Form 4 Mathematics - THREE-DIMENSIONAL FIGURES [PDF]

THREE-DEMENSIONAL FIGURES

INTRODUCTION

A three dimensional figure is a solid figure having three measures.

Some examples are pyramids, cylinders, prisms, cubes and cuboids.

– Apart from three dimensional figures, there are also one and two dimensional figures.

Examples

A line is one – dimensional. There is one direction to move along it. (up or down it).
A flat shape is two- dimensional. There are two directions to move across it (up or down, and left or right).

The diagram below show objects which are one or two –dimensional.

-The –dimensional space contains line and planes. Consider a diagram of a cube:

Note:

When we refer to a cube or cuboid ABCDEFGH, then ABCD and EFGH are apposite faces, with, E opposite A, F opposite B and so on , as in the diagram above

– Line and planes can be parallel or perpendicular. In the diagram above:

The lines AD and EH are parallel.
The lines AD and AE are perpendicular.
The planes ABCD and EFGH are parallel
The planes ABCD and AEHD are perpendicular
The lines AD and CE are neither parallel nor perpendicular and the planes ABCD and EHCB are neither parallel nor perpendicular

EXERCISE 3.1A

The diagram show a cube ABCDEFGH. The face ABCD is horizontal. Give

a) (a) Another horizontal face
b) (b)A vertical face
c) (c)A horizontal line
d) (d)A vertical line
Refer to the diagram for question. Write down
a) Two faces which meet at GC
b) Three edge which meet at F

CLASSIFYING THREE-DIMENSIONAL FIGURES

Definitions:

1) A polyhedron is a solid whose surface consists of flat polygons.
2 )A face is a flat surface of a solid.
3)An edge is a line where two faces meet.
4)A vertex is a point where three or more faces meet.
5)A diagonal is a line joining two vertices which is not an edge. A diagonal may go through the solid or be an its surface.

CUBOID

A cuboid is a box shape with faces that are rectangles. The diagram show a cuboid ABCDEFGH. All are rectangles that are parallel or perpendicular to each other.

-AG and BG are diagonals. AG goes through the solid, and GB lies on its surface.

CUBE

-A cube is a cuboid with all edges the same length. All the faces are squares.

PRISM

-A prism is a solid which has the same cross- section through. A triangular prism has a triangular cross-section

Faces: 5

Edges: 9

Vertices: 6

PYRAMID

A pyramid has a flat base in the shape of a polygons and all other edges come to a point called the vertex

TYPES OF PYRAMID

-If the vertex of the pyramid is above the centre of the base it is a right pyramid.

EXERCISE 3.1B

1) Find everyday objects in the shape of

(a) a cuboid (b) a cube (c) a prism

2)What are the mathematical names for the shapes of these objects?

(a) a match box (b) a football (c) an unsharpened pencil (d) the tip of a sharpened pencil.

CONSTRUCTION OF THREE-DIMENSIONAL FIGURES

-You can make a model of a solid out of paper. The shape that you cut out is a net. The diagram show a net for a cube.

Notice that:

There are six squares for the six faces of the cube

-There are many possible different nets for the same object. The nets below will also make a cube.

EXERCISE 3.2.A

Make nets for solids and construct the shapes

2)What sort of solid will be made from each of these net?

SKETCHING THREE-DIMENSIONAL FIGURES

-We can represent a three-dimensional object in two dimensional object in two dimensional.

By the use of oblique projection.

Look at the solid shown below:

-It is not drawn to scale.

-The following steps will give an accurate representation

Draw the base lines first at 30⁰to the horizontal. Then add the vertical lines. There are all parallel.
Now add any top edges, noting that all edges that are parallel will still be parallel in the oblique projection.

iii. You can now draw the sloping edges, together with any hidden edges that are drawn as dotted lines. The find diagram is now shown.

By the use of Isometric paper

-There is special paper to make drawing solids easier. This is Isometric paper. On this paper there are lines at 60⁰ to each other these lines to draw solids.

-Sometimes this paper has dots instead of lines

– – On a special grid the shape above looks like the diagram below

Exercise 3.3A

1) The diagram show a cube ABCDEFGH drawn in oblique projection

Write down

a) a)Two faces.
b) b)Two edges.
c) c) Two diagonals that pass through the shape.
d) d)Two diagonals that lie on the surface of the shape.

ANGLE BETWEEN LINE AND PLANE

Example

VABCD is a pyramid, with VA= VB=VC=VD=5cm and ABCD a square of side 4cm. Find the angle between VA and ABCD.

Solution

-Drop a perpendicular from V to ABCD. This meets ABCD at x, the centre of the square. So the projection of VA on ABCD is AX . The angle we want is <VAX.

By Pythagoras theorem in ΔABC

EXERCISE 3.3B

1) ABCDEFGH is a cube with a side of 4cm. Find the angle between the line AG and the face ABCD
2) VABCD is a pyramid with a rectangular base ABCD. AB=20M, AD=30M and VA=VB=VC=VD=25M. Find the angle between VA and ABCD

ANGLE BETWEEN TWO PLANES

Example
The diagram show a cube ABCDEFGH of side 10cm. Find the angles between

a) a) ABCD and ABGH F G
b) b) FHA and FHDB

Solution

A) a)The planes meet in the line AB.

-AD is a line in ABCD which is perpendicular to AB.

-AH is a line in ABGH which is perpendicular to AB. So the angle we want is the angle between AD and AH Which is < DAH.

b). The planes meet in the line FH.

Let x be the midpoint of FH, and let p be the midpoint of BD

-Then XA is a line in FHA which is perpendicular to FH.XP is a line FHDB which is perpendicular to FH

-So the angle we want is the angle between XA and XP, which is <AXP.

-XP is the height of the cube: which is 10cm.

-AP is half the diagonal of ABCD ie

EXERCISE 3.3C

The diagram show a pyramid VABCD in which ABCD is a square of side 20m, and VA= VB=VC=VD=15m

Find the angles between the planes

a) VAB and ABCD
b) VAB and VCD
2) A prism has length 8cm, and its cross- section is an equilateral triangle of side 5cm. Find angles between the planes.
a) ADEB and BEFC
b) AEF ad BEFC

SURFACE AREA OF THREE-DIMENSIONAL FIGURES

Consider the diagram which shows a cube of 5cm . It has 6 faces, which are squares of side 5cm. So the total surface area is

Consider the diagram which show a cuboid which is a cm by b cm by c cm. It has 6 faces which are rectangles: two are a cm by b cm, two are b cm by c cm and two are c cm by a cm. so its total surface area is

=(a cm × b cm)×2+ (b cm × c cm) x 2 + (a cm× c cm)×2

=2ab cm2 + 2bc cm2+2ac cm2

=(2ab+2bc+2ac)cm²

Example 1:

Find the surface area of a cuboid which is 12cm by 10cm by 8cm.

Solution:

Given:

a = 12cm, b = 10cm and c = 8cm

Formula = (2ab+2bc)cm²

=(2×12×10)+(2×10×8)+(2×12×8)

= 240 + 160 = 192

= 592

The surface area is 592cm²

EXERCISE 3.4A

1. A tea crate has a square base of side 0.8m, and its height is 1.1m. Find the surface area of the crate.
2. A room is 5.2m long, 2.5m high and 4.5m wide. Find the surface area of the wall and the wiling.

CYLINDER

The diagram show a cylinder, which has height him and top radius r cm.

– – The surface of a cylinder consists of a circular top and bottom, and curved side.

– -Imagine cutting the cylinder down the side, and unfolding it. The curved side becomes a rectangle, with height h and width the circumference of the cylinder.

Example

Find the curved surface area of a cylinder which is 6cm high and with radius 4cm.

EXERCISE 3.4 B

A tin of shoe polish is 2cm high and 4cm in radius. Find its surface area.
A paint roller is a cylinder which is 15cm long and with radius 3cm. Find the area of wall it can cover in one revolution

PRISMS

– Recall that a prism is a solid with a constant cross section

– In many cases the cross-section is a triangle.

– The surface of a prism consists of the two cross-sections and the sides. In particular, the surface of a triangular and the sides. In particular, the surface of a triangular prism consists of two triangles and three rectangles.

Example

A prism has a cross-section which is a triangle with sides 5cm, 12cm and and 13cm. Its length is 10cm. Find Its surface area

Solution.

-The surface consists of:

. Two triangles of side 5,12and 13
. Three rectangles: 5, by 10, 12 by 10 and 13 by 10

Note:

The two triangles are right angled.

– The area of each triangle is

The areas of the rectangle are: Formula=l ×w

=(50×10)+ (12×10) =(13×10)

=50 +120+130

=300cm²

-Total area =(2×30)+300

=60+300

=360cm²

The surface area is 360cm²

EXERCISE 3.4C

Find the surface area of the prisms shown below

2.The cross-section of a prism is a regular pentagon of side 8cm. The prism is 30cm long. Find the surface area of the prism.

PYRAMIDS

The surface area of a pyramid is the sum of the base area and the area of the triangular sides. Sometimes you need to use Pythagoras’ theorem to find the area of the sides. The following example shows the method.

Example

A pyramid has a square base of side 10cm and height 15cm.

– Take a line from the vertex V to the middle of one of the sides of the base. The vertical rise of this line is 15cm.

– The horizontal run of this line is

– Hence the length of the line is

Exercise 3.4 D
1. A pyramid has a square base of side 10cm and height 12cm. Find the surface area of its triangular faces.
2. A pyramid has a rectangular base which is 40cm by 60cm. Its vertex is 20cm above the centre of the base. Find the total surface area of the pyramid.

CONES

-The height h, of a cone is its perpendicular height. It is not the length of the slanting edge.

-The length of the slanting edge, l is given by Pythagoras’ theorem.

-Imagine cutting along the side of the cone unfolding. You would get a sector of a circle. The radius of this circle is l and the arc length is the circumference of the cone base, 2πr. Hence the area of the curved side, which is the area of this sector, is the area of the circle, πl²

πL² Is reduce in the ratio of the circumference of the cone base and the complete circle

∴ The total area of the cone is

πr² + πrl = πr(r+L)

Example

A cone has base radius 4cm and height 3cm . Find its curved surface area.

Solution

The slant height l is l is given by

EXERCISE 3.4E

Find the surface area of these cones.

a) a) With base radius 5cm and height 12cm.
b) b) With base radius 7m and height24m

2.The base radius of a cone is c cm and its surface area is 160 cm2. Find its slant height and hence find its height.

SPHERES

-A sphere is a round solid, like a ball.

If the sphere has radius r, then its surface area A is

A = 4π²

Example

Find the surface area of sphere of radius 0.46m

Solution

Given,

Radius r = 0.46

Area = 4π²

= 4× π(46)²

= 2.660

∴ The surface area is 2.66m2

EXERCISE 3.4F

Find the radio of the spheres with area
a) a) 64πcm b) 0.44m²
A sphere has surface area 48cm2. Find its radius

VOLUMES OF THREE – DIMENSIONAL FIGURES

PRISMS

Recall that a prism is a solid with a constant cross-section.

If the area of cross –section is A and the height is h, then the volume is

V=Ah

– The cuboid and the cylinder are examples of prisms. The volume of a cuboid is given by

V = lbh (The cross –section is a circle)

– The volume of a cylinder is given by

V= π^r h (The cross –section is a circle)

– For both of these solids, the volume is given by

V= Ah, where A is the area of cross-section.

Example
The cross-section of a right angled prism is a triangle for which the shorter are 5cm and 6cm . The prism is 20cm long . Find its volume

Solution:

– Now multiply by the height

Volume = 20×15

= 300

∴ There volume is 300cm³

EXERCISE 3.5.A

1. The cross-section of a prism is a regular hexagen with side 0.8m. The prime is 1.6 long. Find the volume of the prism.
2. The cross-section of a prism is a right angled triangle with sides 12cm, 9cm and 15cm, and with height 25cm. Find the volume of the prism.

PYRAMIDS AND CONES

– The pyramid tapers to a point from a base, which is usually a rectangle.

– The cone tapers to a point from a base, which is a circle.

– For both these solids, the volume is a third that of the corresponding prism with the same base. The volume of a pyramid is a third of the corresponding cuboid

∴ The volume of a cone is a third that of the corresponding cylinder

Example

A pyramid has a square base. Its height is 7cm and its volume is 56cm³. Find the side of the base.

Solution

– Suppose the side of the base is x2 cm²

– Formula for the volume of a pyramid

∴ The side of the base is 4.9cm

EXERCISE 3.5.B

1. A pyramid has a square base of side 10cm and volume 500cm³. Find its height.
2. A cone has height 12cm and volume 50cm³. Find its base radius.

SPHERES

If a sphere has radius r, then its volume is

Example 1:

A sphere has radius 8.7cm. Find its volume.

Solution

Apply the formula

∴ The volume is 2760cm³

Example 2.

A sphere has volume 100cm³. Find its radius

Solution

∴ The radius is 2.88m

EXERCISE 3.5C

1. A sphere has volume 1.6m3
a) Find its radius.
b) Find its surface area.
2. A sphere has surface area 56cm2
a) Find its radius
b) Find its volume

SOLUTIONS

EXERCISE 3.1.A

a) EFGH b) HDCG c) AD d)EA
a) GCDH and GCBF b)FG,FE and FB

EXERCISE 3.1 B

a) A Match box b) A die
a)Cuboid b) Sphere c) Cylinder d)Cone

EXERCISE 3.2A

1. a)

2. a) A pyramid
b) A prism

EXERCISE 3.3A

a) ABCD and BCGF
b) AB and DC
c) EC and AG
d) EB and FC

EXERCISE 3.3.B

∴ The angle between the line AG and the face ABCD is 35.3⁰

2. Given

AB=20M, AD=30m and VA =VB=VC=VD=25m

∴ The angle between V A and ABCD is 43.9⁰

EXERCISE 3.3C

Given

– A square base of side 20m

– VA = =VC=VD =15M

– Angle between the planes VAB and ABCD = ?

∴ The angle between the planes VAB and ABCD is 48.19⁰

Given

– Length of the prism 8cm

– Side of the triangle 5cm

– Angle between the planes ADEB and BEFC =?

∴ The angle between the planes ADEB and BEFC is 60⁰

EXERCISE 3.4A

Given
A square base of side 0.8m and height 1.1m

Formula = Base area = (0.8×0.8)×2

= 0.64 ×2

= 1.28

Then other areas

= (0.8 ×1.1) ×4=3.52

– The total area = 1.28 + 3.52=4.8

∴ The surface area of the crate 4.8m²

Given

– A room with length = 5.2m, height=2.5m and width= 4.5m

-The area of the wall = length × width

= 5.2 × 4.5

= 23.4 m²

– The area of the wall =(height × length) ×2 + (height ×width)×2

= (2.5×5.2)x2 + (2.5×4.5 )×2

= 26+22.5

= 48.5m²

– The total area = 23.4m² + 48.5m

= 71.9m²

∴ The surface are of the wall and the wiling is 71.9m²

EXERCISE 3.4B

1. Given

– Height = 2cm

– Radius = 4cm

– Formula = 2 πr (r+h)

= 2 π×4(4+2)

= 8π×6

= 48π

=150.72

∴The surface area is 151cm²

Given

Length =15cm

Radius=3cm

Area of the wall = length × width

Area of the wall = 2πr ×L

=2×π×3×15

= 90π

= 282.6cm²

EXERCISE 3.4C

a)surface area of the prisms=

– Base area = Rectangle=L×W

-The area of rectangle are

=(21×40) + (29×40)

=840 ×1,160 +800

=2,800cm²

But the prism have 2 triangles

210×2 = 420cm²

-The total area is 2,8000+420=3,220

The surface area of the prism is 3,220cm²

Given

Side = 8cm

Length=30cm

-A regular pentagon has 5 sides

-Area of a regular pentagon has 5 rectangles which are equal.

– The area of rectangles are

Formula = L×n

= (30×8)×5

=240×5

=1,200cm²

Base area

–

– For base areas, that is top and bottom area there are 10 triangles.

– Therefore 22.0224×10=220.224 = 220

Hence

The total area = 1,200 + 220 = 1,420cm²

∴ The surface area of the prism is 1420cm²

EXERCISE 3.4 D

Given

-A square base of side = 10cm and height is 12cm. the base area =5×5=5⁰

=10×10

=100²

– Total are of all triangles 65cm²× 4 = 260cm²

∴ The surface area of triangular faces is 260cm²

EXERCISE 3.4

a) Formula for surface area of a cone = πr(r×L

Given

X=5cm and h=12cm

-The slant height L is given by:

∴ The surface area is 283cm²

Given

r= 6cm

Area =160cm²

L=?

EXERCISE 3.4F

∴ The radii are a) 4cm b) 2.35cm.

EXERCISE 3.5 A

Given

Side of the regular hexagon =0.8m

Length = 1.6

Volume = Area × height

– The area of cross –section

N=6

– Sum of Interior angle =(n-2)×180⁰

= 4 ×180⁰ = 72⁰

– Since in hexagon there are 6 triangles

– The area of all triangles =0.277×6

=1.662m²

– Volume = Area × height

=1.662×1.6

=2.66m³

∴ The volume of the prism is 2.66m³

EXERCISE 3.5B

1.
∴ Its height is 5cm

EXERCISE 3.5 C

1. Given:
volume = 1.6m³

surface area of a sphere = 4πr²
= 4 x π x (0.726)²
= 2.108304 x 3.14
= 6.6m²
surface area of a sphere is 6.6m²

2. Given
Area = 56cm²
surface area of a sphere = 4πr²

∴ a) Radius is 2.11cm
b) volume is 39.3 cm³

Form 4 Mathematics – THREE-DIMENSIONAL FIGURES

THREE-DEMENSIONAL FIGURES

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