On Tue, Apr 20, 2010 at 10:55 PM, Jason Grout
wrote:
> On 04/20/2010 11:27 PM, William Stein wrote:
>
> We *really* need to change the maxima(symbolic expression) command to
>> return something with all the variables prepended with _SAGE_, and undo
>> this when converting back. Is there a ticket
On 04/20/2010 11:27 PM, William Stein wrote:
We *really* need to change the maxima(symbolic expression) command to
return something with all the variables prepended with _SAGE_, and undo
this when converting back. Is there a ticket about this already? It
would be really easy to implement. I r
On Tue, Apr 20, 2010 at 9:22 PM, Jason Grout wrote:
> On 04/20/2010 10:44 PM, Alex Leone wrote:
>
>> sage: g1 = var('g1')
>> sage: g1
>> g1
>> sage: g1.full_simplify()
>> (-1)^k*k/(4*k^2 - 1)
>>
>>
>> Where is the k coming from?!!
>>
>>
> Probably from some package that the calculus version of max
On 04/20/2010 10:44 PM, Alex Leone wrote:
sage: g1 = var('g1')
sage: g1
g1
sage: g1.full_simplify()
(-1)^k*k/(4*k^2 - 1)
Where is the k coming from?!!
Probably from some package that the calculus version of maxima loads:
-
On 04/20/2010 10:44 PM, Alex Leone wrote:
sage: g1 = var('g1')
sage: g1
g1
sage: g1.full_simplify()
(-1)^k*k/(4*k^2 - 1)
Where is the k coming from?!!
- Alex
It looks like it happens with variables starting with 'd', 'f', 'g', and
'h':
sage: v=var(",".join(['%s1'%i for i in 'abcdefgh
