# find the min and max of the set of prime factor of a number with the same power in Mathematica

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

-

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.

-
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} *)
``````
-
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