This pdf shows how to find the surface area and volume of composite shapes step by step with examples for better explanation.
1. Composite Solids
2. Example Question 1 Composite Solids An aeronautical engineer designs a small component part made of copper, that is to be used in the manufacturer of an aircraft. The part consists of a cone that sits on top of a cylinder as shown in the diagram below. Find the volume of the part. (Leave your answer in terms of ). Volume of cone = 1/3 r2h = 1/3 x x 42 x 9 9 cm = 48 cm3 8 cm Vol/Cap Volume of cylinder = r2h = x 42 x 6 6 cm = 96 cm3 Total volume = 48 + 96 = 144 cm3
3. Example Question 2 Composite Solids The shape below is composed of a solid metal cylinder capped with a solid metal hemi-sphere as shown. Find the volume of the shape. (to 3 sig fig) Volume of hemi-sphere = 2/3 r3 = 2/3 x x 33 = 18 m3 6m Volume of cylinder = r2h 4m = x 32 x 4 = 36 m3 Total volume = 18 + 36 = 54 m3 = 170 m3
4. Example Question 3 Composite Solids The diagram below shows a design for a water tank. The water tank consists of a cylinder capped with a hemi-spherical dome. Find the capacity of the water tank. (Give your answer in litres to 2 sig fig). Capacity of hemi-sphere = 2/3 r3 = 2/3 x x 33 6m = 18 m3 Capacity of cylinder = r2h 5m = x 32 x 5 = 45 m3 1 000 1 000 000cm cm3 3 Total capacity = 18 + 45 = 63 m3 = 63 000 000 cm3 10 cm 100 cm 1 = 63 000 litres litre 10 100cm cm = 200 000 litres (2 sig fig) 10 cm 100 cm
5. Example Question 4 Composite Solids A solid shape is composed of a cylinder with a hemi-spherical 14 cm base and a conical top as shown in the diagram. Calculate the volume of the shape. (answer to 2 sig fig) Volume of cone = 1/3 x r2h = 1/3 x x 62 x 14 = 168 cm3 Volume of cylinder = r2h = x 62 x 40 40 cm = 1440 cm3 Volume of hemi-sphere = 2/3 r3 = 2/3 x x 63 = 144 cm3 12 cm Total volume = 168 + 1440 + 144 = 1752 cm3 = 5500 cm3
6. Question 1 Composite Solids An aeronautical engineer designs a small component part made of copper, that is to be used in the manufacturer of an aircraft. The part consists of a cone that sits on top of a cylinder as shown in the diagram below. Find the volume of the part. (Leave your answer in terms of ). Volume of cone = 1/3 r2h = 1/3 x x 52 x 12 12 cm = 100 cm3 Volume of cylinder = r2h 10 cm = x 52 x 6 6 cm = 150 cm3 Total volume = 100 + 150 = 250 cm3
7. Question 2 Composite Solids The shape below is composed of a solid metal cylinder capped with a solid metal hemi-sphere as shown. Find the volume of the shape. (to 2 sig fig) Volume of hemi-sphere = 2/3 r3 = 2/3 x x 93 = 486 cm3 18 cm Volume of cylinder = r2h 10 = x 92 x 10 cm = 810 m3 Total volume = 486 + 810 = 1296 cm3 = 4100 cm3
8. Question 3 Composite Solids The diagram below shows a design for a water tank. The water tank consists of a cylinder capped with a hemi-spherical dome. Find the capacity of the water tank. (Give your answer in litres to 3 sig fig). Capacity of hemi-sphere = 2/3 r3 = 2/3 x x 63 12 m = 144 m3 Capacity of cylinder = r2h 10m = x 62 x 10 = 360 m3 1 000 1 000 000cm cm3 3 Total capacity = 144 + 360 = 504 m3 = 504 000 000 cm3 10 cm 100 cm 1 = 504 000 litres litre = 1 580 000 litres (3 sig fig) 10 100cm cm 10 cm 100 cm
9. Question 4 Composite Solids A solid shape is composed of a cylinder with a hemi-spherical 9 cm base and a conical top as shown in the diagram. Calculate the volume of the shape. (answer to 2 sig fig) Volume of cone = 1/3 x r2h = 1/3 x x 32 x 9 = 27 cm3 Volume of cylinder = r2h 20 cm = x 32 x 20 = 180 cm3 Volume of hemi-sphere = 2/3 r3 = 2/3 x x 33 = 18 cm3 6 cm Total volume = 27 + 180 + 18 = 225 cm3 = 710 cm3
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