An ideal fluid flows in the pipe as shown in the figure. The pressure in the fluid at the bottom `P_(2)` is the same as it is at the top `P_(1)`. If the velocity of the top `v_(1) = 2 m//s`. Then the ratio of areas `A_(1)//A_(2)`, is

The pressure P_(1) at the top of a dam and P_(2) at a depth h from the top inside water (density rho ) are related as :

A horizontal pipe of varying cross-sectional area carries water flowing at a constant rate. The pressure at sections (1) and (2) are 50 cm and 20 cm of Hg . If the velocity of section (1) is 5 m//s , what is the velocity of section (2). Also determine the ratio of areas at sections (1) and (2) (as shown in Fig.

An ideal fluid flows through a pipe of circular cross-section made of two sections with diameters 2.5 cm and 3.75 cm . The ratio of the velocities in the two pipes is

An ideal fluid flows through a pipe of circular cross-section made of two sections with diameters 2.5 cm and 3.75 cm . The ratio of the velocities in the two pipes is

An ideal fluid flows through a pipe of circular cross-section made of two sections with diameters 2.5 cm and 3.75 cm . The ratio of the velocities in the two pipes is

A liquid flows in a tube from left to right as shown in figure. A_(1) and A_(2) are the cross-section of the portions of the tube as shown. Then the ratio of speeds v_(1)//v_(2) will be

In the situation shown , the readings of ideal ammeters A_(1) and A_(2) are in the ratio.

An ideal fluid flows through a pipe of circular cross - section with diameters 5 cm and 10 cm as shown in the figure. The ratio of velocities of fluid at A and B is

A liquid flows through a horizontal tube as shown in figure. The velocities of the liquid in the two sections, which have areas of cross-section A_(1) and A_(2) and v_(1) and v_(2) respectively. The differnece in the levels of the liquid in the two vertical tubes is h . then

A portion of a tube is shown in the figure. Fluid is flowing from cross-section area A_(1) to A_(2) . The two cross-sections are at distance 'l' from each other. The velocity of the fluid at section A_(2) is sqrt((gl)/(2)) . If the pressures at A_(1) & A_(2) are same, then the angle made by the tube with the horizontal will be: