Surface areas and volumes of solids - class-X
surface areas and volumes of solids
Questions
From a solid sphere of radius $R$, a concentric solid sphere of radius $\dfrac{R}{2}$ is removed. The total surface area increases by
- $0%$
- $25%$
- $50%$
- $75%$
The volume of triangular prism whose adjacent sides are $\bar a,\ \bar b,\ \bar c$ each of magnitude $4$ units and each is inclined at an angel $\dfrac {\pi}{3}$ with other two is
- $16\sqrt {2}$
- $16\sqrt {3}$
- $8\sqrt {3}$
- $8\sqrt {2}$
If a regular square pyramid has a base of side $8 cm$ and height of $30 cm$, then its volume is
- $120 cm^3.$
- $240 cm^3.$
- $640 cm^3.$
- $900 cm^3.$
A square pyramid can contain $16\ m^3$ of water. The height of the pyramid is $3\ m$. Calculate the length of base of the square pyramid.
- $16\ m$
- $12\ m$
- $4\ m$
- $2\ m$
$VPQRS$ is rectangle based pyramid where $PQ = 30\ cm, QR = 20\ cm$ and volume is $2000\ {cm}^3$, then height (in cm) is
- $20$
- $40$
- $10$
- $30$
State whether true or false :
- True
- False
The base of right prism is a triangle whose perimeter is 28 cm and the inradius of the triangle is 4 cm. If the volume of the prism is 366 cc, then its height is
- 6.54 cm
- 8 cm
- 4 cm
- None of these
The slant height of a right pyramid having square base of side $10cm$ and vertical height $15cm$ is
- $5\sqrt{10}cm$
- $6\sqrt{10}cm$
- $7\sqrt{10}cm$
- $8\sqrt{10}cm$
Consider an incomplete pyramid of balls on a square base having $18$ players, and having $13$ balls on each side of the top layer. Then the total number $N$ of balls in that pyramid satisfies
- $ 9000 < N <10000$
- $8000 < N < 9000$
- $7000 < N < 8000$
- $ 10000 < N < 12000 $
The circumference of a 1 cm thick pipe is 44 cm. The level of water that 7 cm of pipe can hold is
- $798 cm^3$
- $308 cm^3$
- $792 cm^3$
- $795 cm^3$
The base of a right prism is a square of perimeter 20 cm and its height is 30 cm. The volume of the prism is
- $700 cm^3$
- $750 cm^3$
- $800 cm^3$
- $850 cm^3$
The base of a right prism is an equilateral triangle of edge $12$m. If the volume of the prism is $288\sqrt 3m^3$, then its height is:
- $6$m
- $8$m
- $10$m
- $12$m