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Presented to: Mg* Diego Leandro León

By:
German Avila Mendoza - THE PRISM Andrea Maria Rincon - THE PIRAMID Sandra Patricia Mira - THE CYLINDERMelisa Betancur Lezcano - THE CONE Maria Judith Ruiz - THE SPHERE

Geometric Solid

November 30, 2020

¿What are the main elements of the prisms?

Bases: They all have two bases, both being equal and parallel.

Side faces: They are the parallelograms between the 2 bases.

Height: It is the distance between the two bases.

¿ what are prisms ?

A prism is a polyhedron that has two equal and parallel faces

called bases and their lateral faces are parallelograms.

THE PRISM

Imagen Pinterest.es

Main elements of prisms

Height

Base

Side face

Pentagonal

¿What types of prisms are there according to their base?

Irregular: Are those whose bases are irregular polygons.

Regular: They are those whose bases are regular polygons.

The prisms take the name of the base polygon:

Quadrangular

Triangular

Hexagonal

To calculate the area of the prism, add

the area of each of the faces you have.

For right prisms, the area is calculated

as follows:

Area = 2 × Ab + Pb × h

where

Ab is the area of the base

Pb is the perimeter of the base

h is the height of the prism

Prism Area

You need to build the school's sports badge from the

El Silencio village in the Municipality of Cisneros,and a

philanthropist donates financial resources. The plate will

be built in the shape of a rectangular prism, its measurements being 18 m long, 12 m wide and 6 m thick. What is the total area of the rectangular prism?

Rectangular prism

6 m

18 m

12 m

1 First of all, we calculate the perimeter of the base of the plate, which because it is a rectangle, we must calculate its surface, as the plate is a rectangular prism, we find its total area, for this we need to know the perimeter of the base, the lateral area and the base area

P_Base= 2*12 m + 2*18 m = 60 m

2 The total area is given by the sum of the lateral area and twice the area of the base, that is, A_T = A_L + 2 A_B. We calculate the lateral area
A_L = 6 m * 60 m = 360 m²
3. We calculate the area of the baseA_B = 12 m * 18 m = 216 m²
4. We have the values of the lateral and base area, with them we calculate the total areaA_T = 360 m² + 2 * 216 m² = 792 m²

The Pyramid

It is a polyhedron with a

three-dimensional shape

that is made up of a base

and triangular lateral faces

where the edges meet at a

point known as the common

vertex.

Elements of the pyramid

Classification of pyramids according

to the polygon of their base

Is the portion of the pyramid between

the base and a plane

parallel to it that intersects

all the lateral artists.

The height of the trunk

is a segment perpendicular

to the planes of the two bases.

The resulting segment of apothem

of the pyramid is the

apothem of the trunk.

Pyramid trunk

What is the volume of a pyramid with a

quadrangular base,

if the sides of the base measure

10 cm and the height is 18 cm.

Volume of the pyramid

Select the correct option

V=1/3 B . h

a. 600 m³

b. 610 m³

c. 580 m³

d. 660 m³

Find the total area of a

quadrangular pyramid with

a side of base 10 m and

height 5 m.

Pyramid area

A lateral = sum of lateral faces.

A total = A lateral + A Base

Select the correct option

a. 241,4 m²

b. 441,4 cm²

c. 641,4 cm²

d. 541,4 cm²

THE CYLINDER

Is a round geometric solid,formed by a rectangule and two parallel base circles.

FLAT DEVELOPMENTTwo circles of equal size and a rectangle whase width is equal to the length of the circle.

CYLINDER ELEMENTS

AREA AND VOLUMEh=heightr= radiusVolume: area of base times height

Area: sum of the area of the two bases plus the lateral area.

What is the area of the cylinder knowing that h = 9 cm and r = 3 cm?

2.260 cm²

22.60 cm²

226.08 cm²

2.260.08 cm²

What is the volume of a cylinder knowing that h = 9 cm and r = 3 cm?

1.160 cm³

116 cm³

1.161 cm³

6.111 cm³

It is the body of revolution obtained spinning a right triangle around one
of his legs.

HEIGHT: It is the distance from the vertex to the base.

THE CONE

AXIS:
It is the fixed leg around which the triangle rotates.

CONE ELEMENTS

VERTEX: is the point where the generatrices converge

GENERATOR:
It is the hypotenuse of the right triangle.

BASE:
It is the circle that forms the other leg.

To calculate the area or volume

you only need one cone two

of the following 3 data: height,

radius, generatrix, since by

the theorem Pythagoras can

be find the third.

Regarding volumes and how it happened

with the prism and the inscribed pyramid,

the volume of the cone is one third of the

volume of the cylinder of equal base

and height.

CONE AREA AND VOLUME

50,24 cm³

94,2cm³

Determine the volume of a 4-cm cone of a

ice cream radius and 3cm tall

62,8 cm³

39,6 cm³

Determine the total area of an ice cream cone

4cm radius and 3cm high

113,04 cm³

175,84 cm³

94,2 cm³

THE ELEMENTS OF THE CONE ARE: BASE, HEIGHT, RADIO, GENERATOR Y VERTICE

Imagen. Recursostic.educación.es

FALSE

TRUE

THE CONE IS A BODY FORMED FORMED BY A LATERAL AND CLOSED CURVED SURFACE AND TWO PARALLEL PLANES THAT FORM ITS BASES; ESPECIALLY THE CIRCULAR CYLINDER.

TRUE

FALSE

Imagen. Gifimagen.net

Geometrical body of revolution formed by rotating a semicircle around its diameter.

THE SPHERE

Maximum circumference: Circumference drawn on the sphere and whose center is the same center of the sphere.

SPHERE ELEMENTS

Rotating axis: Line where the diameter of the semicircle is located.

Center: Interior point equidistant from any point on the sphere.

Diameter: Line segment that passes

through the center (rotating axis)

of the sphere and joins two opposite

points located on its surface.

Radius: Distance from the center to

a point on the sphere.

Area of the sphere:

Surface that surrounds

this solid of revolution.

Volume of the sphere: It is the space that the sphere occupies, or thefilling capacity it has.

AREA AND VOLUME OF THE SPHERE

Ana wants to give her classmates a ball of chocolate for “love and

friendship”. She has a mold to make the balls that has 2 cm of

radius. She needs to know with how much melted chocolate she

must fill the mold to make a sphere or chocolate ball. After making

the balls, she wants to wrap them in foil without wasting it.

How much foil does she need in order to wrap a ball?

MATH PROBLEM