[color=#b20ea8][b]Surface Area of a Right Cylinder:[/b][/color][br][br]The surface area of an object is the number of square units needed to cover all of the surfaces of that object. Let's pull this cylinder apart to see what surfaces we need to cover![br][br]Pull the slider along the top from left to right to pull the surfaces of our cylinder apart. After you pull the surfaces completely apart, use the results to answer the questions below.
[b]Question 1:[/b][color=#ff7700] [b]What shapes are surfaces of our right cylinder?[/b][/color]
[color=#b20ea8][b]Question 2:[/b] [/color][color=#ff7700][b]By pulling this right cylinder apart, have we changed the amount of square units needed to cover these faces?[/b][/color]
[color=#b20ea8][b]Question 3:[/b][/color] [b][color=#ff7700]How are the area of the "net" we end up with on the left and the surface area of our original cylinder related?[/color][/b]
[color=#b20ea8][b]Question 4:[/b] [/color][b][color=#ff7700]How could we compute the length of the purple edge of our rectangle? (Hint: look at the "other" purple edge in the picture)[/color][/b][br][color=#b20ea8][b][br][/b][/color]
[color=#b20ea8][b][br]Question 5:[/b][/color] [b][color=#ff7700]Describe a plan for finding the surface area of our right cylinder.[/color][/b]
[b][color=#674ea7]Question 6: [/color][color=#ff7700]Given a cylinder with height 5 units and radius 2 units , as shown in the applet, what is its total surface area.[/color][/b] (use [math]\pi[/math]=[math]\frac{22}{7}[/math])
[b][color=#674ea7]Question 7: [/color][color=#ff7700]Given a cylinder with height H units and radius R units , what is its total surface area?[/color][/b]