Cylinder – Surface Area – Worksheet

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Presentation transcript:

Cylinder – Surface Area – Worksheet The worksheet is provided in 2 sizes.

Printing To print handouts from slides - Select the slide from the left. Then click: File > Print > ‘Print Current Slide’ To print multiple slides - Click on a section title to highlight all those slides, or press ‘Ctrl’ at the same time as selecting slides to highlight more than one. Then click: File > Print > ‘Print Selection’ To print double-sided handouts - Highlight both slides before using ‘Print Selection’. Choose ‘Print on Both Sides’ and ‘Flip on Short Edge’.

Surface Area of a Cylinder Give all answers to 2 dp. 3. Draw the net of this cylinder. Label your drawing and calculate the surface area. 1. Start by labelling the lengths on the net. (Calculate the circumference of the circles.) 9 cm 8 cm 26 cm 12 cm Total Surface Area = ________________ Area of Rectangle = 4. Calculate the surface area of this cylinder. Area of Top = 29 cm Area of Bottom = 7 cm Total Surface Area = ________________ 26cm 2. 6 cm 5. A cylinder has a height of 15 cm and a circumference of 22 cm. What is the surface area of the cylinder? (Round the radius to 2 dp.) 14 cm 6. The surface area of this cylinder is 339.29 cm2. What is the height of the cylinder? Area of Rectangle = 6 cm Area of Top = Area of Bottom = Total Surface Area = ________________

Half Answers 301.59 cm2 50.27 cm2 50.27 cm2 402.12 cm2 263.89 cm2 Surface Area of a Cylinder Give all answers to 2 dp. 3. Draw the net of this cylinder. Label your drawing and calculate the surface area. 1. Start by labelling the lengths on the net. (Calculate the circumference of the circles.) Half Answers 9 cm 8 cm 26 cm 12 cm Total Surface Area = ________________ 301.59 cm2 Area of Rectangle = 4. Calculate the surface area of this cylinder. 50.27 cm2 Area of Top = 29 cm Area of Bottom = 50.27 cm2 402.12 cm2 7 cm Total Surface Area = ________________ 26cm 2. 6 cm 5. A cylinder has a height of 15 cm and a circumference of 22 cm. What is the surface area of the cylinder? (Round the radius to 2 dp.) 14 cm 6. The surface area of this cylinder is 339.29 cm2. What is the height of the cylinder? 263.89 cm2 Area of Rectangle = 28.27 cm2 6 cm Area of Top = 28.27 cm2 320.44 cm2 Area of Bottom = Total Surface Area = ________________

Surface Area of a Cylinder Give all answers to 2 dp. 3. Draw the net of this cylinder. Label your drawing and calculate the surface area. 1. Start by labelling the lengths on the net. (Calculate the circumference of the circles.) Answers 9 cm 8 cm 26 cm 12 cm 862.37 cm2 Total Surface Area = ________________ 301.59 cm2 Area of Rectangle = 4. Calculate the surface area of this cylinder. 50.27 cm2 Area of Top = 29 cm Area of Bottom = 50.27 cm2 402.12 cm2 7 cm Total Surface Area = ________________ 26cm 2. 945.62 cm2 6 cm 5. A cylinder has a height of 15 cm and a circumference of 22 cm. What is the surface area of the cylinder? (Round the radius to 2 dp.) 14 cm 406.84 cm2 6. The surface area of this cylinder is 339.29 cm2. What is the height of the cylinder? 263.89 cm2 Area of Rectangle = 28.27 cm2 6 cm Area of Top = 3.00 cm 28.27 cm2 320.44 cm2 Area of Bottom = Total Surface Area = ________________

Surface Area of a Cylinder Give all answers to 2 dp. 3. Draw the net of this cylinder. Label your drawing and calculate the surface area. 1. Start by labelling the lengths on the net. (Calculate the circumference of the circles.) 9 cm 8 cm 26 cm 12 cm Total Surface Area = ________________ Area of Rectangle = 4. Calculate the surface area of this cylinder. Area of Top = 29 cm Area of Bottom = 7 cm Total Surface Area = ________________ 26cm 2. 6 cm 5. A cylinder has a height of 15 cm and a circumference of 22 cm. What is the surface area of the cylinder? (Round the radius to 2 dp.) 14 cm 6. The surface area of this cylinder is 339.29 cm2. What is the height of the cylinder? Area of Rectangle = 6 cm Area of Top = Area of Bottom = Total Surface Area = ________________

tom@goteachmaths.co.uk Questions? Comments? Suggestions? …or have you found a mistake!? Any feedback would be appreciated . Please feel free to email: tom@goteachmaths.co.uk