Suggestions(1)
Exact(4)
Credlin said if she was running the strategy (as it could've been, should've been in her mind we assume) she would not have cancelled the walk-through.
When we consider the duality of body and mind, we assume that the two can be trusted to get along; that our minds can go about their noble business without being diverted by the physical forms in which they are encased.
With this in mind, we assume is a solution of (3.6).
With the motivation of the previous sections in mind, we assume that k diagnostic studies are available with diagnostic accuracies θ ^ 1, ⋯, θ ^ k where (6) θ ^ i = log p ^ i log (1 − q ^ i ).
Similar(56)
We go on about our lives and rarely think about such things because in the backs of our minds we assume there is nothing we can do about it.
We show that δ = 0. Suppose, to the contrary, that δ > 0. Taking the limit in (11) when δ n → δ + and having in mind that we assume that lim r → t + φ ( t ) < t for all t > 0, we have δ 2 = lim n → ∞ δ n 2 ≤ lim n → ∞ φ ( δ n − 1 2 ) = lim δ n − 1 → δ + φ ( δ n − 1 2 ) < δ 2, a contradiction.
We shall show that δ = 0. Suppose, to the contrary, that δ > 0. Then taking the limit as n → ∞ on both sides of (15) and having in mind that we assume lim t → r ψ ( t ) > 0 for all r > 0 and ϕ is continuous, we have ϕ = lim n → ∞ ϕ ( δ n ) ≤ lim n → ∞ ϕ ( δ n − 1 ) − 2 ψ ( δ n − 1 2 ) = ϕ − 2 lim n → ∞ ψ ( δ n − 1 2 ) < ϕ , a contradiction.
We want to show that δ = 0. Suppose that δ > 0. Then taking the limit as δ k → δ + of both sides of (2.12) and keeping in mind that we assume that lim r → t + ϕ ( r ) < t for all t > 0, we have δ = lim k → ∞ δ k + 1 ≤ lim k → ∞ n ⋅ ϕ ( δ k n ) = n lim δ k → δ + ϕ ( δ k n ) < n δ n = δ (2.18).
For example, if we use the concept of a bird, there is a constellation of facts that immediately come to mind: we might assume that it flies, eats worms and so on.
Keeping that in mind, we can assume that a large part of EMT knowledge can be moved to translational research in molecular medicine with potential future new therapeutics in treating diseases linked to infections.
HAL 9000, in "2001: A Space Odyssey," will forever come to mind, his advice, we assume, eminently reliable — before his malfunction.
Write better and faster with AI suggestions while staying true to your unique style.
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