MHB Share My Books with MHB: Fernando Revilla

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Fernando Revilla shared two of his books, "Problems in Linear Algebra" and "Problems in Real and Complex Analysis," on Scribd, noting they are in Spanish but may still be useful. The forum encourages sharing resources, even in languages other than English, as mathematics is a universal language. Members expressed appreciation for the availability of these books, highlighting their potential value to Spanish-speaking users. The discussion emphasizes the importance of inclusivity in sharing educational materials. Overall, the contribution is welcomed and seen as beneficial for the community.
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I'd like to share two books of mine with MHB: Fernando Revilla on Scribd (Problems in Linear Algebra & Problems in Real and Complex Analysis). Although they are in Spanish, perhaps could be useful in some sense. At any case if some moderator consider non adequate this post, please feel free to delete it. Thanks.
 
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Hey Fernando,

While we do ask that people post in English, a link to two free books could be very useful to anyone here who speaks Spanish. Thank you for making these available to our forum! (Yes)
 
Fernando Revilla said:
I'd like to share two books of mine with MHB: Fernando Revilla on Scribd (Problems in Linear Algebra & Problems in Real and Complex Analysis). Although they are in Spanish, perhaps could be useful in some sense. At any case if some moderator consider non adequate this post, please feel free to delete it. Thanks.

As for the Chess, the Math's language is really universal... I personally didn't have any difficult to consulte books of Math and Chess
written in Russian, so that I think Spanish is wellcome for anyone!...

Kind regards

$\chi$ $\sigma$
 
Thread 'Erroneously finding discrepancy in transpose rule'

Thread 'Erroneously finding discrepancy in transpose rule'

Obviously, there is something elementary I am missing here. To form the transpose of a matrix, one exchanges rows and columns, so the transpose of a scalar, considered as (or isomorphic to) a one-entry matrix, should stay the same, including if the scalar is a complex number. On the other hand, in the isomorphism between the complex plane and the real plane, a complex number a+bi corresponds to a matrix in the real plane; taking the transpose we get which then corresponds to a-bi...
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