Question 2 :
If the height of cylinder is halved keeping the radius constant , its volume will be
Question 3 :
If the surface area of a cube is $384$ sq.m, then its volume is
Question 5 :
The radius and height of a cylinder are $7$ cm and $15$ cm respectively then its volume is
Question 6 :
The circumference of the base of the of a cylinder is 12 m and its height is$\displaystyle \pi $ meters. The volume of the cylinder is
Question 7 :
If the radius and height of a right circular cylinder are $4$ cm and $7$ cm respectively, then its volume will be
Question 8 :
The volume of a cylinder is 3080$cm^3$ and radius is 7 cm, height is---
Question 9 :
Find the volume of a right circular cylinder of height 7 cm and radius of the base 2 cm.
Question 10 :
The volume (in $m^{3}$) of cube whose diagonal is $2.5$ meter is: 
Question 11 :
The number of cubes of side 3 cm that can be cut from a cube of side 6 cm is
Question 12 :
Two cylinders of same volume have their heights in the ratio $1:3$. Find the ratio of their radii.
Question 13 :
The ratio of the radii of two cylinders is 1 : $\sqrt{3}$ and their heights are in the ratio 2 : 3. The ratio of their volumes is <br>
Question 14 :
Water in a canal, $30\space dm$ wide and $12\space dm$ deep, is flowing with a speed of $10\space km/hour$. How much area will it irrigate in $30$ minutes, if $8\space cm$ of standing water is required for irrigation.
Question 15 :
If the length of the side of the cube is doubled , then the ratio of the volume of the new cube and the orignal cube is
Question 16 :
The radius of a cylindrical box is $8$ cm and the height is $3$cm. The number of inches that may be added to either the radius or the height to give the same non-zero increase in volume is:
Question 19 :
Calculate the volume of a dice with the dimession $13$ m $\times$ $13$ m $\times 13$ m
Question 21 :
$2$ cm of rain has fallen on a square kilometer of land. Assuming that $50 \%$ of the rain drops could have been collected and contained in a pool having a $100$ m $\times$ $10$ m base, by what level would the water level in the pool have increased? 
Question 22 :
The length, breadth and height of a rectangular parallelopiped are in ratio $6:3:1$. If the surface area of a cube is equal to the surface area of this parallelopiped; then what is the ratio of the volume of the cube to the volume of the parallelopiped?
Question 23 :
Four identical cubes are joined end to end to form a cuboid. If the total surface area of the resulting cuboid is $ 648$ $\displaystyle cm^{2};$ find the length of edge of each cube. Also, find the ratio between the surface area of resulting cuboid and the surface area of a cube.<br/><br/>
Question 24 :
A patient in a hospital is given soup daily in a cylindrical bowl of diameter $7\ cm$. If the bowl is filled with soup to a height of $4\ cm$, how much soup the hospital has to prepare daily to serve $250$ patients?
Question 25 :
If the diagonals of a rhombus are 24 dm and 10dm, then the perimeter of the rhombus will be