meta user
network profile
| bio | website | |
|---|---|---|
| location | Sweden | |
| age | ||
| visits | member for | 1 year, 2 months |
| seen | May 13 at 10:02 | |
| stats | profile views | 40 |
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Feb 21 |
awarded | Yearling |
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Feb 14 |
answered | directional derivative sublinear of a convex function sublinearity problem to show |
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Feb 11 |
comment |
Formal definition of equation and unknowns But what are the solution set but merely the values that render the predicate true? |
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Feb 11 |
comment |
Formal definition of equation and unknowns I didn't say that all predicates are equations. Just that an equation can be considered to be a predicate. OP asked for the formal logical explaination of an equation and what it means to solve it. I don't believe he asked for simplification. |
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Feb 11 |
answered | Formal definition of equation and unknowns |
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Feb 10 |
asked | Characteristic-Galerkin convergence rate |
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Feb 2 |
comment |
Cannot understand this part from the textbook Thank you, that seems correct :) |
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Feb 2 |
accepted | Cannot understand this part from the textbook |
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Feb 2 |
asked | Cannot understand this part from the textbook |
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Jan 30 |
comment |
To solve an equation Thanks for your answers. Perhaps I didn't make my self clear in my original post. I am not interested in whether or not it can be misunderstood or not. I'm interested in the logical/formal way of asking such a question. |
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Jan 30 |
asked | To solve an equation |
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Dec 18 |
comment |
Exercise: If $\{f(x_n)\}$ is Cauchy $\forall f \in X^\ast$ then $\exists x \in X : x_n \rightarrow x$ weakly Thanks Norbert! |
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Dec 18 |
comment |
Exercise: If $\{f(x_n)\}$ is Cauchy $\forall f \in X^\ast$ then $\exists x \in X : x_n \rightarrow x$ weakly Thanks, that was just about the amount of help I needed :) |
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Dec 18 |
accepted | Exercise: If $\{f(x_n)\}$ is Cauchy $\forall f \in X^\ast$ then $\exists x \in X : x_n \rightarrow x$ weakly |
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Dec 18 |
asked | Exercise: If $\{f(x_n)\}$ is Cauchy $\forall f \in X^\ast$ then $\exists x \in X : x_n \rightarrow x$ weakly |
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Dec 17 |
answered | Exercise: Application of The Uniform Boundedness Principle |
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Dec 17 |
revised |
Exercise: Application of The Uniform Boundedness Principle added 2 characters in body |
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Dec 17 |
comment |
Exercise: Application of The Uniform Boundedness Principle Thank you all for your answers. I will be writing an answer soon, so please check back and correct me if I did anything wrong :) |
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Dec 17 |
comment |
Exercise: Application of The Uniform Boundedness Principle I will search and see if I can find something, thank for the info! |
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Dec 17 |
asked | Exercise: Application of The Uniform Boundedness Principle |
