
Cavalieri's Principle
Presentation
•
Mathematics
•
10th Grade
•
Hard
James Gonzalez
FREE Resource
15 Slides • 11 Questions
1
Cavalieri's Principle and Cross Sections
Thinks about it.....
Do the 2 stacks of coins have the same volume?
2
3
What is a cross section?
A cross-section is the shape we get when cutting through an object
4
5
When cutting a cylinder parallel to the base, the cross-section is a circle.
What is the cross section of a cylinder when cutting it perpendicular to the base?
6
The perpendicular cross section of a cylinder is a rectangle.
What happens to the rectangle cross-sections as you move closer to the edge of the cylinder?
7
The cross-section of a rectangular pyramid parallel to the base is a rectangle.
What relationship does a cross-section parallel to the base have with the base?
8
9
Multiple Choice
Describe the cross-section.
square
rectangle
triangle
circle
10
Multiple Choice
What shape will the vertical cross -section of a cylinder be?
Circle
Triangle
Rectangle
Ellipse
11
Multiple Choice
12
Multiple Choice
What shape will the horizontal cross-section of a sphere be?
Dome
Circle
Ellipse
Rectangle
13
Do the two stacks of coins have the same volume? How do you know?
​
14
15
Since the 2 stacks have the same kind and amount of coins, it makes sense to say that the two stacks have the same volume. The arrangement of the coins does not effect the volume. This is Cavelieri's Principle. The coins have the same cross-sectional area (same coin) at every plane parallel to the base.
16
Compare the volume of the stacks of coins.
Some of the coins are larger than the others. There is no easy way to tell whether the stacks have the same volume.
17
Compare the volume of the pyramids.
The volumes of the pyramids do not change.
Cavalieri's Principal can help explain why.
18
Cavalieri's Principle
https://schoolyourself.org/learn/geometry/cavalieri-3d
19
20
Multiple Choice
An oblique shape will always have the same volume as a right shape if they have the same base.
True
False - an oblique shape and a right shape can never have the same volume
False - an oblique shape and a right shape can't have the same base
False - an oblique shape will always have the same volume as a right shape if they have the same base AND height
21
Multiple Choice
The shapes below have the Base Areas and Heights. Which will have the same volume. Which ones will have the same volumes based on Cavalieri's Principle?
Rectangular Pyramid and Triangular Prism
Rectangular Pyramid and Cone
Triangular Prism and Cone
All three.
22
Multiple Choice
The shapes below have the Base Areas and Heights. Which will have the same volume. Which ones will have the same volumes based on Cavalieri's Principle?
Rectangular Pyramid and Triangular Prism
Rectangular Pyramid and Cylinder
Triangular Prism and Cylinder
All three.
23
Multiple Choice
Based on Cavalieri's Principle, will the two prisms have the same volume?
No, they will not be same. Although the heights are the same, the cross-sections are different shapes.
Yes, the heights of both prisms are the same and they have the same cross-sectional area. Therefore, they will have the same volume.
24
Multiple Choice
Jenny says that the two prisms DO NOT have the same volume because the cross sections are not the same. Renee disagrees; she says that it isn't the shape that has to be the same but the area. Renee thinks they have the same volume.
Who is correct?
Jenny
Renee
Neither Jenny or Renee is correct.
25
Multiple Choice
Determine whether the 3-D figures are congruent to each other. (Hint: Find the area of the cross-sectional shapes).
False. Although the cross-sectionals' area and heights of the 3-D figures are the same,the shapes are not congruent
True. The cross-sectionals' area and the heights of the 3-D figures are the same. They don't have to be the same shape.
False. The cross-sections are not the same shape.
True. All the shapes are 3-D figures and the same height.
26
Multiple Choice
a) Cavalieri’s Principle states that any two objects with the same cross-sectional areas and heights must have the same volume.
True
False - the cross sectional areas are not relevant
False - only the slant height is relevant
False - even if they have the same cross sectional areas and heights, they cannot have the same volume.
Cavalieri's Principle and Cross Sections
Thinks about it.....
Do the 2 stacks of coins have the same volume?
Show answer
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