[see also: few
Then F is 2 less than G.
Let An be a sequence of positive integers none of which is 1 less than a power of two.
Thus F is less than or equal to G. [Not: “less or equal to G'', nor “less than or equal G'']
Here F is strictly less than G.
Thus F is no less than G.
Clearly, F is less than 1 in absolute value.
Less than 1 in p of its points will result in a quartic with ideal class number p.
Much less is known about hyperbolically convex functions.
Although our proof is a little tedious, it is much less so than Ito's original proof, which was carried out without the benefit of martingale technology.
This method is recently less and less used.
to <in> a lesser degree