Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Let

n=2^10 3^7 5^4...31^2...59^2 61...97

be the factorization of an integer such that the powers of primes are non-increasing.

I would like to write a code in Mathematica to find Min and Max of prime factor of n such that they have the same power. for example I want a function which take r(the power) and give (at most two) primes in general. A specific answer for the above sample is

minwithpower[7]=3

maxwithpower[7]=3


minwithpower[2]=31

maxwithpower[2]=59

Any idea please.

share|improve this question

2 Answers 2

up vote 2 down vote accepted

Let n = 91065388654697452410240000 then

FactorInteger[n]

returns

{{2, 10}, {3, 7}, {5, 4}, {7, 4}, {31, 2}, {37, 2}, {59, 2}, {61, 1}, {97, 1}}

and the expression

Cases[FactorInteger[n], {_, 2}]

returns only those elements from the list of factors and coefficients where the coefficient is 2, ie

{{31, 2}, {37, 2}, {59, 2}}

Next, the expression

Cases[FactorInteger[n], {_, 2}] /. {{min_, _}, ___, {max_, _}} -> {min, max}

returns

{31, 59}

Note that this approach fails if the power you are interested in only occurs once in the output from FactorInteger, for example

Cases[FactorInteger[n], {_, 7}] /. {{min_, _}, ___, {max_, _}} -> {min, max}

returns

{{3, 7}}

but you should be able to fix that deficiency quite easily.

share|improve this answer
    
HPM, I see that you have answered 56 questions in the mathematica tag; why not join us over at Mathematica.SE? –  Mr.Wizard Oct 4 '12 at 16:27

One solution is :

getSamePower[exp_, n_] :=  With[{powers = 
 Select[ReleaseHold[n /. {Times -> List, Power[a_, b_] -> {a, b}}], #[[2]] == 
   exp &]}, 
  If[Length[powers] == 1, {powers[[1, 1]], powers[[1, 1]]}, {Min[powers[[All, 1]]], Max[powers[[All, 1]]]}]]

to be used as :

getSamePower[7,  2^10 3^7 5^4 \[Pi]^1 31^2 E^1 59^2 61^1 I^1 97^1 // HoldForm]
(* {3, 3} *)

getSamePower[2,  2^10 3^7 5^4 \[Pi]^1 31^2 E^1 59^2 61^1 I^1 97^1 // HoldForm]
(* {31, 59} *)
share|improve this answer
    
Select::normal: Nonatomic expression expected at position 1 in Select[5040,#1[[2]]==5&]. >> Select::normal: Nonatomic expression expected at position 1 in Select[5040,#1[[2]]==5&]. >> Part::partd: Part specification Select[5040,#1[[2]]==5&][[All,1]] is longer than depth of object. >> Part::partd: Part specification Select[5040,#1[[2]]==5&][[All,1]] is longer than depth of object. >> –  asd Oct 4 '12 at 14:15
    
@ b.gatessucks: I received the error above –  asd Oct 4 '12 at 14:16
    
@asd It works for me; the //HoldForm bit is important. –  b.gatessucks Oct 4 '12 at 14:46

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.