Pyramid and its elements. Basic properties of a regular pyramid
Pyramid. Truncated pyramid
Pyramid is a polyhedron, one of whose faces is a polygon ( base ), and all other faces are triangles with a common vertex ( side faces ) (Fig. 15). The pyramid is called correct , if its base is a regular polygon and the top of the pyramid is projected into the center of the base (Fig. 16). A triangular pyramid with all edges equal is called tetrahedron .
Lateral rib of a pyramid is the side of the side face that does not belong to the base Height pyramid is the distance from its top to the plane of the base. All side ribs regular pyramid equal to each other, all side faces are equal isosceles triangles. The height of the side face of a regular pyramid drawn from the vertex is called apothem . Diagonal section is called a section of a pyramid by a plane passing through two lateral edges that do not belong to the same face.
Lateral surface area pyramid is the sum of the areas of all lateral faces. Total surface area is called the sum of the areas of all the side faces and the base.
Theorems
1. If in a pyramid all the lateral edges are equally inclined to the plane of the base, then the top of the pyramid is projected into the center of the circle circumscribed near the base.
2. If all the side edges of a pyramid have equal lengths, then the top of the pyramid is projected into the center of a circle circumscribed near the base.
3. If all the faces in a pyramid are equally inclined to the plane of the base, then the top of the pyramid is projected into the center of a circle inscribed in the base.
To calculate the volume of an arbitrary pyramid, the correct formula is:
Where V- volume;
S base– base area;
H– height of the pyramid.
For a regular pyramid, the following formulas are correct:
Where p– base perimeter;
h a– apothem;
H- height;
S full
S side
S base– base area;
V– volume of a regular pyramid.
Truncated pyramid called the part of the pyramid enclosed between the base and a cutting plane parallel to the base of the pyramid (Fig. 17). Regular truncated pyramid is the part of a regular pyramid enclosed between the base and a cutting plane parallel to the base of the pyramid.
Reasons truncated pyramid - similar polygons. Side faces – trapezoids. Height of a truncated pyramid is the distance between its bases. Diagonal a truncated pyramid is a segment connecting its vertices that do not lie on the same face. Diagonal section is a section of a truncated pyramid by a plane passing through two lateral edges that do not belong to the same face.
For a truncated pyramid the following formulas are valid:
(4)
Where S 1 , S 2 – areas of the upper and lower bases;
S full– total surface area;
S side– lateral surface area;
H- height;
V– volume of a truncated pyramid.
For a regular truncated pyramid the formula is correct:
Where p 1 , p 2 – perimeters of the bases;
h a– apothem of a regular truncated pyramid.
Example 1. In a regular triangular pyramid, the dihedral angle at the base is 60º. Find the tangent of the angle of inclination of the side edge to the plane of the base.
Solution. Let's make a drawing (Fig. 18).
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The pyramid is regular, which means that at the base there is an equilateral triangle and all the side faces are equal isosceles triangles. The dihedral angle at the base is the angle of inclination of the side face of the pyramid to the plane of the base. The linear angle is the angle a between two perpendiculars: etc. The top of the pyramid is projected at the center of the triangle (the center of the circumcircle and inscribed circle of the triangle ABC). The angle of inclination of the side edge (for example S.B.) is the angle between the edge itself and its projection onto the plane of the base. For the rib S.B. this angle will be the angle SBD. To find the tangent you need to know the legs SO And O.B.. Let the length of the segment BD equals 3 A. Dot ABOUT line segment BD is divided into parts: and From we find SO: 
From we find: 
Answer:
Example 2. Find the volume of a regular truncated quadrangular pyramid if the diagonals of its bases are equal to cm and cm, and its height is 4 cm.
Solution. To find the volume of a truncated pyramid, we use formula (4). To find the area of the bases, you need to find the sides of the base squares, knowing their diagonals. The sides of the bases are equal to 2 cm and 8 cm, respectively. This means the areas of the bases and Substituting all the data into the formula, we calculate the volume of the truncated pyramid:
Answer: 112 cm 3.
Example 3. Find the area of the lateral face of a regular triangular truncated pyramid, the sides of the bases of which are 10 cm and 4 cm, and the height of the pyramid is 2 cm.
Solution. Let's make a drawing (Fig. 19).
The side face of this pyramid is an isosceles trapezoid. To calculate the area of a trapezoid, you need to know the base and height. The bases are given according to the condition, only the height remains unknown. We'll find her from where A 1 E perpendicular from a point A 1 on the plane of the lower base, A 1 D– perpendicular from A 1 per AC. A 1 E= 2 cm, since this is the height of the pyramid. To find DE Let's make an additional drawing showing the top view (Fig. 20). Dot ABOUT– projection of the centers of the upper and lower bases. since (see Fig. 20) and On the other hand OK– radius inscribed in the circle and 
OM– radius inscribed in a circle:
MK = DE.
According to the Pythagorean theorem from
Side face area: 
Answer:
Example 4. At the base of the pyramid lies an isosceles trapezoid, the bases of which A And b (a> b). Each side face forms an angle equal to the plane of the base of the pyramid j. Find the total surface area of the pyramid.
Solution. Let's make a drawing (Fig. 21). Total surface area of the pyramid SABCD equal to the sum of the areas and the area of the trapezoid ABCD.
Let us use the statement that if all the faces of the pyramid are equally inclined to the plane of the base, then the vertex is projected into the center of the circle inscribed in the base. Dot ABOUT– vertex projection S at the base of the pyramid. Triangle SOD is the orthogonal projection of the triangle CSD to the plane of the base. By the theorem on the area of orthogonal projection flat figure we get:
Likewise it means 
Thus, the problem was reduced to finding the area of the trapezoid ABCD. Let's draw a trapezoid ABCD separately (Fig. 22). Dot ABOUT– the center of a circle inscribed in a trapezoid.
Since a circle can be inscribed in a trapezoid, then or From the Pythagorean theorem we have
All lateral edges of a regular pyramid are equal, and the lateral faces are equal isosceles triangles. Given: PA1A2…An – regular pyramid Document: 1) А1Р = А2Р = … = АnР 2) ?А1А2Р = ?А2А3Р = … = = ?Аn-1АnР – r/b.
Slide 7 from the presentation "Pyramids". The size of the archive with the presentation is 181 KB.Geometry 10th grade
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Video tutorial 2: Pyramid problem. Volume of the pyramid
Video tutorial 3: Pyramid problem. Correct pyramid
Lecture: The pyramid, its base, side ribs, height, side surface; triangular pyramid; regular pyramid
Pyramid, its propertiesPyramid is a three-dimensional body that has a polygon at its base, and all its faces consist of triangles.
A special case of a pyramid is a cone with a circle at its base.
Let's look at the main elements of the pyramid:
Apothem- this is a segment that connects the top of the pyramid with the middle of the lower edge of the side face. In other words, this is the height of the edge of the pyramid.
In the figure you can see triangles ADS, ABS, BCS, CDS. If you look closely at the names, you can see that each triangle has one common letter in its name - S. That is, this means that all the side faces (triangles) converge at one point, which is called the top of the pyramid.
The segment OS that connects the vertex with the point of intersection of the diagonals of the base (in the case of triangles - at the point of intersection of the heights) is called pyramid height.
A diagonal section is a plane that passes through the top of the pyramid, as well as one of the diagonals of the base.
Since the lateral surface of the pyramid consists of triangles, then to find total area side surface, you need to find the area of each face and add them up. The number and shape of faces depends on the shape and size of the sides of the polygon that lies at the base.
The only plane in a pyramid that does not belong to its vertex is called basis pyramids.
In the figure we see that the base is a parallelogram, however, it can be any arbitrary polygon.
Properties:
Consider the first case of a pyramid, in which it has edges of the same length:
- A circle can be drawn around the base of such a pyramid. If you project the top of such a pyramid, then its projection will be located in the center of the circle.
- The angles at the base of the pyramid are the same on each face.
- In this case, a sufficient condition for the fact that a circle can be described around the base of the pyramid, and also that all the edges are of different lengths, can be considered the same angles between the base and each edge of the faces.
If you come across a pyramid in which the angles between the side faces and the base are equal, then the following properties are true:
- You will be able to describe a circle around the base of the pyramid, the apex of which is projected exactly at the center.
- If you draw each side edge of the height to the base, then they will be of equal length.
- To find the lateral surface area of such a pyramid, it is enough to find the perimeter of the base and multiply it by half the length of the height.
- S bp = 0.5P oc H.
- Types of pyramid.
- Depending on which polygon lies at the base of the pyramid, they can be triangular, quadrangular, etc. If at the base of the pyramid lies a regular polygon (with equal sides), then such a pyramid will be called regular.
Regular triangular pyramid
Introduction
When we started studying stereometric figures, we touched on the topic “Pyramid”. We liked this topic because the pyramid is very often used in architecture. And since ours future profession architect, inspired by this figure, we think that she can push us towards great projects.
The strength of architectural structures is their most important quality. Linking strength, firstly, with the materials from which they are created, and, secondly, with the features constructive solutions, it turns out that the strength of a structure is directly related to the geometric shape that is basic for it.
In other words, we are talking about a geometric figure that can be considered as a model of the corresponding architectural form. It turns out that geometric shape also determines the strength of an architectural structure.
Since ancient times, the most durable architectural structure has been considered Egyptian pyramids. As you know, they have the shape of regular quadrangular pyramids.
It is this geometric shape that provides the greatest stability due to large area grounds. On the other hand, the pyramid shape ensures that the mass decreases as the height above the ground increases. It is these two properties that make the pyramid stable, and therefore strong under the conditions of gravity.
Objective of the project: learn something new about pyramids, deepen your knowledge and find practical application.
To achieve this goal, it was necessary to solve the following tasks:
· Learn historical information about the pyramid
· Consider the pyramid as a geometric figure
· Find application in life and architecture
· Find the similarities and differences between the pyramids located in different parts Sveta
Theoretical part
Historical information
The beginning of the geometry of the pyramid was laid in Ancient Egypt and Babylon, however active development received in Ancient Greece. The first to establish the volume of the pyramid was Democritus, and Eudoxus of Cnidus proved it. The ancient Greek mathematician Euclid systematized knowledge about the pyramid in the XII volume of his “Elements”, and also derived the first definition of a pyramid: a solid figure bounded by planes that converge from one plane to one point.
Tombs of Egyptian pharaohs. The largest of them - the pyramids of Cheops, Khafre and Mikerin in El Giza - were considered one of the Seven Wonders of the World in ancient times. The construction of the pyramid, in which the Greeks and Romans already saw a monument to the unprecedented pride of kings and cruelty that doomed the entire people of Egypt to meaningless construction, was the most important cult act and was supposed to express, apparently, the mystical identity of the country and its ruler. The population of the country worked on the construction of the tomb during the part of the year free from agricultural work. A number of texts testify to the attention and care that the kings themselves (albeit of a later time) paid to the construction of their tomb and its builders. It is also known about the special cult honors that were given to the pyramid itself.
Basic Concepts
Pyramid is called a polyhedron whose base is a polygon, and the remaining faces are triangles that have a common vertex.
Apothem- the height of the side face of a regular pyramid, drawn from its vertex;
Side faces- triangles meeting at a vertex;
Side ribs- common sides of the side faces;
Top of the pyramid- a point connecting the side ribs and not lying in the plane of the base;
Height- a perpendicular segment drawn through the top of the pyramid to the plane of its base (the ends of this segment are the top of the pyramid and the base of the perpendicular);
Diagonal section of a pyramid- section of the pyramid passing through the top and diagonal of the base;
Base- a polygon that does not belong to the vertex of the pyramid.
Basic properties of a regular pyramid
The lateral edges, lateral faces and apothems are respectively equal.
The dihedral angles at the base are equal.
The dihedral angles at the lateral edges are equal.
Each height point is equidistant from all the vertices of the base.
Each height point is equidistant from all side faces.
Basic pyramid formulas
The area of the lateral and total surface of the pyramid.
The area of the lateral surface of a pyramid (full and truncated) is the sum of the areas of all its lateral faces, the total surface area is the sum of the areas of all its faces.
Theorem: The area of the lateral surface of a regular pyramid is equal to half the product of the perimeter of the base and the apothem of the pyramid.
p- base perimeter;
h- apothem.
The area of the lateral and full surfaces of a truncated pyramid.
p 1, p 2 - base perimeters;
h- apothem.
R- total surface area of a regular truncated pyramid;
S side- area of the lateral surface of a regular truncated pyramid;
S 1 + S 2- base area
Volume of the pyramid
Form volume ula is used for pyramids of any kind.
H- height of the pyramid.
Pyramid corners
The angles formed by the side face and the base of the pyramid are called dihedral angles at the base of the pyramid.
A dihedral angle is formed by two perpendiculars.
To determine this angle, you often need to use the three perpendicular theorem.
The angles formed by the lateral edge and its projection onto the base plane are called angles between the side edge and the plane of the base.
The angle formed by two lateral edges is called dihedral angle at the lateral edge of the pyramid.
The angle formed by two lateral edges of one face of the pyramid is called angle at the top of the pyramid.
Pyramid sections
The surface of a pyramid is the surface of a polyhedron. Each of its faces is a plane, therefore the section of a pyramid defined by a cutting plane is a broken line consisting of individual straight lines.
Diagonal section
The section of a pyramid by a plane passing through two lateral edges that do not lie on the same face is called diagonal section pyramids.
Parallel sections
Theorem:
If the pyramid is intersected by a plane parallel to the base, then the lateral edges and heights of the pyramid are divided by this plane into proportional parts;
The section of this plane is a polygon similar to the base;
The areas of the section and the base are related to each other as the squares of their distances from the vertex.
Types of pyramid
Correct pyramid– a pyramid whose base is a regular polygon, and the top of the pyramid is projected into the center of the base.
For a regular pyramid:
1. side ribs are equal
2. side faces are equal
3. apothems are equal
4. dihedral angles at the base are equal
5. dihedral angles at the lateral edges are equal
6. each point of height is equidistant from all vertices of the base
7. each height point is equidistant from all side edges
Truncated pyramid- part of the pyramid enclosed between its base and a cutting plane parallel to the base.
The base and corresponding section of a truncated pyramid are called bases of a truncated pyramid.
A perpendicular drawn from any point of one base to the plane of another is called the height of a truncated pyramid.
Tasks
No. 1. In a regular quadrangular pyramid, point O is the center of the base, SO=8 cm, BD=30 cm. Find the side edge SA.
Problem solving
No. 1. In a regular pyramid, all faces and edges are equal.
Consider OSB: OSB is a rectangular rectangle, because.
SB 2 =SO 2 +OB 2
SB 2 =64+225=289
Pyramid in architecture
A pyramid is a monumental structure in the form of an ordinary regular geometric pyramid, in which the sides converge at one point. By functional purpose Pyramids in ancient times were places of burial or cult worship. The base of a pyramid can be triangular, quadrangular, or in the shape of a polygon with an arbitrary number of vertices, but the most common version is the quadrangular base.
There are a considerable number of pyramids built different cultures Ancient world mainly as temples or monuments. Large pyramids include the Egyptian pyramids.
All over the Earth you can see architectural structures in the form of pyramids. The pyramid buildings are reminiscent of ancient times and look very beautiful.
Egyptian pyramids are the greatest architectural monuments Ancient Egypt, among which one of the “Seven Wonders of the World” is the Pyramid of Cheops. From the foot to the top it reaches 137.3 m, and before it lost the top, its height was 146.7 m
The radio station building in the capital of Slovakia, resembling an inverted pyramid, was built in 1983. In addition to offices and service premises, inside the volume there is a fairly spacious concert hall, which has one of the largest organs in Slovakia.
The Louvre, which is “silent, unchanged and majestic, like a pyramid,” has undergone many changes over the centuries before becoming the greatest museum in the world. It was born as a fortress, erected by Philip Augustus in 1190, which soon became a royal residence. In 1793 the palace became a museum. Collections are enriched through bequests or purchases.
We are well aware of the great Egyptian pyramids; everyone can imagine what they look like. This idea will help us understand the features of such a geometric figure as a pyramid.
A pyramid is a polyhedron consisting of a flat polygon - the base of the pyramid, a point not lying in the plane of the base - the top of the pyramid and all the segments connecting the top with the points of the base. The segments that connect the top of the pyramid with the vertices of the base are called lateral edges. In Fig. 1 shows the pyramid SABCD. Quadrangle ABCD is the base of the pyramid, point S is the vertex of the pyramid, segments SA, SB, SC and SD are the edges of the pyramid.
The height of the pyramid is the perpendicular descended from the top of the pyramid to the plane of the base. In Fig. 1 SO – height of the pyramid.
A pyramid is called n-gonal if its base is an n-gon. Figure 1 shows a quadrangular pyramid. A triangular pyramid is called a tetrahedron.
A pyramid is called regular if its base is a regular polygon and the base of its height coincides with the center of this polygon. The lateral edges of a regular pyramid are equal, and, therefore, the lateral faces are isosceles triangles. In a regular pyramid, the height of the side face drawn from the top of the pyramid is called the apothem.
The pyramid has a number of properties.
All diagonals of a pyramid belong to its faces.
If all side edges are equal, then:
- a circle can be described near the base of the pyramid, with the top of the pyramid projected into its center;
- lateral ribs form with the plane of the base equal angles, and, conversely, if the side edges form equal angles with the plane of the base, or if a circle can be described around the base of the pyramid, with the top of the pyramid projected into its center, then all the side edges of the pyramid are equal.
If the side faces are inclined to the base plane at the same angle, then:
- a circle can be inscribed at the base of the pyramid, and the top of the pyramid is projected into its center;
- the heights of the side faces are equal;
- The area of the side surface is equal to half the product of the perimeter of the base and the height of the side face.
Let's consider formulas for finding the volume and surface area of a pyramid.
The volume of the pyramid can be calculated using the following formula:
where S is the area of the base, and h is the height.
To find the total surface area of the pyramid, you need to use the formula:
S p = S b + S o ,
where S p is the total surface area, S b is the lateral surface area, S o is the base area.
A truncated pyramid is a polyhedron enclosed between the base of the pyramid and a cutting plane parallel to its base. The faces of a truncated pyramid lying in parallel planes are called the bases of the truncated pyramid, the remaining faces are called lateral faces. The bases of a truncated pyramid are similar polygons, and the side faces are trapezoids. A truncated pyramid that is obtained from a regular pyramid is called regular truncated pyramid. The lateral faces of a regular truncated trapezoid are equal isosceles trapezoids, their heights are called apothems.
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