Class 11 Physics Fluid Mechanics and Surface Tension Bernoulli's Theorem and Applications of Bernoulli's Theory

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State Bernoulli's principle in words.

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(N/A) Bernoulli's principle states that for an incompressible,non-viscous,and streamline flow of a fluid,the sum of pressure energy $(P)$,kinetic energy per unit volume $\left(\frac{1}{2}\rho v^{2}\right)$,and potential energy per unit volume $(\rho gh)$ remains constant at all points along a streamline.
Mathematically,this is expressed as: $P + \frac{1}{2}\rho v^{2} + \rho gh = \text{constant}$.

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Fluid Mechanics and Surface Tension

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Bernoulli's Theorem and Applications of Bernoulli's Theory

Does it matter if one uses gauge instead of absolute pressures in applying Bernoulli's equation? Explain.

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Assertion $(A)$: The upper surface of the wing of an aeroplane is made convex and the lower surface is made concave.
Reason $(R)$: The air currents at the top have smaller velocity and thus less pressure at the bottom than at the top.

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The speeds of air above and below the wing of an airplane are $120\, m/s$ and $90\, m/s$,respectively. The density of air is $1.3\, kg/m^3$. If the wing has a length of $10\, m$ and a width of $2\, m$,the pressure difference between the top and bottom of the wing is ......... $Pascal$.

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Water is flowing through a horizontal pipe of non-uniform cross-section. In the region of the narrowest part inside the pipe,the water will have

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Derive Bernoulli's equation for a steady,incompressible,and non-viscous (ideal) fluid flow.

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State Bernoulli's principle in words.

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Does it matter if one uses gauge instead of absolute pressures in applying Bernoulli's equation? Explain.

Assertion $(A)$: The upper surface of the wing of an aeroplane is made convex and the lower surface is made concave.Reason $(R)$: The air currents at the top have smaller velocity and thus less pressure at the bottom than at the top.

The speeds of air above and below the wing of an airplane are $120\, m/s$ and $90\, m/s$,respectively. The density of air is $1.3\, kg/m^3$. If the wing has a length of $10\, m$ and a width of $2\, m$,the pressure difference between the top and bottom of the wing is ......... $Pascal$.

Water is flowing through a horizontal pipe of non-uniform cross-section. In the region of the narrowest part inside the pipe,the water will have

Derive Bernoulli's equation for a steady,incompressible,and non-viscous (ideal) fluid flow.

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Assertion $(A)$: The upper surface of the wing of an aeroplane is made convex and the lower surface is made concave.
Reason $(R)$: The air currents at the top have smaller velocity and thus less pressure at the bottom than at the top.