The interactive visualization powerfully demonstrates Bernoulli's Principle, proving that the total energy per unit mass along a steady streamline remains constant: $\frac{P}{\rho}+\frac{1}{2} v^2+g h=$ Constant. The animation, through synchronized movement and real-time numerical labels, shows the compulsory energy trade-offs: as the fluid parcel moves into a narrowing section, its velocity increases due to mass conservation, forcing a corresponding conversion of Pressure Energy ( $\frac{P}{\rho}$ ) into Kinetic Energy ( $\frac{1}{2} v^2$ ). Conversely, as the parcel moves to a higher elevation, its Gravitational Potential Energy ( $g h$ ) increases, immediately requiring a drop in both Kinetic and Pressure Energy to ensure that the total height of the stacked energy bar never fluctuates. This constant sum confirms the principle as a fundamental statement of energy conservation for ideal fluids.
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