Hello,
I'm trying to factor a symbolic expression with Laplace transforms in
it:
sage: var('s t')
(s, t)
sage: y = function('y', t)
sage: lt = laplace(diff(y, t,t) - 3*diff(y, t) + 2*y , t, s)
sage: lt
s^2*laplace(y(t), t, s) - 3*s*laplace(y(t), t, s) - s*y(0) +
2*laplace(y(t), t, s) + 3*y(0) - D
Hi all:
It looks like working with polynomial rings over transcendental field
extensions still doesn't work in Sage. Am i doing something wrong
below? The same computation works in Singular, giving the correct
answer of the ideal generated by x*y. Should i submit a Trac ticket
for this? It app
On Wed, 10 Mar 2010 12:35:28 -0800 (PST)
Harald Schilly wrote:
> On Mar 10, 9:27 pm, Gustav Delius wrote:
> > There is a surprising typesetting bug ...
>
> http://trac.sagemath.org/sage_trac/ticket/8491
Indeed this is very embarrassing. I can't believe I missed this, or
it wasn't caught by any
On Mar 10, 9:27 pm, Gustav Delius wrote:
> There is a surprising typesetting bug ...
http://trac.sagemath.org/sage_trac/ticket/8491
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There is a surprising typesetting bug in the sage 4.3.3 notebook
interface, as it is running on sagenb.org, for example. If the Typset
checkbox is ticked and one evaluates something like
6.5/x
one gets
1/x
So any floating point number is convered to 1 when it is divided by a
symbolic variable.
On Mar 10, 2010, at 11:53 AM, Eckhard Kosin wrote:
Hi all,
I just installed Sage and now I'm working through the tutorial.
However, inside notebook I'm unable to generate 3d plots: Issuing i.e.
x,y = var('x,y')
plot3d(x^2 + y^2, (x,-2,2), (y,-2,2))
only yields a gray square without any plots.
Thank you very much, that was a great help. Is there a way to pickle
user defined types? So that I can, say, email my advisor files
containing the sage objects.
On Mar 10, 11:25 am, William Stein wrote:
> On Wed, Mar 10, 2010 at 11:17 AM, D. Monarres wrote:
> > Hello all,
>
> > I am using a s
Hi all,
I just installed Sage and now I'm working through the tutorial.
However, inside notebook I'm unable to generate 3d plots: Issuing i.e.
x,y = var('x,y')
plot3d(x^2 + y^2, (x,-2,2), (y,-2,2))
only yields a gray square without any plots. At the right lower corner
of the square there is a l
On Wed, Mar 10, 2010 at 11:17 AM, D. Monarres wrote:
> Hello all,
>
> I am using a sage notebook interact to generate and display some
> random graphs (more specifically a self-created extension of the
> graph class with extra properties) and would like to have the chance
> to save the output. Us
Hello all,
I am using a sage notebook interact to generate and display some
random graphs (more specifically a self-created extension of the
graph class with extra properties) and would like to have the chance
to save the output. Usually the notebook makes all defined variables
global and I can s
On Mar 10, 2010, at 10:15 AM, John H Palmieri wrote:
On Mar 10, 3:23 am, slabbe wrote:
Hi,
A friend of mine wants to factorize symbolicly x^2 - 2 :
sage: p = x^2 - 2
sage: p.factor()
x^2 - 2
Apparently p.roots() gives almost what he wants :
sage: p.roots()
[(-sqrt(2), 1), (sqrt(2), 1)]
O
On Mar 10, 3:23 am, slabbe wrote:
> Hi,
>
> A friend of mine wants to factorize symbolicly x^2 - 2 :
>
> sage: p = x^2 - 2
> sage: p.factor()
> x^2 - 2
>
> Apparently p.roots() gives almost what he wants :
>
> sage: p.roots()
> [(-sqrt(2), 1), (sqrt(2), 1)]
Or
sage: p.roots(multiplicities=False)
On Mar 10, 9:39 am, wxu...@sohu.com wrote:
> Hi everyone,I want do this thing as follows in sage, is that
> OK?var('x,y,z')f=cos(x)*cos(y)+cos(y)*cos(z)+cos(z)*cos(x)and then I want to
> plot f. how can do it in sage?Thanks in advance!regards,YC
Isn't this a 4d plot? Or do you want to plot f(x,
Hi everyone,I want do this thing as follows in sage, is that
OK?var('x,y,z')f=cos(x)*cos(y)+cos(y)*cos(z)+cos(z)*cos(x)and then I want to
plot f. how can do it in sage?Thanks in advance!regards,YC
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Hello,
I get a strange error while constructing permutation from a cycle
decomposition. Is it a bug or not the right way to build a
permutation ?
{{{
sage: G = SymmetricGroup(3)
sage: G([(2,3), (1,)])
(2,3)
sage: G([(1,), (2,3)])
---
Hi,
A friend of mine wants to factorize symbolicly x^2 - 2 :
sage: p = x^2 - 2
sage: p.factor()
x^2 - 2
Apparently p.roots() gives almost what he wants :
sage: p.roots()
[(-sqrt(2), 1), (sqrt(2), 1)]
So, I just proposed him to do :
sage: Factorization([(x-r,m) for r,m in p.roots()])
(x - sqrt
Hi, is already http://trac.sagemath.org/sage_trac/ticket/8472
R.M.
On 10 bře, 08:51, Kwankyu wrote:
> Hi Dan,
>
> I worked on this. Would you review Trac 8486?
>
> http://trac.sagemath.org/sage_trac/ticket/8486
>
> Thank you in advance.
>
> Kwankyu
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Hi,
I am currently trying to switch from commercial CAS to sage.
As a physicist I need to handle non-commutative algebras, most notably Clifford
algebras.
I have read that GiNaC is pretty good in that and that sage is using a variant
called Pynac.
Does Pynac have the "non-commutative algeb
fixed at http://trac.sagemath.org/sage_trac/ticket/8487
R.M.
On 9 bře, 05:26, Markus wrote:
> Hi,
>
> when trying to compute the intersection points of 2 circles i got
> strange results.
>
> Example 1:
>
> c1(x,y)=(x-5)^2+y^2-25; c2(x,y)=(y-3)^2+x^2-9
> solve([c1(x,y)==0,c2(x,y)==0],x,y)
>
> pro
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