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This material is made freely available at www.njctl.org and is intended for the non-commercial use of students and teachers. These materials may not be used for any commercial purpose without the written permission of the owners. NJCTL maintains its website for the convenience of teachers who wish to make their work available to other teachers, participate in a virtual professional learning community, and/or provide access to course materials to parents, students and others.
Click to go to website: www.njctl.org
New Jersey Center for Teaching and Learning
Progressive Mathematics Initiative
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Surface Area&
Volume
www.njctl.org
March 7, 2012
Slide 3 / 219
Table of Contents1. Drawing 3-D Figures2. Surface v. Solid 3. Right v. Oblique
4. Nets
5. Views
6. Surface Area of a Prism
7. Surface Area of a Cylinder
8. Surface Area of a Pyramid
9. Surface Area of a Cone
10. Spheres
11. Surface Area of a Sphere
Click on the topic to go to that section
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Y
X
Z
height
height
Y
X
3-dimensional drawings include the x, y and z-axis.
The z-axis is the third dimension.
The third dimension is the height of the figure
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To give a figure more of a 3-dimensional, lines that are not visible from the angle the figure is being viewed are drawn as dashed line segments. These are called hidden lines.
Y
X
Z
height
height
Slide 12 / 219
The 3-Dimensional Figures discussed in this unit are:
PrismsPyramidsCylinders
ConesSpheres
Slide 13 / 219
Prisms have 2 congruent polygon bases. The sides of a base are called base edges.The segments connecting corresponding vertices are lateral edges. A
B
C
XY
Z
In this diagram:There are 2 bases: ABC & XYZ.
There are 6 base edges: AB, BC, AC, XY, YZ, & XZ.
There are 3 lateral edges: AX, BY, & CZ.
This prism has a total of 9 edges.
Slide 14 / 219
The polygons that make up the surface of the figure are called faces. The bases are a type of face and are parallel and congruent to each other. The lateral edges are the sides of the lateral faces. A
B
C
XY
Z
In this diagram:There are 2 bases: ABC & XYZ.
There are 6 base edges: AB, BC, AC, XY, YZ, & XZ.
There are 3 lateral edges: AX, BY, & CZ.
This prism has a total of 9 edges.
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4 Chooses all of the bases.
A AFSM
B FERS
C EDQR
D ABCDEF
E CDQP
F BCPN
G MNPQRS
H ABNM
A B CD
EF
M
N PQ
RS
Slide 19 / 219
5 Chooses all of the lateral faces.
A AFSM
B FERS
C EDQR
D ABCDEF
E CDQP
F BCPN
G MNPQRS
H ABNM
A B CD
EF
M
N PQ
RS
Slide 20 / 219
6 Chooses all of the faces.
A AFSM
B FERS
C EDQR
D ABCDEF
E CDQP
F BCPN
G MNPQRS
H ABNM
A B CD
EF
M
N PQ
RS
Slide 21 / 219
A pyramid has 1 base and the lateral edges go to a single point. This point is called the vertex.
A
M
N PQ
RS
This pyramid has: 6 lateral edges, 6 base edges, 12 edges (total)
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A pyramid is faces that are polygons. 1 base and triangles that are the lateral faces.
A
M
N PQ
RS
This pyramid has: 6 lateral faces, 1 base, 7 faces (total)
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A cone, like a pyramid, has one base which is a circle.
. N
V
is thebase of the cone.
V is the vertex of the cone.
Slide 31 / 219
A sphere is a 3-dimensional circle in that every point on the sphere is the same distance from
the center.
. C
Slide 34 / 219
15 Which shape has more base edges than lateral edges?
A Prism
B Pyramid
C Cylinder
D Cone
E Sphere
Slide 37 / 219
Surfaces and Solids are 3-dimensional figures.
A surface is the shell of a figure.
A solid is a filled figure.
In drawings, a solid is shaded so you cannot see
through it.
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A cross-section is the locus of points of the intersection of a plane and a space figure.
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Think about as if the plane were a knife and you were cutting the shape, what would the cut look like?
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Cross-sections of a surface are a 2-dimensional figure.
Cross-sections of a solid are a 2-dimensional figure and its interior.
(The top can be removed to see the cross section.)
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21 What is the locus of points (cross-section) of a cube and a plane perpendicular to the base and parallel to the non-intersecting sides?
A square
B rectangle
C trapezoid
D hexagon
E rhombus
F parallelogram
G triangle
H circle
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22 What is the locus of points of a cube and a plane that contains the diagonal of the base and is perpendicular to the base?
A square
B rectangle
C trapezoid
D hexagon
E rhombus
F parallelogram
G triangle
H circle
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23 What is the locus of points of a cube and a plane that contains the diagonal of the base but does not intersect the opposite base?
A square
B rectangle
C trapezoid
D hexagon
E rhombus
F parallelogram
G triangle
H circle
Slide 48 / 219
24 What is the locus of points of a cube and a plane that intersects all of the faces?
A square
B rectangle
C trapezoid
D hexagon
E rhombus
F parallelogram
G triangle
H circle
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25 Choose all of the following that have cross-sections that consist of a 2-dimensional shape and its interior.
A a brick
B a balloon
C an empty soda can
D a stick of butter
E a wrapping paper tube
F a baseball
G a straw
H a book
Slide 53 / 219
Right Cylinder Oblique Cylinder
How can a right prism or cylinder be distinguished from an oblique figure?
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Right Hexagonal Pyramid Oblique Hexagonal Pyramid
A right pyramid with a regular polygon for the base is called a regular pyramid. So this surface could also be called a regular hexagonal pyramid.
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Right Cone Oblique Cone
How can a right pyramid or cone be distinguished from an oblique figure?
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Right Triangular Prism Oblique Triangular Prism
What shape is each lateral face?
What shape is each lateral face?
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Naming a Figure
Rightor
Oblique
Shapeof
Base
Pyramidor
Prism
Solidor
Surface
Since cones and cylinders always circles as bases:
Rightor
Oblique
Solidor
Surface
Cylinderor
ConeA sphere is neither right or oblique:
Solidor
Surface
Spherical
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Right
Oblique
Triangular
Square
Rectangle
Pentagonal
Hexagonal
CylinderConePyramidPrism
Solid
Surface
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Right
Oblique
Triangular
Square
Rectangle
Pentagonal
Hexagonal
CylinderConePyramidPrism
Solid
Surface
Slide 60 / 219
Right
Oblique
Triangular
Square
Rectangle
Pentagonal
Hexagonal
CylinderConePyramidPrism
Solid
Surface
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Right
Oblique
Triangular
Square
Rectangle
Pentagonal
Hexagonal
CylinderConePyramidPrism
Solid
Surface
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Right
Oblique
Triangular
Square
Rectangle
Pentagonal
Hexagonal
CylinderConePyramidPrism
Solid
Surface
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A Net is a 2-dimensional shape that folds into a 3-dimensional figure.
The Net shows all of the faces of the surface.
Net
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The net shown is a right triangular prism. The lateral faces are rectangles. The bases are on opposite sides of the rectangles, although they do not need to be on the same rectangle.
Net
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Net
This is a right square pyramid. Another name for it is pentahedron.Hedron is a suffice that means face.Why is this a pentahedron?
Slide 70 / 219
radius
The net of a right cylinder is two circles and a rectangle that forms the lateral surface.
88
x
What is the length of x?
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Net
The lateral region is a circle with a sector missing. The bigger the slice missing will have what effect on the the cone?
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A view is another type of 2 dimensional drawing of a 3 dimensional drawing.
The drawing depends on your position relative to the figure.
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Consider these three people viewing a pyramid:
The orange person is standing in front of a face, so their view is a triangle.
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Consider these three people viewing a pyramid:
The green person is standing in front of a lateral edge, so from their view they can see 2 faces.
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Consider these three people viewing a pyramid:
The purple person is flying over and can see the four lateral faces.
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31 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (front)
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32 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (above)
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33 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (above)
right square prism
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34 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (front)
right square prism
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35 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (front)
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36 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (above)
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37 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (above)
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38 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A (front)
Slide 91 / 219
39 Given the surface shown, what would be the view from point A?
A a Rectangle
B a Square
C a Circle
D A Pentagon
E A Triangle
F a Parallelogram
G a Hexagon
H A Trapezoid
A
sphere
Slide 93 / 219
A
What would the view be like from each
position?
From A, how many columns of blocks are visible? How tall is each column?
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B
What would the view be like from each
position?
From B, how many columns of blocks are visible? How tall is each column?
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C(Looking down from above)
What would the view be like from each
position?
From C, how many piles of blocks are visible?
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Here are 3 views of a solid, draw a 3-dimensional representation.
Top FrontLeft
Move for Answer
L R
F
Slide 99 / 219
Here are 3 views of a solid, draw a 3-dimensional representation.
Top
Left FrontF
L R
Move for Answer
Slide 102 / 219
Base
Baseheight
Base
height
Base
A prism has 2 Bases
The Base of a Rectangular Prism is a Rectangle
The Height of the prism is the length between the two Bases
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The Surface Area of a figure is the total amount of Area that is needed to cover the entire figure
Area
Area
Area
Area
AreaArea
Top Area
Side Area
Front AreaBottom Area
Back Area
Side Area
The Surface Area of a figure is the sum of the areas of each side of the figure
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Finding the Surface Area of a Rectangular Prism
h
Lw
Area of the Top = L x w
Area of the Bottom = L x w
Area of the Front = L x h
Area of the Back = L x h
Area of Left Side = w x h
Area of Right Side = w x h
The Surface Area is the sum of all the areas
S.A. = Lw + Lw + Lh + Lh + wh + wh
S.A. = 2Lw + 2Lh + 2 wh
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Example: Find the surface area of the prism
74
3
Area of Top
Area of Bottom
Area of Right Side
Area of Left Side
Area of Front
Area of Back
A=7(4) = 28u2
A=7(4) = 28u2
A=3(4) = 12 u2
A=3(4) = 12 u2
A=3(7) = 21 u2
A=3(7) = 21 u2
Total Surface Area = 28 + 28 +12 +12 + 21 + 21 = 122 u2
Slide 114 / 219
48 Troy wants to build a cube out of straws. The cube is to have a total surface area of 96 in2, what is the total length of the straws, in inches?
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S.A. = 2B + PH
The Surface Area is the sum of the areas of the 2 Bases plus the Lateral Area (PH)
The Lateral Area is the area of the Lateral Surface. The Lateral Surface is the part that wraps around the middle of the figure (in between the two bases).
Another Way of Looking at Surface Area
Lateral Surface
Base
Base
Base
Base
Slide 116 / 219
Base
Base
height
Lw
h
Another formula for Surface Area of a right prism: S.A. = 2B + PH
B = Area of the base B = Lw P = Perimeter of the base P = 2L + 2w H = Height of the prism
S.A. = 2B + PH
S.A. = 2Lw + (2L +2w)H
S.A. = 2Lw + 2LH + 2wH
Slide 117 / 219
Base
Base
height
Lw
h
Another formula for Surface Area of a right prism : S.A. = 2B + PH
B = Area of the base B = Lw P = Perimeter of the base P = 2L + 2w H = Height of the prism
In the surface area formula, 2B is the sum of the area of the 2 bases.
What does PH represent? The area of lateral faces or Lateral Area
Slide 118 / 219
49 The surface area of the rectangular prism is :
A 24 sq ftB 144 sq ftC 288 sq ft
D 48 sq ftE 72 sq ft
12 ft6 ft
4 ft
Slide 119 / 219
50 If the base of the prism is 12 by 6, what is the lateral area, in sq ft?
12 ft6 ft
4 ft
Slide 123 / 219
54 What is the value of the missing variable if the surface area is 350 sq. ft.
A 7 ft
B 15 ft
C 17 ft
D 12 ft
X ft
5 ft
10 ft
Slide 125 / 219
base
base height
base
base height
base
base
height
basebase
height
A Prism has 2 Bases
The Base of a Triangular Prism is a Triangle
The Height of the Prism is the length between the two Triangular Bases
Slide 126 / 219
The Surface Area of a figure is the total amount of Area that is needed to cover the entire figure
The Surface Area of a figure is the sum of the areas of each side of the figure
Area AreaArea
Area
Area
Area AreaArea
Area Area
Slide 127 / 219
Finding the Surface Area of a Right Triangular PrismSurface Area : S.A. = 2B + PH
B = Area of the triangular base = ½bh P = Perimeter of the triangular base = a + b + c H = Height of the prism = H
Lateral Area = PH = (a + b + c)H
The Lateral Area is the area of the Lateral Surface, the rectangular area that wraps around the prism between the triangular bases.
base
basePrism's heighta
b
c
H
P = a + b + c
ac
bc a
Lateral Surface
h
b
B = 1/2 bh
H
Slide 128 / 219
Finding the Surface Area of a Right Triangular PrismSurface Area : S.A. = 2B + PH
B = Area of the triangular base = ½bh P = Perimeter of the triangular base = a + b + c H = Height of the prism = H
Lateral Area = PH = (a + b + c)H
The formula for a right triangular prism is the same as the formula for a right rectangular. This formula will work for any right prism.
Slide 129 / 219
Example: Find the lateral area and surface area of the right triangular prism.
10
611
Slide 130 / 219
Example: Find the lateral area and surface area of the right triangular prism.
99
9
12
Slide 134 / 219
58 The height of the triangular prism below is 11 ft, the base height is 3 ft, and the triangular base is an isosceles triangle. Find the surface area.
A 88 sq ft
B 100 sq ft
C 112 sq ft
D 125 sq ft3 ft
5 ft11 ft
Slide 135 / 219
59 The height of the triangular prism below is 3, and the triangular base is an equilateral triangle. Find the surface area.
A 64 sq ft
B 127.43 sq ft
C 72 sq ft
D 55.43 sq ft 8 ft3 ft
Slide 136 / 219
60 The right triangular prism has a surface area of 150 sq ft. Find the height of the prism.
A 5 ft
B 6 ft
C 7.81 ft
D 6.38 ft
65
y
Slide 137 / 219
Example: Find the lateral area and surface area of the right prism.
Angles are right angles.
83
7
6
5
Slide 138 / 219
Example: Find the lateral area and surface area of the right prism.
The base is a regular hexagon.
8
11
Slide 139 / 219
61 Find the lateral area of the right prism.
4
4 32
10
9
All angles are right angles.
Slide 140 / 219
62 Find the total surface area of the right prism.
4
4 32
10
9
All angles are right angles.
Slide 141 / 219
63 Find the lateral area of the right prism.
The base is a regular pentagon.
6 ft
10 ft
Slide 142 / 219
64 Find the total surface area of the right prism.
The base is a regular pentagon.
6 ft
10 ft
Slide 146 / 219
base
base
heightbase
base
height
A prism has 2 Bases
The Base of a Cylinder is a Circle
The Height of the prism is the length between the two Circular Bases
Slide 147 / 219
The Surface Area of a figure is the total amount of Area that is needed to cover the entire figure
The Surface Area of a figure is the sum of the areas of each side of the figure
Area
Area
AreaArea
Area
Area
Slide 148 / 219
Finding the Surface Area of a Right CylinderSurface Area : S.A. = 2B + PH
B = Area of the circular base = πr2 C = Perimeter of the Circular base (Circumference) = 2πr H = Height of the prism = H
Lateral Area = CH = 2 π r H
The Lateral Area is the area of the Lateral Surface, the rectangular area that wraps around the prism between the circular bases.
Base
Base
height
Base
Base
heightLateral Surface
Slide 151 / 219
Example: Find the lateral area and surface area of the right cylinder.
Base Circumference is 16π ftHeight is 10 ft
Slide 153 / 219
66 Find the surface area of the right cylinder and round to two decimal places.
A 1200 sq in.
B 307.72 sq in.
C 835.24 sq in.
D 1670.48 sq in.
h = 12
r = 7
Slide 157 / 219
70 The surface area of the right cylinder is 653.12 sq in. Find the height of the cylinder.
A 7
B 8
C 5
D 6r = 8
h
Slide 160 / 219
Heightof theTriangle
Slant Height
The Pyramid has a square base and 4 triangular faces
The triangular faces are all isosceles triangles if its a right pyramid.
The Height of each triangular face is the Slant Height of the pyramid if it is a regular pyramid.
Surface Area = Sum of the Areas of all the sides
Slide 164 / 219
Example: Find the length of the slant height.
This is a regular hexagonal pyramid.
r=6lateral edge= 12
r
Slide 168 / 219
74 Find the value of the slant height.
r
r= 8lateral edge = 15
Regular Hexagonal Pyramid
Slide 169 / 219
75 Find the value of the slant height.
a
a= 9lateral edge = 12
Regular Hexagonal Pyramid
Slide 170 / 219
Finding the Surface Area of a Regular Pyramid
Square Base (B)
Slant Height (l )
Pyramid's Height (h)
Surface Area = B + ½Pl Lateral Area = ½Pl
l = Slant HeightP = Perimeter of BaseB = Area of Base
Slide 174 / 219
Example: Find the lateral area and the surface area of the pyramid.
a
a=4lateral edge= 8
Regular Pentagonal Pyramid
Slide 183 / 219
r
heightSlant Height l
Base
Lateral Surface
Slant Height l
The Base of the cone is a circle
The length of the circular portion of the Lateral Surface is the same as the Circumference of the Circlular Base.
The Slant Height is the length of the diagonal slant of the cone from the top to the edge of the base.
The Height of the cone is the length from the top to the center of the circular base.
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Base
Lateral Surface
Slant Height l
Surface Area = Area of the Base + Lateral AreaLateral Area= ½PlS.A. = B + ½Pl
l = Slant HeightP = Perimeter of Circular BaseB = Area of Circular Base
Because the base is a circle.
L.A. = πrl S.A. = πr2 + πrl
Finding the Surface Area of a Right Cone
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87 Find the length of the radius of the right cone if the lateral area is 50π units2?
Slide 193 / 219
89 Find the height of the right cone if the surface area is 45π units2 and the diameter of the base is 6 units?
Slide 194 / 219
90 The Department of Transportation keeps piles of road salt for snowy days. The conical shaped piles are 20 feet high and 30 feet across at the base. During the summer the piles are covered with tarps to prevent erosion. How many square feet of tarp is needed so that no part of the pile is exposed?
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Circle
The locus of points in a plane that are the same distance from a point called the center of the circle.
X
Y
Every point on the above circle is the same distance from the origin in the x, y plane.
Y
X
Slide 197 / 219
Sphere
The locus of points in space that are the same distance from a point.
Y
X
Z
Every point on the sphere above on the left side, is the same distance from the origin in space, the x, y, z plane.
X
Y
Y
X
Slide 198 / 219
Y
X
Z
The Great Circle of a sphere is found at the intersection of a plane and a sphere when the plane contains the center of the sphere.
Slide 199 / 219
Y
X
Z
Great Circles
Each of these planes intersects the sphere, and the plane contains the center of the sphere
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HemisphereThe Great Circle separates the Sphere into two equal halves at the center of the sphere.
Slide 202 / 219
Cross SectionsA Cross Section is found by the intersection of a plane and
a solid.
Cross - Section
(Click the top hemisphere to see the cross section.)
Slide 203 / 219
The farther the cross section of the sphere is taken from its center the smaller the circle.
.
Slide 204 / 219
Example: Find the radius of the cross section of the sphere with radius 8 if the cross section is 2 from the center.
82
Slide 205 / 219
Example: Find the radius of the cross section of the sphere with radius 8 if the cross section is 2 from the center.
82
Slide 206 / 219
Example: A cross section of a sphere is 4 units from the center of the sphere and has an area of 16π units2. What is area of the great circle?
Slide 207 / 219
91 What is the area of the cross section of a sphere that is 6 units from the center of the sphere if the sphere has radius 8 units?
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92 What is the area of the great circle if a cross section that is 3 from the center has a circumference of 10π?
Slide 209 / 219
93 The area of the great circle of a sphere is 12π units2 and a cross section has area 8π units2. How far is the cross section from the center?
Slide 212 / 219
r S.A. = 4πr2
Finding the Surface Area of the Sphere
Why is there no formula for lateral area?
Slide 215 / 219
Example: A cross section of a sphere has area 36π units2 and is 10 units from the center, what is surface area of the sphere?
Slide 217 / 219
95 What is the surface area of a sphere if a cross section 7 units from the center has an area of 50 units2?
Slide 218 / 219
96 The surface area of a sphere is 24 units. What is the area of a great circle of a congruent sphere?