3.5a: Surface Area of Prisms and Cylinders Primary M(G&M)–10–6 Solves problems involving perimeter, circumference, or area of two dimensional figures (including composite figures) or surface area or volume of three Secondary M(G&M)–10–2 Makes and defends conjectures, constructs geometric arguments, uses geometric properties, or uses theorems to solve problems involving angles, lines, polygons, circles, or right triangle ratios (sine, cosine, tangent) within mathematics or across disciplines or contexts (e.g., Pythagorean Theorem, Triangle Inequality Theorem) GSE’s
3.5a: Surface Area of Prisms and Cylinders
Jan 02, 2016
3.5a: Surface Area of Prisms and Cylinders. GSE’s. Primary. M(G&M)–10–6 Solves problems involving perimeter, circumference, or area of two dimensional figures (including composite figures) or surface area or volume of three. Secondary. - PowerPoint PPT Presentation
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3.5a: Surface Area of Prisms and Cylinders
Primary
M(G&M)–10–6 Solves problems involving perimeter, circumference, or area of two dimensional figures (including composite figures) or surface area or volume of three
SecondaryM(G&M)–10–2 Makes and defends conjectures, constructs geometric arguments, uses geometric properties, or uses theorems to solve problems involving angles, lines, polygons, circles, or right triangle ratios (sine, cosine, tangent) within mathematics or across disciplines or contexts (e.g., Pythagorean Theorem, Triangle Inequality Theorem)
GSE’s
3-D figures- Solid figures. When the sides are polygons, its called a polyhedron.
Prism: a 3-D solid with 1) 2 bases – which are parallel and congruent 2) lateral faces that are parallelograms
Base
Base (parallel & Congruent)
Altitude (height)- Distance between the bases
Lateral Face – parallel sides not the base
Lateral Edge
* names by the shape of their bases
Areas of the Solids
Lateral Area (LA) – the sum of the areas of the lateral faces only.
– Does not include the area of the bases.
Surface Area (SA) – the sum of the areas of ALL the faces.
– Lateral area + area of the bases
Ex: Find the lateral & surface areas of the triangular prism.
6 in
.
10 i
n. 59.15
60o
http://guilford.rps205.com/departments/Math/Links/Honors%20Geometry/Honors%20Geometry%20Power%20Points/12.2%20SA%20of%20Prisms%20&%20Cylinders.ppt#7
Find the Surface Area
Cylinders: 1) has 2 circular bases 2) bases are both parallel and congruent
Right cylinder – the axis is the same as the altitude
Oblique Cylinder-The axis is longer than the altitude
axisaltitude
Find the surface area and lateral area
Example
A right cylinder has a surface area of 400 square mm. Find the height of the cylinder if the diameter of the base of the cylinder is 10 mm.
example2
If the side of a cube is doubled, what happens to the surface area ?
Challenge
The Lateral Area of a right rectangular prism is 784 square cm.
Its length is three times its width.
Its height is twice its width.
Find the surface area.
A square with a side length of 8.0 cm is rolled up, without overlap, to form the lateral surface of a cylinder.
What is the radius of the cylinder to the nearest tenth of a centimeter?
Ex. 1 – Released Item from 2007 NECAP
Ex 2. Find the Surface Area
13 in
5 in
12 in
4 in
Describe the solid that is made from each of these nets.
Prism
Describe the solid that is made from each of these nets.
Cube
Describe the solid that is made from each of these nets.
Pyramid
Complete the following net of a cube
Now complete the net in a different way
Complete the cuboid (rectangular prism) net
Which one of these nets can be folded to make a cube?
Yes(but with overlap) No
Which one of these nets can be folded to make a cube?
YesNo
Complete the Net of this
Building
Scale: 1 square represents 1 m
PlanPlan
Homework
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