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2. Prism correction - Wikipedia

   en.wikipedia.org/wiki/Prism_correction

   Prism dioptres. Prism correction is commonly specified in prism dioptres, a unit of angular measurement that is loosely related to the dioptre. Prism dioptres are represented by the Greek symbol delta (Δ) in superscript. A prism of power 1 Δ would produce 1 unit of displacement for an object held 100 units from the prism. [2]

3. Thermal mass flow meter - Wikipedia

   en.wikipedia.org/wiki/Thermal_mass_flow_meter

   Thermal mass flow meters, also known as thermal dispersion or immersible mass flow meters, comprise a family of instruments for the measurement of the total mass flow rate of a fluid, primarily gases, flowing through closed conduits. A second type is the capillary-tube type of thermal mass flow meter. Many mass flow controllers (MFC) which ...

4. Parshall flume - Wikipedia

   en.wikipedia.org/wiki/Parshall_flume

   Using the Parshall flume free flow equation, determine the discharge of a 72-inch flume with a depth, Ha of 3 feet. From Table 1: Throat width = 72 in = 6 ft, C = 24, and n = 1.59. Q = 24 Ha 1.59 for a 72-inch Parshall flume. So, if there is a depth of 3 feet, the flow rate is ≈ 140 ft 3 /s.

5. Water metering - Wikipedia

   en.wikipedia.org/wiki/Water_metering

   Water metering. A typical residential water meter. Water metering is the practice of measuring water use. Water meters measure the volume of water used by residential and commercial building units that are supplied with water by a public water supply system. They are also used to determine flow through a particular portion of the system.

6. Volume correction factor - Wikipedia

   en.wikipedia.org/wiki/Volume_Correction_Factor

   The formula for Volume Correction Factor is commonly defined as: V C F = C T L = exp ⁡ { − α T Δ T [ 1 + 0.8 α T ( Δ T + δ T ) ] } {\displaystyle VCF=C_{TL}=\exp\{-\alpha _{T}\Delta T[1+0.8\alpha _{T}(\Delta T+\delta _{T})]\}}

7. Mass flow meter - Wikipedia

   en.wikipedia.org/wiki/Mass_flow_meter

   The mass flow of a U-shaped Coriolis flow meter is given as: Q m = K u − I u ω 2 2 K d 2 τ {\displaystyle Q_{m}={\frac {K_{u}-I_{u}\omega ^{2}}{2Kd^{2}}}\tau } where K u is the temperature dependent stiffness of the tube, K is a shape-dependent factor, d is the width, τ is the time lag, ω is the vibration frequency, and I u is the inertia ...