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Editor: 127.0.0.1
Time: 2007/11/19 06:38:35 GMT-8 |
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| Note: reverted accidental edit | ||
removed:
-From unknown Mon Nov 19 06:16:23 -0800 2007
-From:
-Date: Mon, 19 Nov 2007 06:16:23 -0800
-Subject: test
-Message-ID: <20071119061623-0800@axiom-wiki.newsynthesis.org>
-
-test
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Examples
Here is a simple Axiom command:
\begin{axiom}
integrate(1/(a+z^3), z=0..1,"noPole")
\end{axiom}
axiomintegrate(1/(a+z^3), z=0..1,"noPole")
 | (1) |
Type: Union(f1: OrderedCompletion? Expression Integer,...)
And here is a REDUCE command:
\begin{reduce}
load_package sfgamma;
load_package defint;
int(1/(a+z^3), z,0,1);
\end{reduce}
\begin{reduce}
load_package sfgamma;
load_package defint;
int(1/(a+z^3), z,0,1);
\end{reduce}
<hr />
Common Mistakes
Please review the list of [Common Mistakes]? and the list of [MathAction Problems]? if you are have never used MathAction? before. If you are learning to use Axiom and think that someone must have solved some particular problem before you, check this list of Common [Axiom Problems]?.
szsz --unknown, Wed, 07 Dec 2005 09:11:18 -0600 reply
Works with ASCII text output formatting.
axiom)set output tex off )set output algebra on
axiomsolve([x^2 + y^2 - 2*(ax*x + ay*y) = l1, x^2 + y^2 - 2*(cx*x + cy*y) = l2],[x,y]) (2) [ (- 2cy + 2ay)y - l2 + l1 [x= ------------------------, 2cx - 2ax 2 2 2 2 2 (4cy - 8ay cy + 4cx - 8ax cx + 4ay + 4ax )y + 2 2 (4cy - 4ay)l2 + (- 4cy + 4ay)l1 + (8ax cx - 8ax )cy - 8ay cx + 8ax ay cx * y + 2 2 2 2 l2 + (- 2l1 + 4ax cx - 4ax )l2 + l1 + (- 4cx + 4ax cx)l1 = 0 ] ]
Type: List List Equation Fraction Polynomial Integer
But fails with LaTeX?.
axiom)set output tex on )set output algebra off
0**0 depends on the type of '0':
axiom(0::Float)**(0::Float) >> Error detected within library code: 0**0 is undefined
The idea was, that defining 
as 1 is ok whenever there is no notion of limit. However,
axiom(0::EXPR INT)**(0::EXPR INT)
 | (2) |
Type: Expression Integer
is not quite in line with this, I think. There has been some discussion on this subject on axiom-developer.
It is easy to change this behaviour, if we know better...
Let's see if the same happens here:axiomsinCosProducts := rule sin (x) * sin (y) == (cos(x-y) - cos(x+y))/2 cos (x) * cos (y) == (cos(x-y) + cos(x+y))/2 sin (x) * cos (y) == (sin(x-y) + sin(x+y))/2
 | (3) |
Type: Ruleset(Integer,Integer,Expression Integer)
When you are typing or when you cut-and-paste commands directly
into the Axiom interpreter you must use an underscore character at
the end of each incomplete line, and you must use the ( ) syntax
instead of identation, like this:
sinCosProducts := rule (_ sin (x) * sin (y) == (cos(x-y) - cos(x+y))/2; _ cos (x) * cos (y) == (cos(x-y) + cos(x+y))/2; _ sin (x) * cos (y) == (sin(x-y) + sin(x+y))/2)
Alternatively, using a text editor you can enter the commands into a
file called, for example sincos.input exactly as in MathActon? above
and the use the command:
)read sincos.input
axiom)lib RINTERPA RINTERP PCDEN GUESS GUESSINT GUESSP RationalInterpolationAlgorithms is now explicitly exposed in frame initial RationalInterpolationAlgorithms will be automatically loaded when needed from /var/zope2/var/LatexWiki/RINTERPA.NRLIB/code RationalInterpolation is now explicitly exposed in frame initial RationalInterpolation will be automatically loaded when needed from /var/zope2/var/LatexWiki/RINTERP.NRLIB/code PolynomialCommonDenominator is now explicitly exposed in frame initial PolynomialCommonDenominator will be automatically loaded when needed from /var/zope2/var/LatexWiki/PCDEN.NRLIB/code Guess is now explicitly exposed in frame initial Guess will be automatically loaded when needed from /var/zope2/var/LatexWiki/GUESS.NRLIB/code GuessInteger is now explicitly exposed in frame initial GuessInteger will be automatically loaded when needed from /var/zope2/var/LatexWiki/GUESSINT.NRLIB/code GuessPolynomial is now explicitly exposed in frame initial GuessPolynomial will be automatically loaded when needed from /var/zope2/var/LatexWiki/GUESSP.NRLIB/code guess(n, [1, 5, 14, 34, 69, 135, 240, 416, 686, 1106], n+->n, [guessRat], [guessSum, guessProduct, guessOne],2)$GuessInteger The function guess is not implemented in GuessInteger .
z:=sum(myfn(x),x=1..10) -- This fails, why?
The reason this fails is because Axiom tries to evaluate
myfn(x) first. But x is not yet an Integer so Axiom
cannot compute myfn(x). I guess you were expecting Axiom
to "wait" and not evaluate myfn(x) until after x has
been assigned the value 1, right? But Axiom does not work
this way.
The solution is to write myfn(x) so that is can be applied
to something symbolic like x. For example something this:
axiommyfn(i : Expression Integer) : Expression Integer == i Function declaration myfn : Expression Integer -> Expression Integer has been added to workspace.
Type: Void
axiommyfn(x)
axiom
Compiling function myfn with type Expression Integer -> Expression
Integer | (4) |
Type: Expression Integer
axiomz:=sum(myfn(x),x=1..10)
 | (5) |
Type: Expression Integer
Hi Bill:
Thanks for your quick response. I tried to respond to this earlier, but didn't see it in the sand box, please forgive me if you get multiple copies.
I tried to simplify the code from my original program, and generated a univariate function, however my actual code has a multivariate function, and your excellent hint on the use of the Expression qualifier on the parameter and return type which works great for the univariate function case appears to fail for multivarite functions. Please consider the following example.
axioma(n : Expression Integer, k : Expression Integer, p : Expression Float) : Expression Float == binomial(n,k) * p**(k) * (1.0-p)**(n-k) Function declaration a : (Expression Integer,Expression Integer, Expression Float) -> Expression Float has been added to workspace.
Type: Void
axiomoutput(a(4,3,0.25)) -- see that the function actually evaluates for sensible values
axiom
Compiling function a with type (Expression Integer,Expression
Integer,Expression Float) -> Expression Float
0.046875Type: Void
axiomz := sum(a(4,i,0.25), i=1..3) --- this fails There are 6 exposed and 2 unexposed library operations named sum having 2 argument(s) but none was determined to be applicable. Use HyperDoc Browse, or issue )display op sum to learn more about the available operations. Perhaps package-calling the operation or using coercions on the arguments will allow you to apply the operation. Cannot find a definition or applicable library operation named sum with argument type(s) Expression Float SegmentBinding PositiveInteger Perhaps you should use "@" to indicate the required return type, or "$" to specify which version of the function you need. output(z) 55
Type: Void
I did notice in the Axiom online book, chapter 6.6, around page 241, the recommendation to use untyped functions, which appears to allow Axiom to do inference on parameter and result type.
axiomb(n, k, p) == binomial(n,k) * p**(k) * (1.0-p)**(n-k)
Type: Void
axiomoutput(b(4,3,0.25)) -- see that the function actually evaluates for sensible values
axiom
Compiling function b with type (PositiveInteger,PositiveInteger,
Float) -> Float
0.046875Type: Void
axiomz := sum(b(4,i,0.25), i=1..3) --- this fails
axiom
Compiling function b with type (PositiveInteger,Variable i,Float)
-> Expression Float
There are 6 exposed and 2 unexposed library operations named sum
having 2 argument(s) but none was determined to be applicable.
Use HyperDoc Browse, or issue
)display op sum
to learn more about the available operations. Perhaps
package-calling the operation or using coercions on the arguments
will allow you to apply the operation.
Cannot find a definition or applicable library operation named sum
with argument type(s)
Expression Float
SegmentBinding PositiveInteger
Perhaps you should use "@" to indicate the required return type,
or "$" to specify which version of the function you need.
output(z)
55Type: Void
For univariate functions the approach
axiomc(k) == binomial(4,k) * 0.25**k * (1.0 - 0.25)**(4-k) -- This approach is only a test, but is not suitable for my program
Type: Void
axiomoutput(c(3)) -- test to see if function can be evaluated for sensible arguments
axiom
Compiling function c with type PositiveInteger -> Float 0.046875
Type: Void
axiomz := sum(c(i), i=1..3) -- still doesn't work
axiom
Compiling function c with type Variable i -> Expression Float
There are 6 exposed and 2 unexposed library operations named sum
having 2 argument(s) but none was determined to be applicable.
Use HyperDoc Browse, or issue
)display op sum
to learn more about the available operations. Perhaps
package-calling the operation or using coercions on the arguments
will allow you to apply the operation.
Cannot find a definition or applicable library operation named sum
with argument type(s)
Expression Float
SegmentBinding PositiveInteger
Perhaps you should use "@" to indicate the required return type,
or "$" to specify which version of the function you need.
output(z)
55Type: Void
But interestingly something like
axiomd(k) == 1.5 * k -- coerce uotput to be a Float
Type: Void
axiomz := sum(d(i), i=1..3) -- This works!
axiom
Compiling function d with type Variable i -> Polynomial Float
 | (6) |
Type: Fraction Polynomial Float
axiomoutput(z) 9.0
Type: Void
Bill, thanks again for your quick help, unforutnatly I lack a local Axiom expert, any ideas would really be welcome here.
Try thisaxiomz := reduce(+,[b(4,i,0.25) for i in 1..3])
 | (7) |
Type: Float
Handling the result from functions returning a matrix --Bill (Name omitted), Mon, 27 Mar 2006 08:10:26 -0600 reply
Hi all:
Thanks Bill Page for your help, it is much appreciated (although I used a for loop and not reduce :-)).
I'm having a bit of difficulty getting a Function returning a matrix to work as expected, perhaps it is just cockpit error, but I don't see the error of my ways.
axiomCFM(Q : Matrix(Float)): Matrix(Float) == x := nrows(Q) MyIdentityMatrix : Matrix(Float) := new(x, x, 0) for i in 1..nrows(MyIdentityMatrix) repeat MyIdnetityMatrix(i,i) := 1.0 Ninv := MyIdnetityMatrix - Q N := inverse(Ninv) N Function declaration CFM : Matrix Float -> Matrix Float has been added to workspace.
Type: Void
axiom--test ComputeFundamentalMatrix X := matrix[[0, 0.5, 0],[0.5, 0, 0.5],[0, 0.5, 0]]
 | (8) |
Type: Matrix Float
axiomoutput(X) +0.0 0.5 0.0+ | | |0.5 0.0 0.5| | | +0.0 0.5 0.0+
Type: Void
axiomN := CFM(X) The form on the left hand side of an assignment must be a single variable, a Tuple of variables or a reference to an entry in an object supporting the setelt operation. output(N) N
Type: Void
Any ideas where I'm blowing it here? I tried explicitly setting N to be a Matrix type but that failed too.
axiomCFM(Q : Matrix(Float)): Matrix(Float) == x := nrows(Q) MyIdentityMatrix : Matrix(Float) := new(x, x, 0) for i in 1..nrows(MyIdentityMatrix) repeat MyIdnetityMatrix(i,i) := 1.0 Ninv := MyIdnetityMatrix - Q N := inverse(Ninv) N Function declaration CFM : Matrix Float -> Matrix Float has been added to workspace. Compiled code for CFM has been cleared. 1 old definition(s) deleted for function or rule CFM
Type: Void
axiom--test ComputeFundamentalMatrix X := matrix[[0, 0.5, 0],[0.5, 0, 0.5],[0, 0.5, 0]]
 | (9) |
Type: Matrix Float
axiomoutput(X) +0.0 0.5 0.0+ | | |0.5 0.0 0.5| | | +0.0 0.5 0.0+
Type: Void
axiomN : Matrix(Float) := CFM(X) The form on the left hand side of an assignment must be a single variable, a Tuple of variables or a reference to an entry in an object supporting the setelt operation. output(N) N is declared as being in Matrix Float but has not been given a value.
Thanks again for all your help.
Regards:
Bill M. (Sorry, my unique last name attracts too much spam).
although I used a for loop and not reduce :-)
Good thinking. ;)
You have a simple typographical error. You have written both:
MyIdentityMatrix
and :
MyIdnetityMatrix
BTW, instead of the complicated construction of the identify matrix you should just write:
Ninv := 1 - Q
For matrices 1 denotes the identity.
axiom)set output tex off )set output algebra on FunFun := x**4 - 6* x**3 + 11* x*x + 2* x + 1 4 3 2 (28) x - 6x + 11x + 2x + 1
Type: Polynomial Integer
axiomradicalSolve(FunFun) (29) [ x = - ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 - 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 30 |--------------------- - 169 3| +-+ \| 27\|3 * ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 15 |--------------------- + 169 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 - 144 |--------------------- 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 * ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 15 |--------------------- + 169 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +-------------------------------------------------------------+ | +---------------------+2 +---------------------+ | | +-+ +----+ | +-+ +----+ | |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 |9 |--------------------- + 15 |--------------------- + 169 | 3| +-+ 3| +-+ | \| 27\|3 \| 27\|3 |------------------------------------------------------------- + 3 | +---------------------+ | | +-+ +----+ | |2069\|3 + 144\|- 79 | 9 |--------------------- | 3| +-+ \| \| 27\|3 / 2 , x = ROOT +---------------------+2 +---------------------+ | +-+ +----+ | +-+ +----+ |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 - 9 |--------------------- + 30 |--------------------- 3| +-+ 3| +-+ \| 27\|3 \| 27\|3 + - 169 * ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 15 |--------------------- + 169 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 - 144 |--------------------- 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 * +-------------------------------------------------------------+ | +---------------------+2 +---------------------+ | | +-+ +----+ | +-+ +----+ | |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 |9 |--------------------- + 15 |--------------------- + 169 | 3| +-+ 3| +-+ | \| 27\|3 \| 27\|3 |------------------------------------------------------------- | +---------------------+ | | +-+ +----+ | |2069\|3 + 144\|- 79 | 9 |--------------------- | 3| +-+ \| \| 27\|3 + +-------------------------------------------------------------+ | +---------------------+2 +---------------------+ | | +-+ +----+ | +-+ +----+ | |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 |9 |--------------------- + 15 |--------------------- + 169 | 3| +-+ 3| +-+ | \| 27\|3 \| 27\|3 |------------------------------------------------------------- + 3 | +---------------------+ | | +-+ +----+ | |2069\|3 + 144\|- 79 | 9 |--------------------- | 3| +-+ \| \| 27\|3 / 2 , x = - ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 - 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 30 |--------------------- - 169 3| +-+ \| 27\|3 * ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 15 |--------------------- + 169 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 144 |--------------------- 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 * ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 15 |--------------------- + 169 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +-------------------------------------------------------------+ | +---------------------+2 +---------------------+ | | +-+ +----+ | +-+ +----+ | |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 |9 |--------------------- + 15 |--------------------- + 169 | 3| +-+ 3| +-+ | \| 27\|3 \| 27\|3 - |------------------------------------------------------------- + 3 | +---------------------+ | | +-+ +----+ | |2069\|3 + 144\|- 79 | 9 |--------------------- | 3| +-+ \| \| 27\|3 / 2 , x = ROOT +---------------------+2 +---------------------+ | +-+ +----+ | +-+ +----+ |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 - 9 |--------------------- + 30 |--------------------- 3| +-+ 3| +-+ \| 27\|3 \| 27\|3 + - 169 * ROOT +---------------------+2 | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 15 |--------------------- + 169 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 + +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 144 |--------------------- 3| +-+ \| 27\|3 / +---------------------+ | +-+ +----+ |2069\|3 + 144\|- 79 9 |--------------------- 3| +-+ \| 27\|3 * +-------------------------------------------------------------+ | +---------------------+2 +---------------------+ | | +-+ +----+ | +-+ +----+ | |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 |9 |--------------------- + 15 |--------------------- + 169 | 3| +-+ 3| +-+ | \| 27\|3 \| 27\|3 |------------------------------------------------------------- | +---------------------+ | | +-+ +----+ | |2069\|3 + 144\|- 79 | 9 |--------------------- | 3| +-+ \| \| 27\|3 + +-------------------------------------------------------------+ | +---------------------+2 +---------------------+ | | +-+ +----+ | +-+ +----+ | |2069\|3 + 144\|- 79 |2069\|3 + 144\|- 79 |9 |--------------------- + 15 |--------------------- + 169 | 3| +-+ 3| +-+ | \| 27\|3 \| 27\|3 - |------------------------------------------------------------- + 3 | +---------------------+ | | +-+ +----+ | |2069\|3 + 144\|- 79 | 9 |--------------------- | 3| +-+ \| \| 27\|3 / 2 ]
Type: List Equation Expression Integer
axiom)set output tex on )set output algebra off
Matthias
axiomt:=matrix ([[0,1,1],[1,-2,2],[1,2,-1]])
 | (10) |
Type: Matrix Integer
We cat diagonalise t by finding it's eigenvalues.
axiom)set output tex off )set output algebra on e:=radicalEigenvectors(t) (31) [ +-----------------+2 +-----------------+ | +-+ +------+ | +-+ +------+ |3\|3 + \|- 1345 |3\|3 + \|- 1345 3 |----------------- - 3 |----------------- + 7 3| +-+ 3| +-+ \| 6\|3 \| 6\|3 [radval= --------------------------------------------------, radmult= 1, +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 3 |----------------- 3| +-+ \| 6\|3 radvect = [ [ [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 - 12\|3 |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +-+ +------+ |3\|3 + \|- 1345 +-+ +------+ (60\|3 + 6\|- 1345 ) |----------------- + 205\|3 + 3\|- 1345 3| +-+ \| 6\|3 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 126\|3 |----------------- 3| +-+ \| 6\|3 ] , [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 6\|3 |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +-+ +------+ |3\|3 + \|- 1345 +-+ +------+ (117\|3 - 3\|- 1345 ) |----------------- - 71\|3 + 9\|- 1345 3| +-+ \| 6\|3 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 126\|3 |----------------- 3| +-+ \| 6\|3 ] , [1]] ] ] , [ radval = +-----------------+2 | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 - 3) |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 + 3) |----------------- + 14 3| +-+ \| 6\|3 / +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (3\|- 3 - 3) |----------------- 3| +-+ \| 6\|3 , radmult= 1, radvect = [ [ [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 - 24\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((- 60\|- 3 - 60)\|3 - 6\|- 1345 \|- 3 - 6\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (205\|- 3 - 205)\|3 + 3\|- 1345 \|- 3 - 3\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 ] , [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 12\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((- 117\|- 3 - 117)\|3 + 3\|- 1345 \|- 3 + 3\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (- 71\|- 3 + 71)\|3 + 9\|- 1345 \|- 3 - 9\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 ] , [1]] ] ] , [ radval = +-----------------+2 | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 + 3) |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 - 3) |----------------- - 14 3| +-+ \| 6\|3 / +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (3\|- 3 + 3) |----------------- 3| +-+ \| 6\|3 , radmult= 1, radvect = [ [ [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 - 24\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((60\|- 3 - 60)\|3 + 6\|- 1345 \|- 3 - 6\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (- 205\|- 3 - 205)\|3 - 3\|- 1345 \|- 3 - 3\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 ] , [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 12\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((117\|- 3 - 117)\|3 - 3\|- 1345 \|- 3 + 3\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (71\|- 3 + 71)\|3 - 9\|- 1345 \|- 3 - 9\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 ] , [1]] ] ] ]
Type: List Record(radval: Expression Integer,radmult: Integer,radvect: List Matrix Expression Integer)
axiomd:=diagonalMatrix([e.1.radval,e.2.radval,e.3.radval]) Function definition for d is being overwritten. Compiled code for d has been cleared. (32) +-----------------+2 +-----------------+ | +-+ +------+ | +-+ +------+ |3\|3 + \|- 1345 |3\|3 + \|- 1345 3 |----------------- - 3 |----------------- + 7 3| +-+ 3| +-+ \| 6\|3 \| 6\|3 [[--------------------------------------------------,0,0], +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 3 |----------------- 3| +-+ \| 6\|3 [0, +-----------------+2 | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 - 3) |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 + 3) |----------------- + 14 3| +-+ \| 6\|3 / +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (3\|- 3 - 3) |----------------- 3| +-+ \| 6\|3 , 0] , [0, 0, +-----------------+2 | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 + 3) |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (- 3\|- 3 - 3) |----------------- - 14 3| +-+ \| 6\|3 / +-----------------+ | +-+ +------+ +---+ |3\|3 + \|- 1345 (3\|- 3 + 3) |----------------- 3| +-+ \| 6\|3 ] ]
Type: Matrix Expression Integer
Now prove it by constructing the simularity transformation from the eigenvectors:
axiomp:=horizConcat(horizConcat(e.1.radvect.1,e.2.radvect.1),e.3.radvect.1) (33) [ [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 - 12\|3 |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +-+ +------+ |3\|3 + \|- 1345 +-+ +------+ (60\|3 + 6\|- 1345 ) |----------------- + 205\|3 + 3\|- 1345 3| +-+ \| 6\|3 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 126\|3 |----------------- 3| +-+ \| 6\|3 , +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 - 24\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((- 60\|- 3 - 60)\|3 - 6\|- 1345 \|- 3 - 6\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (205\|- 3 - 205)\|3 + 3\|- 1345 \|- 3 - 3\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 , +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 - 24\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((60\|- 3 - 60)\|3 + 6\|- 1345 \|- 3 - 6\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (- 205\|- 3 - 205)\|3 - 3\|- 1345 \|- 3 - 3\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 ] , [ +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 6\|3 |----------------- 3| +-+ \| 6\|3 + +-----------------+ | +-+ +------+ +-+ +------+ |3\|3 + \|- 1345 +-+ +------+ (117\|3 - 3\|- 1345 ) |----------------- - 71\|3 + 9\|- 1345 3| +-+ \| 6\|3 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 126\|3 |----------------- 3| +-+ \| 6\|3 , +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 12\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((- 117\|- 3 - 117)\|3 + 3\|- 1345 \|- 3 + 3\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (- 71\|- 3 + 71)\|3 + 9\|- 1345 \|- 3 - 9\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 , +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 12\|3 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ ((117\|- 3 - 117)\|3 - 3\|- 1345 \|- 3 + 3\|- 1345 ) * +-----------------+ | +-+ +------+ |3\|3 + \|- 1345 |----------------- 3| +-+ \| 6\|3 + +---+ +-+ +------+ +---+ +------+ (71\|- 3 + 71)\|3 - 9\|- 1345 \|- 3 - 9\|- 1345 / +-----------------+2 | +-+ +------+ +-+ |3\|3 + \|- 1345 252\|3 |----------------- 3| +-+ \| 6\|3 ] , [1,1,1]]
Type: Matrix Expression Integer
axiomp*d*inverse(p) +0 1 1 + | | (34) |1 - 2 2 | | | +1 2 - 1+
Type: Matrix Expression Integer
axiom)set output tex on )set output algebra off
\end{axiom}
Axiom can't integrame exp(x^4) ;(axiomintegrate(exp(x**4),x)
 | (11) |
Type: Union(Expression Integer,...)
But Maple can...
axiomf(x) == (1/4)*x*(-Gamma(1/4,-x**4)*Gamma(3/4)+%pi*sqrt(2))/((-x**4)**(1/4)*Gamma(3/4))
Type: Void
axiomD(f(x),x)
axiom
Compiling function f with type Variable x -> Expression DoubleFloat
 | (12) |
Type: Expression DoubleFloat?
This is not a big surprise: note that Gamma(x,y) is not an elementary function.
Martin
This is both obviously wrong since the integrand is a positive function:axiomintegrate(1/(1+x^4),x=%minusInfinity..%plusInfinity)
 | (13) |
Type: Union(f1: OrderedCompletion? Expression Integer,...)
axiomnumeric(integrate(1/(1+x^4),x=0..1))
 | (14) |
Type: Float
axiom)clear co All user variables and function definitions have been cleared. All )browse facility databases have been cleared. Internally cached functions and constructors have been cleared. )clear completely is finished. n := 32
 | (15) |
Type: PositiveInteger?
axiomy : FARRAY INT := new(n,1)
 | (16) |
Type: FlexibleArray? Integer
axiomn0 := n
 | (17) |
Type: PositiveInteger?
axiomn1 := sum(x^1, x=0..n-1)
 | (18) |
Type: Fraction Polynomial Integer
axiomn2 := sum(x^2, x=0..n-1)
 | (19) |
Type: Fraction Polynomial Integer
axiomn3 := sum(x^3, x=0..n-1)
 | (20) |
Type: Fraction Polynomial Integer
axiomn4 := sum(x^4, x=0..n-1)
 | (21) |
Type: Fraction Polynomial Integer
axiomA := matrix([[n4, n3, n2],_ [n3, n2, n1],_ [n2, n1, n0]])
 | (22) |
Type: Matrix Fraction Polynomial Integer
axiomX := vector([x1, x2, x3])
 | (23) |
axiomB := vector([sum(x^2* u, x=0..n-1),_ sum(x* v, x=0..n-1),_ sum( w, x=0..n-1)])
 | (24) |
Type: Vector Fraction Polynomial Integer
axiomsolve([A * X = B], [x1, x2, x3]) There are 18 exposed and 3 unexposed library operations named solve having 2 argument(s) but none was determined to be applicable. Use HyperDoc Browse, or issue )display op solve to learn more about the available operations. Perhaps package-calling the operation or using coercions on the arguments will allow you to apply the operation. Cannot find a definition or applicable library operation named solve with argument type(s) List Equation Vector Fraction Polynomial Integer List OrderedVariableList [x1,x2,x3] Perhaps you should use "@" to indicate the required return type, or "$" to specify which version of the function you need.
axiomintegrate(1/((x+t)*sqrt(1+(x*t)**2)),t=0..%plusInfinity,"noPole")
 | (25) |
Type: Union(f1: OrderedCompletion? Expression Integer,...)
axiomsubst(%,x=1)
 | (26) |
Type: Expression Integer
axiomintegrate(1/((1+t)*sqrt(1+(1*t)**2)),t=0..%plusInfinity,"noPole")
 | (27) |
Type: Union(f1: OrderedCompletion? Expression Integer,...)
axiomsimplify(%-subst((asinh(x^2)+asinh(1/x^2))/sqrt(1+x^4),x=1))
 | (28) |
Type: Expression Integer
axiom%::Expression Float
 | (29) |
Type: Expression Float
axioma := matrix([ [-1,0,0,0,1,0], [0,1,0,0,0,0], [0,0,2,0,0,-2], [0,0,0,4,0,0], [0,0,0,0,3,0], [0,0,-3,0,0,3]])
 | (30) |
Type: Matrix Integer
axiomdeterminant(a)
 | (31) |
Type: NonNegativeInteger?
axiominverse(a)
 | (32) |
Type: Union("failed",...)
a := matrix([ [-3,1,1,1]?, [1,1,1,1]?, [1,1,1,1]?, [1,1,1,1]]?)
axiomAs := matrix([ [-3,1,1,1], [1,1,1,1], [1,1,1,1], [1,1,1,1]])
 | (33) |
Type: Matrix Integer
axiomA := subMatrix(As, 2,4,2,4)
 | (34) |
Type: Matrix Integer
axiomob := orthonormalBasis(A)
 | (35) |
Type: List Matrix Expression Integer
axiomP : Matrix(Expression Integer) := new(3,3,0)
 | (36) |
Type: Matrix Expression Integer
axiomsetsubMatrix!(P,1,1,ob.3)
 | (37) |
Type: Matrix Expression Integer
axiomsetsubMatrix!(P,1,2,ob.1)
 | (38) |
Type: Matrix Expression Integer
axiomsetsubMatrix!(P,1,3,ob.2)
 | (39) |
Type: Matrix Expression Integer
axiomPt := transpose(P)
 | (40) |
Type: Matrix Expression Integer
axiomPs : Matrix(Expression Integer) := new(4,4,0)
 | (41) |
Type: Matrix Expression Integer
axiomPs(1,1) := 1
 | (42) |
Type: Expression Integer
axiomsetsubMatrix!(Ps,2,2,P)
 | (43) |
Type: Matrix Expression Integer
axiomPsT := transpose(Ps)
 | (44) |
Type: Matrix Expression Integer
axiomPsTAsPs := PsT * As * Ps
 | (45) |
Type: Matrix Expression Integer
axiomb1 := PsTAsPs(2,1)
 | (46) |
Type: Expression Integer
axioml1 := PsTAsPs(2,2)
 | (47) |
Type: Expression Integer
axiomUs : Matrix(Expression Integer) := new(4,4,0)
 | (48) |
Type: Matrix Expression Integer
axiomUs(1,1) := 1
 | (49) |
Type: Expression Integer
axiomUs(2,2) := 1
 | (50) |
Type: Expression Integer
axiomUs(3,3) := 1
 | (51) |
Type: Expression Integer
axiomUs(4,4) := 1
 | (52) |
Type: Expression Integer
axiomUs(2,1) := -b1 / l1
 | (53) |
Type: Expression Integer
axiomPsUs := Ps * Us
 | (54) |
Type: Matrix Expression Integer
axiomPsUsT := transpose(PsUs)
 | (55) |
Type: Matrix Expression Integer
axiomPsUsTAsPsUs := PsUsT * As * PsUs
 | (56) |
Type: Matrix Expression Integer
axiomC := inverse(PsUs)
 | (57) |
Type: Union(Matrix Expression Integer,...)
axiomc := PsUsTAsPsUs(1,1)
 | (58) |
Type: Expression Integer
axiomgQ := PsUsTAsPsUs / c
 | (59) |
Type: Matrix Expression Integer
axiomx1 := transpose(matrix([[1,2,3,4]]))
 | (60) |
Type: Matrix Integer
axiomv1 := transpose(x1) * As * x1
 | (61) |
Type: Matrix Integer
axiomx2 := C * x1
 | (62) |
Type: Matrix Expression Integer
axiomv2 := transpose(x2) * PsUsTAsPsUs * x2
 | (63) |
Type: Matrix Expression Integer
axiomdraw(y**2/2+(x**2-1)**2/4-1=0, x,y, range ==[-2..2, -1..1]) There are 20 exposed and 18 unexposed library operations named ** having 2 argument(s) but none was determined to be applicable. Use HyperDoc Browse, or issue )display op ** to learn more about the available operations. Perhaps package-calling the operation or using coercions on the arguments will allow you to apply the operation. Cannot find a definition or applicable library operation named ** with argument type(s) FlexibleArray Integer PositiveInteger Perhaps you should use "@" to indicate the required return type, or "$" to specify which version of the function you need.
axiomf1 := taylor(1 - x**2,x = 0)
 | (64) |
Type: UnivariateTaylorSeries?(Expression Integer,x,0)
axiomasin f1
 | (65) |
Type: UnivariateTaylorSeries?(Expression Integer,x,0)
axiomsin %
 | (66) |
Type: UnivariateTaylorSeries?(Expression Integer,x,0)
SandboxMSkuce?
axiom1+1
 | (67) |
Type: PositiveInteger?
axiomintegrate((x-1)/log(x), x)
 | (68) |
Type: Union(Expression Integer,...)
axiomintegrate(x*exp(x)*sin(x),x)
 | (69) |
Type: Union(Expression Integer,...)
axiom[p for p in primes(2,1000)|(p rem 16)=1]
 | (70) |
Type: List Integer
axiom[p**2+1 for p in primes(2,100)]
 | (71) |
Type: List Integer
axiomintegrate (2x^2 + 2x, x) Cannot find a definition or applicable library operation named 2 with argument type(s) Variable x Perhaps you should use "@" to indicate the required return type, or "$" to specify which version of the function you need.
axiomradix(36,37)
 | (72) |
Type: RadixExpansion? 37
Is it error?
(better) example (with axiom markers this time) ;-) --pbwagner, Mon, 10 Sep 2007 13:01:48 -0500 reply
axiomintegrate(log(log(x)),x)
 | (73) |
Type: Union(Expression Integer,...)