Category : 10th Class
Mensuration
We are familiar with some of the basic solids like cuboid/ cone, cylinder and sphere. In this chapter we will discuss about how to find the surface area and volume of these figures. In our daily life, we come across number of solids made up of combinations of two or more of the basic solids.
Surface Area of Solids
We may get the solids which may be combinations of cylinder and cone or cylinder and hemisphere or cone and hemisphere and so on. In such cases we find the surface area of each part separately and add them to get the surface area of entire solid.
Cylinder
If 'r' is the radius and 'h1 is the height of a cylinder, then
Curved surface area of the cylinder = \[2\pi rh\]
Total surface area of the cylinder = \[2\pi r(r+h)\]
Cone
If 'r' be the radius and 'h' be the height of a cone, then
Curved surface area of the cone = \[\pi rl\]
Total surface area of the cone = \[\pi r(r+l)\]
Where, I is the slant height of the cone and is given by \[l=\sqrt{{{r}^{2}}+{{h}^{2}}}\]
Sphere
If 'r' be the radius of a sphere, then Surface area of the sphere \[4\pi {{r}^{2}}\]
Hemisphere
If 'r' be the radius of a hemisphere, then
Curved surface area of the hemisphere = \[2\pi {{r}^{2}}\]
Total Surface area of the hemisphere =\[3\pi {{r}^{2}}\]
Volume of Solids
The volume of the combined figures is obtained by finding the volume of each part separately and then adding them together.
Cylinder
If 'r' be the radius and 'h' be the height of a cylinder, then
Volume of the cylinder = \[\pi {{r}^{2}}h\]
Cone
If 'r' be the radius and 'h' be the height of a cone, then
Volume of the cone =\[\frac{1}{3}\pi {{r}^{2}}h\]
Sphere
If 'r' be the radius of a sphere, then
Volume of a the sphere = \[\frac{4}{3}\pi {{r}^{2}}h\]
Hemisphere
If 'r' be the radius of a hemisphere, then
Volume of the hemisphere = \[\frac{2}{3}\pi {{r}^{2}}h\]
A toy is in the form of a cone of radius 77 cm and height 36 cm. Find the area of the cardboard required to make the toy.
(a) 18720\[c{{m}^{2}}\] (b) 20570\[c{{m}^{2}}\]
(c) 21426\[c{{m}^{2}}\] (d) 22480\[c{{m}^{2}}\]
(e) None of these
Ans. (b)
Explanation: Area of the cardboard required = curved surface area of the toy = \[\pi rl\]
Here, \[I{{=}^{+}}\sqrt{{{r}^{2}}+{{h}^{2}}}=\sqrt{{{77}^{2}}+{{36}^{2}}}=85\]
\[\therefore ~Curve\text{ }surface\text{ }area\text{ }=\text{ }\frac{22}{7}\text{ }\times \text{ }77\text{ }\times \text{ }85\text{ }=\text{ }22\text{ }\times \text{ }11\text{ }\times \text{ }85\text{ }=\text{ }20570\text{ }c{{m}^{2}}\]
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