Name: Volumes with Cross Sections, Squares, Rectangles, Triangles and Semicircles - Calculus
Uploaded: 2025-11-14T00:00:00+00:00
Duration: 9 min 37 s
Description: In calculus, volumes using cross-sections are found by integrating the area of a slice across a region, expressed as \(V=\int _{a}^{b}A(x)\,dx\) or \(V=\int _{c}^{d}A(y)\,dy\). To use this method, you

11 days ago

Health & Science Education

In calculus, volumes using cross-sections are found by integrating the area of a slice across a region, expressed as \(V=\int _{a}^{b}A(x)\,dx\) or \(V=\int _{c}^{d}A(y)\,dy\). To use this method, you must: 1) Determine the base of the solid and the shape of its cross-sections perpendicular to an axis (e.g., squares, rectangles, triangles), 2) Find the formula for the area, \(A\), of one cross-section in terms of the integration variable (e.g., \(A(x)\)), and 3) Integrate this area function over the appropriate bounds to sum the volumes of all the infinitesimal slices, yielding the total volume.

💡Steps for Calculating Volume with Cross-Sections
• Sketch the Solid and Its Base: Start by sketching the region that forms the base of the solid and the shape of its cross-sections.
• Identify the Cross-Sectional Area Function:
⚬ Choose the variable of integration (either \(x\) or \(y\)).
⚬ Determine the formula for the area, \(A\), of a single cross-section based on the shape of that slice (e.g., \(A=s^{2}\) for a square).
⚬ Express this area, \(A(x)\) or \(A(y)\), as a function of only that chosen integration variable.
• Determine the Limits of Integration: Find the upper and lower bounds (\(a\) and \(b\), or \(c\) and \(d\)) for your integration based on the region of the base.
• Set up and Evaluate the Integral:
⚬ The volume is then given by the definite integral: \(V=\int _{a}^{b}A(x)\,dx\) or \(V=\int _{c}^{d}A(y)\,dy\).
⚬ Evaluate the integral to find the total volume of the solid.

💡Example: Square Cross-Sections
• If the base is a region bounded by curves, and the cross-sections perpendicular to the x-axis are squares, the area \(A(x)\) of a cross-section is the square of the side length, \(s(x)\), found from the base.
• So, \(A(x)=[s(x)]^{2}\).
• The volume is then \(V=\int _{a}^{b}[s(x)]^{2}\,dx\), where \(a\) and \(b\) are the limits along the x-axis.

💡Key Concept:
• Infinite Summation: This method works by approximating the volume as a sum of infinitely many thin slices (each with volume Area × thickness) and then using the definite integral to find the exact sum.

💡Worksheets are provided in PDF format to further improve your understanding:
• Questions Worksheet: https://drive.google.com/file/d/1GQtYzPXeZpvnm7EdpOAPfEyr-VSltAse/view?usp=drive_link
• Answers: https://drive.google.com/file/d/1urkbDfPaDPsymE8T58TZZJHgeUw-P-qx/view?usp=drive_link

💡Chapters:
00:00 Volumes with cross sections, squares and rectangles, with example
02:41 Triangle and semicircle cross sections, with examples

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