Question 1 :
The length of each edge of a cube is $9 m$. The volume of the cube in $m^{3}$ is:
Question 2 :
The volume of a right circular  cylinder, whose diameter is $10$ cm and height $4$ cm is <br/>
Question 3 :
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 4 :
If the radius and height of a right circular cylinder are $4$ cm and $7$ cm respectively, then its volume will be
Question 5 :
If the heights of two cylinders are equal and their radii are in the ratio of 7:5, then the ratio of their volumes is 49:25.<br/>State True or False.
Question 6 :
A cubic wooden block has an edge of $0.21 m$. What is its volume?
Question 7 :
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 8 :
Two cubes have volumes in the ratio 1 : 27 then the ratio of the area of the face of one to that of the other is
Question 9 :
Fill in the blank:<br/>The volume of the cube is $\displaystyle 4913{ in }^{ 3 }$. It's side is ____
Question 10 :
If the height of cylinder is halved keeping the radius constant , its volume will be
Question 11 :
Two circular cylinders of equal volume have their heights in the ratio 1 : 2 The ratio of their radii is
Question 12 :
If the surface area of a cube is $384$ sq.m, then its volume is
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 :
Two cylinders of same volume have their heights in the ratio $1:3$. Find the ratio of their radii.
Question 15 :
The volume of a cube whose diagonal is $ \displaystyle \sqrt{3}  $ m will be
Question 18 :
The percentage increase in the surface area of a cube when  each side is increased to $\dfrac{3}{2}$ times  the original length is<br/>
Question 19 :
A covered wooden box has the inner measures as $115$ cm, $75$ cm and $35$ cm and the thickness of wood is $2.5$ cm. Then the volume of the wood
Question 20 :
The diagonals of a rhombus are of length 10 cm and 20 cm. Find its area.
Question 21 :
The length, breadth and height of a cuboid are in the ratio 5 : 4 : 2 and the total surface area is $1216 cm^2$, then the volume of the cuboid is
Question 22 :
A village, having a population of $4000$, requires $150$ litres of water per head per day. It has tank measuring $20\ m \times 15\ m \times 6\ m$. For how many days will the water of this tank last?
Question 23 :
Volume of cylinder whose radius $r$ is equal to its height is
Question 24 :
Each edge in a cube is $5\ cm$. What is the surface area in square cm?
Question 25 :
The formula for the volume of a cylinder is $V = \pi r^2 h$, where $\pi = \displaystyle \frac{22}{7}$Find $h$, when $V = 770$ and $r = 3.5$<br/>