## Midsegment of a triangle worksheet

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The Bernoulli Equation. The Bernoulli Equation - A statement of the conservation of energy in a form useful for solving problems involving fluids. For a non-viscous, incompressible fluid in steady flow, the sum of pressure, potential and kinetic energies per unit volume is constant at any point.

Gas hydrates are ice-like solid compounds of water and gas molecules (clathrates) which are stable at low temperature and elevated pressure [1]. The water molecules build out cage

The two equations above can be used in addition to equation (9) to solve a problem involving parallel flow heat exchangers. The above two equations also apply for a counterflow heat exchanger. Note that numerical iteration may be necessary in equation (9) for cases where unknown inlet and/or outlet temperature(s) need to be solved for.

We will derive the Bernoulli’s equation for compressible fluid flow with the help of Euler’s equation. So, let us recall the Euler’s equation as mentioned here. In case of in-compressible fluid flow, the density of fluid will be constant and therefore the integral of dp/ρ will be equivalent to the P/ρ.