What is the gauge pressure at point B?

What is the relationship between gauge pressure and atmospheric pressure? How can we calculate the gauge pressure at point B in the given scenario?

The gauge pressure at B is 11.5 kPa. From the continuity equation, the velocity of water at point B can be calculated using the formula: Velocity of water B = (2 * π * 3²) / (2 * π * 1²) = 9 m/s. Then utilizing Bernoulli's equation, we can derive the pressure at point B. The pressure measured in relation to atmospheric pressure is known as gauge pressure. It is positive when the atmospheric pressure is above that level and negative when it is below it. In this scenario, the pressure at point B is calculated to be 11.5 kPa.

Understanding Gauge Pressure and its Calculation

Gauge pressure is the pressure measured in relation to atmospheric pressure. It indicates the pressure above or below atmospheric pressure. The calculation of gauge pressure involves considering the atmospheric pressure as the reference point. In the given scenario, the water line splits into two pipes at the same elevation. At point A, the water speed and gauge pressure are provided. Using the principles of continuity equation and Bernoulli's equation, we can determine the gauge pressure at point B. Continuity equation: The velocity of water at point B can be calculated using the continuity equation, which states that the flow rate is constant in a pipe. By applying the formula mentioned above, the velocity at point B is determined to be 9 m/s. Bernoulli's equation: Bernoulli's equation relates the pressure, velocity, and potential energy of a fluid. By equating the energies at points A and B, we can solve for the pressure at point B. The equation accounts for the velocity and pressure changes in the pipes. Relationship with atmospheric pressure: Gauge pressure is essential in determining the pressure variation in a fluid system. It indicates the pressure above or below the standard atmospheric pressure. When calculating gauge pressure, atmospheric pressure is used as a reference point. Significance of Pascal's principle: Pascal's principle explains how pressure is transmitted through a fluid in an enclosed system. It helps in understanding the pressure changes in the fluid due to external factors like atmospheric pressure. In conclusion, gauge pressure plays a crucial role in fluid mechanics by measuring the pressure relative to the atmospheric pressure. Understanding the principles of continuity and Bernoulli's equations is essential for calculating gauge pressure in complex fluid systems.
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