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Chapter 12: Problem 1

Draw an example of each solid. a. cylinder b. pentagonal prism c. cone d. rectangular pyramid

Short Answer

Expert verified
Draw each solid: cylinder, pentagonal prism, cone, and rectangular pyramid.

Step by step solution

01

Draw a Cylinder

Start by sketching two ellipses parallel to each other. These ellipses represent the top and bottom surfaces of the cylinder. Connect the corresponding edges of these ellipses with two vertical lines to form the sides. The result is a cylindrical shape.
02

Draw a Pentagonal Prism

Begin by drawing a regular pentagon for the front face. Then parallel to this, draw another identical pentagon behind it to represent the back face. Connect the corresponding vertices of the two pentagons with straight lines to complete the prism.
03

Draw a Cone

Draw a circle to represent the base of the cone. From the center of the circle, draw a segment perpendicular to the circle vertically upwards. Create straight lines connecting the top of this segment (the apex) with the circumference of the circle, forming a conical shape.
04

Draw a Rectangular Pyramid

Start by drawing a rectangle for the base. Then draw a point above the center of the rectangle to represent the apex. Connect each vertex of the rectangle to this apex with straight lines to complete the pyramid.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Cylinder
A cylinder is a 3-dimensional solid with two parallel circular bases connected by a curved surface. Think of household items like cans or tubes to understand its shape.

To draw a cylinder:
  • Start by sketching two parallel ellipses, one above the other. These will be the top and bottom bases of the cylinder.
  • Next, connect the edges of these ellipses using two vertical lines. This completes the cylinder.
To calculate the surface area of a cylinder, remember:
The lateral surface area is given by the formula: \[ A = 2 \pi rh \] where \( r \) is the radius of the base and \( h \) is the height of the cylinder.

In addition to its physical presence in everyday life, understanding a cylinder is crucial in fields like engineering and mathematics for volume and surface area calculations.
Pentagonal Prism
A pentagonal prism is a solid that has two parallel pentagonal bases and rectangular faces connecting corresponding sides. It resembles a box with pentagons on either end.To draw a pentagonal prism:
  • Start with a regular pentagon for the front face.
  • Draw another identical pentagon parallel for the back face.
  • Finally, connect corresponding vertices with straight lines, forming the rectangular sides.
This completes the pentagonal prism.The understanding of prismatic shapes like these is essential in geometry and architecture, as they can model structures and design patterns.The volume formula for a prism is given by: \[ V = B \times h \]where \( B \) is the area of the base and \( h \) is the height.
Cone
A cone is a solid with a circular base tapering smoothly up to a point called the apex. Cones are quite common in everyday items like ice cream cones or traffic cones.
To draw a cone:
  • Begin with a circle for the base.
  • From the center of this circle, draw a vertical line upwards. This represents the height of the cone.
  • Connect the top of this line (the apex) with straight lines to the edge of the circle, forming the conical surface.
In geometry, one of the key properties of a cone is its volume, calculated using the formula:
\[ V = \frac{1}{3} \pi r^2 h \] where \( r \) is the radius of the base, and \( h \) is the height. Cones are not only crucial in mathematics but also have various applications in physics and engineering due to their unique properties.
Rectangular Pyramid
A rectangular pyramid has a rectangular base with triangular faces converging at a common apex above the base. Picture it like the pyramids you see in Egypt, but with a rectangular base.To draw a rectangular pyramid:
  • Start with a rectangle for the base.
  • Place a point (the apex) above this rectangle, ideally centered for symmetry.
  • Draw lines from each vertex of the rectangle to the apex. These form the triangular sides of the pyramid.
Rectangular pyramids are vital in architecture, as they illustrate fundamental concepts of pyramid structures.
The volume of a rectangular pyramid is calculated by using the formula:\[ V = \frac{1}{3} Bh \]where \( B \) is the area of the base and \( h \) is the height of the pyramid. Understanding these geometrical constructs and their formulas helps in real-world applications like construction and design.

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Most popular questions from this chapter

Multiple Choice Which of the following represents the distance between the points with coordinates \((a, 0)\) and \((0, b) ? (A) \)\sqrt{2 a+2 b}\( (B) \)\sqrt{a^{2}+b^{2}}\( (c) \)\sqrt{a+b}\( (D) \)\sqrt{a^{2}-b^{2}}$

History The Great Pyramid at Giza was built about 2500 B.C. It is a square pyramid. a. Originally the Great Pyramid was about 481 feet tall. Each side of the base was about 755 feet long. What was the original volume of the pyramid? b. Today the Great Pyramid is about 450 feet tall. Each side of the base is still about 755 feet long. What is the current volume of the pyramid? c. What is the difference between the volume of the original pyramid and the current pyramid? d. What was the yearly average (mean) loss in the volume of the pyramid from 2500 B.C. to 2000 A.D.?

The base of a pyramid is a triangle with a base of 12 inches and a height of 8 inches. The height of the pyramid is 10 inches. Find the volume of the pyramid.

Find the area of each figure to nearest hundredth. triangle: base, \(3 \frac{3}{4}\) feet; height, 4 feet

Sales The Boy Scouts of America recently made a giant popcorn ball to promote their popcorn sales. Scouts and other helpers added to the popcorn ball as it traveled around the country. a. What was the volume of the popcorn ball when it had a diameter of 6 feet? Round to the nearest hundredth. b. Suppose the diameter of the popcorn ball was enlarged to 9 feet. What would be its volume to the nearest hundredth? c. What was the volume of the popcorn needed to increase the popcorn ball from a diameter of 6 feet to a diameter of 9 feet?
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