Sentence examples for I commute for from inspiring English sources
Then clearly, the restrictions T i and F i commute for every i = 1, 2,...,n and σ T + F = σ T + F | Y i ∪ σ T + F | Z i.
I commute for about 2-3 hours a day, adaptive cruise control is the best thing since sliced bread.
Now that I see it on paper, I realize how ridiculous it sounds that I commute for work from Hawaii to South Sudan but the truth is, aside from the 30+ hour journey, I am grateful for the time I get to spend there.
Though I no longer do so, I commuted for almost 25 years, and if current commuters think it's tough duty, they should forget the Midtown Directs to Penn Station (they didn't exist) and take the train to Hoboken.
I have lived in London and in Paris and I commuted for years between Chicago and Berlin.
I commuted for about three months and finally we just moved to get the kids in school.
For every i ∈ I, T i commutes with S. For every i ∈ I, T i is linear.
For any i ∈ I, T i commutes with S. For any A ⊂ Ω and i ∈ I, we have T i ( co ¯ ( A ) ) ⊂ co ¯ ( T i ( A ) ), where co ( A ) is the convex hull of A in Ω.
I commuted from home for one and a half years but moved back to school because I realized that I was getting more financial aid when I was in school since I was choosing a cheap place to live, whereas FAFSA assumed I didn't need that much money when I was living with my parents.
Let X be a Hausdorff complete and locally convex space, whose topology is defined by a family of semi-norms P. Let Ω be a convex, closed and bounded subset of X, I be a given set of index, and { T i } i ∈ I, S be continuous functions from Ω into Ω such that: (a) For every i ∈ I, T i commutes with S. (b) For every i ∈ I, T i is linear.
The pair (f, g) is said to be (i) commuting if fgx = gfx for all x ∈ X; (ii) weakly commuting [14] if d fgx, gfx) ≤ d(fx, gx) for all x ∈ X; (iii) compatible [15] if limn→∞d fgx n, gfx n ) = 0 whenever {x n } is a sequence in X such that .
