The capacity of a cylindrical vessesl with a hemispherical portion raised upwards at the bottom as shown in the given figure is `(pi r^(2))/(3) [3h - 2r]`.

The capacity of a cylindrical vessel with a hemispherical portion raised upward, at the bottom as shown in the given is (pi r ^(2))/(3) ( 3 h - 2 r).

The capacity of a cylinder vessel with a hemisphere portion raised upward at the bottom as shown in the figure is (pir^(2))/(3) [3h - 2r]

Magnetic field in cylindrical region of radius R in inward direction is as shown in figure.

Locate the position of the centre of mass of a hemisphere of radius R as shown in the following figure:

From a solid sphere of mass M and radius R, a spherical portion of radius R/2 is removed, as shown in the figure Taking gravitational potential V =0at r = oo, the potential at (G = gravitational constatn)

In the figure shown the current flowing 2 R is:

A water tank open at the top is hemispherical at the bottom and cylindrical above it.If radius of the hemisphere is 12m and the total capacity of the tank is 3312 pi backslash m^(3), then the ratio of the surface areas of the hemispherical and the cylindrical portions is (a) 1:1 (b) 3:5 (c) 4:5 (d) 6:5

A juice seller was serving his costumers using glasses as shown in the figure. The inner diameter of the cylindrical glass was 5 cm but bottom of the glass had a hemispherical raised portion which reduced the capacity of the glass. If the height of a glass was 10 cm, find the apparent and actual capacity of the glass. (Use pi = 3.14)

If r and R and the respective radii of the smaller and the bigger semi-circles then the area of the shaded portion in the given figure is: (FIGURE) pi r^(2)backslash squnits (b) pi R^(2)-pi r^(2)backslash squnits(c)pi R^(2)+pi r^(2)backslash squnits (d) pi R^(2)backslash squnits