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Immature reticulocyte fraction (IRF) Adult: 1.6 ... The INR is a corrected ratio of a patient's PT to normal ... kappa/lambda ratio: 0.26 [169] 1.65 [169] (unitless ...
the ratio of plasma pressure to magnetic pressure in plasma physics; β-reduction in lambda calculus; the ratio of the velocity of an object to the speed of light as used in the Lorentz factor; a type of receptor for the noradrenaline neurotransmitter in neuroscience
This last non-simple continued fraction (sequence A110185 in the OEIS), equivalent to = [;,,,,,...], has a quicker convergence rate compared to Euler's continued fraction formula [clarification needed] and is a special case of a general formula for the exponential function:
The symbol kappa, , is sometimes used (by academics) instead of vega (as is tau () or capital lambda (), [7]: 315 though these are rare). Vega is typically expressed as the amount of money per underlying share that the option's value will gain or lose as volatility rises or falls by 1 percentage point .
The following list includes the continued fractions of some constants and is sorted by their representations. Continued fractions with more than 20 known terms have been truncated, with an ellipsis to show that they continue. Rational numbers have two continued fractions; the version in this list is the shorter one.
In imaging science, the RMSD is part of the peak signal-to-noise ratio, a measure used to assess how well a method to reconstruct an image performs relative to the original image. In computational neuroscience, the RMSD is used to assess how well a system learns a given model. [8]
Cicchetti (1994) [19] gives the following often quoted guidelines for interpretation for kappa or ICC inter-rater agreement measures: Less than 0.40—poor. Between 0.40 and 0.59—fair. Between 0.60 and 0.74—good. Between 0.75 and 1.00—excellent. A different guideline is given by Koo and Li (2016): [20] below 0.50: poor; between 0.50 and 0 ...
whose terms are fractions that alternate in sign. This series is convergent and can be evaluated using the Maclaurin series for the function ln ( 1 + x ) {\displaystyle \ln(1+x)} , which converges for all x {\displaystyle x} satisfying − 1 < x ≤ 1 {\displaystyle -1<x\leq 1} :