Fluid Flow is generally measured inferentially by measuring velocity through a known area. With this indirect method, the flow measurement is the volume flow rate \u201dQ\u201d stated in its simplest terms.\n\n\n\nVolume flow rate\n\n\n\nIt is expressed as a volume delivered per unit time and typical units are gallons\/min, m3\/hr,ft3\/hr.Q = A * V\n\n\n\nWhere : A is the cross-sectional area of the pipe & V is the fluid velocity.\n\n\n\nMass or weight flow rate \n\n\n\nExpressed as mass or weight flowing per unit time. Typical units are kg\/hr, Ib\/hr.\n\n\n\nThis is related to the volume flow rate by: F = p * Q\n\n\n\nwhere\n\n\n\nF = Mass or Weight flow rate.p = mass density or weight density.Q = volume flow rate\n\n\n\nFactors affecting Flow in Pipes\n\n\n\nVelocity (V) of the fluid.The friction of the fluid in contact with the pipe.Viscosity (\u00b5) of the fluid.The density of the fluid.\n\n\n\nThe most important flow factors can be correlated together into a dimensionless parameter called the Reynolds number.\n\n\n\nIt describes the flow for all velocities, viscosities, and pipeline sizes.\n\n\n\nIn general, it defines the ratio of velocity forces driving the fluid to the viscous forces restraining the fluid, or:\n\n\n\nRD = VD\u03c1\/\u00b5\n\n\n\nD=Diameter ;\n\n\n\nFluid Flow in Pipes\n\n\n\nAt very low velocities or high viscosities, RD (Reynolds Number) is low and the fluid flows in smooth layers with the highest velocity at the center of the pipe and low velocities at the pipe wall where the viscous forces restrain it. This type of flow is called laminar flow and is represented by Reynolds numbers below 2,000. One significant characteristic of laminar flow is the parabolic shape of its velocity profile\n\n\n\nAt higher velocities or low viscosities the flow breaks up into turbulent eddies where the majority of flow through the pipe has the same average velocity. In the \u201cturbulent\u201d flow the fluid viscosity is less significant and the velocity profile takes on a much more uniform shape.\n\n\n\nFig. 1: Flow Types\n\n\n\nTurbulent flow is represented by Reynolds numbers above 4,000. Between Reynolds number values of 2,000 and 4,000, the flow is said to be in transition.\n\n\n\nMeasurement of Fluid Flow inside a Pipe\n\n\n\nThe type of device used often depends on the nature of the fluid and the process conditions under which it is measured.\n\n\n\nFlow is usually measured indirectly by first measuring a differential pressure or a fluid velocity. This measurement is then related to the volume rate electronically.\n\n\n\nFlow-meters can be grouped into following generic types:\n\n\n\nHead Type Flow Meters\u2013 Orifice Plates, Venturi, Flow Nozzles, Pitot Tubes, etc.Target Flow Meters.Positive Displacement Type Flow Meters such as Nutating Disc, Rotating Valve, Oval Gear, Oscillating Piston, Roots (Rotating Lobes), Rotating Impeller, etc.Velocity Type Flow Meters such as Turbine Meters, Electromagnetic Flow Meters, Vortex Flow Meters, Ultrasonic Flow Meters, etc.Mass Flow Meters such as Thermal Mass Flow Meters, Coriolis Mass Flow Meters, etc\n\n\n\nAll the above flow meter types will be explained in my future articles.\n\n\n\nFlow Fundamentals\n\n\n\nAccurate Measurement Requires the Right Meter Choice for the Application\n\n\n\nNewtonian fluid\n\n\n\nA Newtonian fluid is defined as a fluid which, when acted upon by applied shearing stress, has a velocity gradient that is solely proportional to the applied stress.\u00a0 Petroleum products and most mixtures of particles in petroleum products are Newtonian fluids.\n\n\n\nAccuracy of flow meters is based on the steady flow of a homogenous, single-phase Newtonian fluid and for turbine and ultrasonic meters a defined velocity profile that does not alter the coefficient in long, straight runs of pipe.\n\n\n\nRaynolds Number\n\n\n\nA dimensionless parameter expressing the ratio between the inertia (driving) and viscous (retarding) forces.\n\n\n\nIt is given by the formulas:\n\n\n\nRe = 2214 x BPH \/ (D x n)\n\n\n\nOr\n\n\n\nRe = 351 x M3\/hr \/ (D x n)where: The flow rate is in BPH barrels\/hour (or M3\/hr); D is the diameter of the meter in inches and n is the kinematic viscosity of the fluid.\n\n\n\nFig. 2 below shows the curves for flow profile vs Reynolds number and Flow profile vs Performance\n\n\n\nFig. 2: Flow profile\n\n\n\nFigure 3 shows various curves\/profiles related to Fluid Flow.\n\n\n\nFig. 3: Fluid flow and velocity profiles.