Tag: solids

Let $r$ and $l$ be base radius and slant height of cone.

For a cone, $l = \sqrt { { h }^{ 2 }+  {r}^{ 2 } } $ where h is the height. 
Hence, $l = \sqrt { { 28 }^{ 2 }+  {21}^{ 2 } } $

$ l = 35 $ cm 

Area of the canvas $ = $ Curved surface area of the conical tent
Since the canvas is rectangular in shape, its area is $=$ length $\times $ width
Curved surface area of a cone $= \pi rl$, where $r$ is the radius of the cone and $l$ is the slant height.
For a cone, $ l= \sqrt { { h }^{ 2 }+  {r}^{ 2 } } $, where $l$ is the slant height.

Hence, $ l = \sqrt { { 24 }^{ 2 }+  {7}^{ 2 } } $ 

$\Rightarrow  l = \sqrt {625} $

$ \Rightarrow l = 25 $ cm

Hence, length $ \times 5 =\displaystyle \frac { 22 }{ 7 } \times 7\times 25 $

Let the radius of the cone be $ 4a$ and slant height $ = 7a$ 

Curved surface area of a cone $= \pi rl$, where $r$ is the radius of the cone and $l$ is the slant height.
Hence, curved surface area of this cone, $ = \dfrac {22}{7} \times 56 \times l = 12320 $ 

$ \therefore l = 70  cm $

For a cone, $ l = \sqrt { { h }^{ 2 }+  {r}^{ 2 } } $, where $h$ is the height. 

Hence, $ 70 = \sqrt { { h }^{ 2 }+  {56}^{ 2 } } $ 

$\Rightarrow  4900 = { h }^{ 2 } + 3136 $

$\Rightarrow  { h }^{ 2 } = 1764 $

$ \Rightarrow  h = 42 $ cm

Given,

Area of sheet required to make a cap is the Curved surface area of a cone which is $= \pi rl$, where $r$ is the radius of the cone and $l$ is the slant height.

For a cone, $l = \sqrt { { h }^{ 2 }+  {r}^{ 2 } } $, where $h$ is the height. 

Hence, $ l = \sqrt { { 24 }^{ 2 }+  {7}^{ 2 } } $ 

$ \therefore l = 25 $ cm

Curved surface area of a cone $= \pi rl$, where $r$ is the radius of the cone and $l$ is the slant height.
Radius of the tomb $ = \dfrac {\text{Diameter}}{2} = 7  m $
Hence, CSA of this conical tomb , $ = \dfrac {22}{7} \times 7 \times 25 = 550$  sq. m.
Cost of white washing the tomb at Rs. $210$ per $100 {m}^{2} = \dfrac {210}{100} \times 550 =  $ Rs. $  1155 $

Given, $h = 14$ m and floor area $= 346.5$ $m^{ 2 }$
$\Rightarrow \pi { r }^{ 2 }=346.5\ \Rightarrow { r }^{ 2 }=346.5\times \dfrac { 7 }{ 22 } =110.25\ \Rightarrow r=10.5$
$\therefore$ $l=\sqrt { { r }^{ 2 }+{ h }^{ 2 } } =\sqrt { { \left( 10.5 \right)  }^{ 2 }+{ \left( 14 \right)  }^{ 2 } } =\sqrt { 110.25+196 } $
$=\sqrt { 306.25 } =17.5$ m
$\therefore$ curved surface area $=\pi rl$
$=\cfrac { 22 }{ 7 } \times 10.5\times 17.5=\cfrac { 4042.5 }{ 7 } { m }^{ 2 }$
Width of cloth $=1.1$ m
$\therefore$ length of cloth required $=\cfrac { \cfrac { 4042.5 }{ 7 }  }{ 1.1 } =\cfrac {4042.5 }{ 7.7 } = 525$ m
Hence, $525$ m length of canvas is required to build the conical tent.

The base of a cone is circular.