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प्रश्न
A solid cylinder is melted and cast into a cone of same radius. The heights of the cone and cylinder are in the ratio
विकल्प
9 : 1
1 : 9
3 : 1
1 : 3
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उत्तर
Since the cylinder is re cast into a cone both their volumes should be equal.
So, let Volume of the cylinder = Volume of the cone
= V
It is also given that their base radii are the same.
So, let Radius of the cylinder = Radius of the cone
= r
Let the height of the cylinder and the cone be hcylinder and `h_"cone"` respectively.
The formula of the volume of a cone with base radius ‘r’ and vertical height ‘h’ is given as
Volume of cone = `1/3 pir^2h`
The formula of the volume of a cylinder with base radius ‘r’ and vertical height ‘h’ is given as
Volume of cylinder = `pir^2h`
So we have
`("Volume of cone" )/("Volume of cylinder") = (1/3pir^2h_"cone")/(pir^2h_"cylinder")`
`⇒ V/V =(1/3h_"cone")/(h_"cylinder")`
`⇒1=(1/3h_"cone")/(h_"cylinder")`
`(h_"cone " )/(h_"cylinder") = 3/1`
