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The GF method, sometimes referred to as FG method, is a classical mechanical method introduced by Edgar Bright Wilson to obtain certain internal coordinates for a vibrating semi-rigid molecule, the so-called normal coordinates Q k. Normal coordinates decouple the classical vibrational motions of the molecule and thus give an easy route to ...
However, when GF(q) has even characteristic (i.e., q = 2 h for some positive integer h), these formulas are no longer applicable. Consider the quadratic equation ax 2 + bx + c = 0 with coefficients in the finite field GF(2 h). [7] If b = 0 then this equation has the unique solution = in GF(q).
The CKD-EPI equation performed better than the MDRD (Modification of Diet in Renal Disease Study) equation, especially at higher GFR, with less bias and greater accuracy. When looking at NHANES (National Health and Nutrition Examination Survey) data, the median estimated GFR was 94.5 mL/min per 1.73 m 2 vs. 85.0 mL/min per 1.73 m 2 , and the ...
The standard Gibbs free energy of formation (G f °) of a compound is the change of Gibbs free energy that accompanies the formation of 1 mole of a substance in its standard state from its constituent elements in their standard states (the most stable form of the element at 1 bar of pressure and the specified temperature, usually 298.15 K or 25 °C).
Once G* is known, the displacement vector is given by the following GF equation similar to Eq. (8): u= G* f (14) Equation (14) gives the desired solution, that is, the atomic displacements or the lattice distortion caused by the force f. However, it does not show the linkage of the lattice and the continuum multiple scales, because Eqs.
The resistivity of these materials changes with strain, accounting for the / term of the defining equation above. In constantan strain gauges (the most commercially popular), the effect accounts for 20% of the gauge factor, but in silicon gauges, the contribution of the piezoresistive term is much larger than the geometric terms.
In finite field theory, a branch of mathematics, a primitive polynomial is the minimal polynomial of a primitive element of the finite field GF(p m).This means that a polynomial F(X) of degree m with coefficients in GF(p) = Z/pZ is a primitive polynomial if it is monic and has a root α in GF(p m) such that {,,,,, …} is the entire field GF(p m).
In physics, the Landé g-factor is a particular example of a g-factor, namely for an electron with both spin and orbital angular momenta.It is named after Alfred Landé, who first described it in 1921.