of Revolution:

Horizontal axis of revolutionVertical axis of revolutionDisk method summary table

Example: Disk Method

Find the volume of the solid formed by revolving the region bounded by and the x-axis () about the x-axis.

  • Radius:

  • Volume:

Solid of revolution for disk method example

Volume: The Washer Method

The washer method extends the disk method to solids of revolution with holes. Instead of a disk, a washer (disk with a hole) is used as the representative element.

  • Washer: Formed by revolving a rectangle about an axis, with inner radius r and outer radius R.

  • Volume Formula:

  • Generalization: For a region bounded by and , the volume is:

Washer method diagram

Plane region and solid of revolution with holeSolid of revolution with hole

Example: Washer Method

Find the volume of the solid formed by revolving the region bounded by and about the x-axis, for in .

  • Outer radius:

  • Inner radius:

  • Volume:

Washer method example setupWasher method example solutionWasher method example solution continued

After integration, the result is:

Washer method result

Example: Washer Method with Vertical Axis

When the axis of revolution is vertical, integration is performed with respect to y. Sometimes, two separate integrals are needed if the inner radius changes form.

  • Outer radius:

  • Inner radius:

  • Volume:

Washer method with vertical axisPiecewise inner radius formulaWasher method two-integral setupWasher method two-integral simplificationWasher method two-integral integrationWasher method two-integral resultWasher method final result

Solids with Known Cross Sections

Volumes can also be found for solids whose cross sections are not necessarily circular. If the area of the cross section is known, integration can be used to find the volume.

  • Common Cross Sections: Squares, rectangles, triangles, semicircles, trapezoids.

  • Volume Formula: For cross sections perpendicular to the x-axis:

  • Volume Formula: For cross sections perpendicular to the y-axis:

Cross sections perpendicular to x-axisCross sections perpendicular to y-axisVolumes of solids with known cross sections

Example: Triangular Cross Sections

Find the volume of a solid whose base is bounded by and , with cross sections perpendicular to the x-axis being equilateral triangles.

  • Base length:

  • Area of cross section:

  • Volume:

Solid with equilateral triangle cross sectionsTriangular base in xy-planeBase length calculationArea of equilateral triangleArea of cross section formulaIntegral setup for volumeIntegral evaluation for volumeFinal volume resultFinal volume result continuedFinal volume result continuedFinal volume result

Summary Table:

Method

Formula

Axis

Disk

Horizontal

Disk

Vertical

Washer

Horizontal

Washer

Vertical

Known Cross Section

Perpendicular to x-axis

Known Cross Section

Perpendicular to y-axis

Additional info: The notes provide a comprehensive overview of the application of integration to find volumes of solids, including the disk, washer, and known cross section methods, with detailed examples and step-by-step solutions.

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