12 2 and 12 3
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Transcript of 12 2 and 12 3
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122 Pyramids
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REVIEW Right PrismLateral Area of a Right Prism (LA) = ph Surface Area (SA) = ph + 2B
= [Lateral Area + 2 (area of the base)]
Volume of a Right Prism (V )= Bh
h
hhTriangular Right Prism
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Examples:
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perimeter of base = 2(5) + 2(4) = 18
B = 5 x 4 = 20
L. A.= 18 x 8 = 144 S.A. = 144 + 2(20) = 184 V = 20 x 8 = 160
h = 8
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perimeter of base = 6 + 5 + 8 = 19
L. A. = 19 x 4 = 76
B = ½ (6)(4) = 12
S. A. = 76 + 2(12) = 100 V = 12 x 4 = 48
h = 4
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Regular Pyramids A regular pyramid has a base which is always a regular polygon.• The lateral faces all intersect at a point called the vertex and form triangles. • The altitude is a segment from the vertex perpendicular to the base. • The slant height is the height of a lateral face.
Lateral side
vertex
altitude
Slant heightBase
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Regular Pyramid( p = perimeter of the base, l = slant height,
B = base area)
Lateral area = ½ (8)(26) = 104
Perimeter = (2 x 7) + (2 x 6) = 26Slant height l = 8 ; Height h = 5
The lateral area of a regular pyramid (L.A.)= ½ lpSurface area of a regular pyramid (S.A.) = ½ lp + BThe volume of a right pyramid (V)= ⅓ Bh
Area of base = 7 x 6 = 42Surface area = 104 + 42 = 146 Volume = ⅓ (42)(5) = 70
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Example:
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Prism and Pyramids Formulas• Prisms:• Lateral Area: L.A. = ph (p = perimeter, h = height)• Surface Area: S.A. = ph + 2B (B = area of base) • Volume: V = Bh
• Pyramids:• Lateral Area: L.A. = ½ lp (p = perimeter, l = slant height)• Surface Area: S.A. = ½ lp + B (B = area of base)• Volume: V = ⅓ Bh ( B = area of base, h = height)
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123 Cylinders and Cones
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(There is actually nothing new to learn here...)
• REVIEW Prisms:• Lateral Area: L.A. = ph • Surface Area: S.A. = ph + 2B • Volume: V = Bh
• NEW Cylinder:• Lateral Area: L.A. = ph • Surface Area: S.A. = ph + 2B • Volume: V = Bh
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(There is actually nothing new to learn here...)
• REVIEW Pyramids:• Lateral Area: L.A. = ½ lp Surface Area: S.A. = ½ lp + B Volume: V = ⅓ Bh
• NEW Cones:• Lateral Area: L.A. = ½ lp Surface Area: S.A. = ½ lp + B Volume: V = ⅓ Bh
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SPICSA
• P 485 210 even• P 492 216 even
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