Matrix X.^23 without approximation

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Sakunrat Jaejaima
Sakunrat Jaejaima le 8 Juil 2015
Commenté : bio lim le 10 Juil 2015
I want to get the answer with no approximation,
I have X=[25 24 23;27 8 11]
I want X.^23 without approximation,help me please.

Réponses (3)

Torsten
Torsten le 8 Juil 2015
Apply Titus' answer under
to each element of X.
Best wishes
Torsten.
  3 commentaires
Torsten
Torsten le 8 Juil 2015
??
Titus Edelhofer
Titus Edelhofer le 8 Juil 2015
X.^23
is the same as
[x(1,1)^23 x(1,2)^23
x(2,1)^23 ...]
so apply the technique in my answer to the last time you asked this question to each single entry in your matrix.

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bio lim
bio lim le 8 Juil 2015
What do you mean by without approximation? Are you talking about scientific notations? If so, you can change the format using, format style.
X=[25 24 23;27 8 11];
format bank % I am guessing this is the format you want.
X.^23
  4 commentaires
Sakunrat Jaejaima
Sakunrat Jaejaima le 10 Juil 2015
it error .
bio lim
bio lim le 10 Juil 2015
output = vpa((X.^23),digit_number);

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Steven Lord
Steven Lord le 8 Juil 2015
You will need to compute in higher precision than double. 25^23 is large enough that not all integers that are that large can be exactly represented.
25^23 > flintmax
In fact, 25^23 is so large that even 1,000,000 is negligible compared to it.
z1 = 25^23;
z2 = z1 + 1000000;
z1 == z2 % will return TRUE, this is NOT a bug!
Think of it as though you gave Bill Gates a $5 bill. He's so rich ($78.8 billion according to Wikipedia) that $5 doesn't change his net worth at all. [Contacting the necessary accountants to change his net worth would cost him more than the $5 you gave him!]
You can compute symbolically:
X = sym([25 24 23;27 8 11]);
X.^23
Or if you're doing this as part of computing 25^23 mod N for some value N, don't compute 25^23 first then compute MOD. That's the straightforward approach described on the "Modular exponentiation" Wikipedia page, but it breaks down when the quantity whose modulus you're taking gets too large. Instead apply one of the other techniques described on that page. For small exponents, the memory efficient method is easy to write; the right-to-left is a little more difficult, but using BITGET you can do it reasonably easily in MATLAB.
  1 commentaire
Sakunrat Jaejaima
Sakunrat Jaejaima le 9 Juil 2015
Thank you so mush.

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