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Exact(17)
The equation in the linear for can be written as: log q^{{{text{e}} }} = log K_{text{F}} + frac{1}{n}log C_{text{e}} (6).
The forward-looking log-likelihood log f z (Z; Σ) can be written as: log f z Z ; Σ = - log Σ - tr Σ - 1 Σ ̂, (15).
After removing one dimension, Equation ( 39) can be written as: log det I M + γ ps M B V † U ∧ U † V = log det I M + γ ps M V ∧ ~ V ~ † = log det I M + γ ps M ∧ ~, (41).
Using Property det(I + γ A B) = det(I + γ B A), Equation ( 36) can be written as: log det I M + γ ps M H ̄ H ̄ † = log det I M + γ ps M B V † U ∧ U † V. (39).
The first-order model expresses the photocatalytic degradation rate which is dependent on the amount of MB in the TiO2 matrix and can be written as log C t / C 0 = kt Open image in new window (2) 3.
According to Reaction (26), the relation between log K°s2 and log Qs2 can be written as: log Qs2 = log K°s2 - ε(H+, AgCl2 -) + ε(H+, Cl-) (27).
Similar(43)
The scaling law is written as log Dexp = 0.32 log E − 2.06.
For k covariates the model is written as log = β0 +...X1 +... + β k X k (3) where π is the probability of success (e. g., the proportion of sick persons in a group), and X i the covariates.
On the other hand, in a logistic regression model, the function is written as: Log a / b = β 0 + β 1 X 1 + … + β k X k where a/b is the odds of success and the OR estimated of a given covariate Xi is eβi.
In a binomial regression model with k covariates, the function is written as: Log a / (a + b ) = β 0 + β 1 X 1 + … + β k X k where a is the number of cases and b is the number of non-cases, and X i the covariates.
A first-order exponential lag relationship can be written as: Dlog Y t) = gamma log (alpha X_{1} (t)^{{beta_{1} }} X_{2} (t)^{{beta_{2} }} X_{3} (t)^{{beta_{3} }} /Y t)) (17)in which 1/γ is the mean adjustment lag and D = d/dt is the time differential operator.
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Since I tried Ludwig back in 2017, I have been constantly using it in both editing and translation. Ever since, I suggest it to my translators at ProSciEditing.

Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com