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I am trying to solve symbolically a simple equation for x:

solve(x^K + d == R, x)

I am declaring these variables and assumptions:

var('K, d, R')
assume(K>0)
assume(K, 'real')
assume(R>0)
assume(R<1)
assume(d<R)

assumptions()
︡> [K > 0, K is real, R > 0, R < 1, d < R]

Yet when I run the solve, I obtain the following error:

Error in lines 1-1

Traceback (most recent call last):

File "/projects/sage/sage-7.3/local/lib/python2.7/site-packages/smc_sagews/sage_server.py", line 957, in execute exec compile(block+'\n', '', 'single') in namespace, locals

...

File "/projects/sage/sage-7.3/local/lib/python2.7/site-packages/sage/interfaces/interface.py", line 671, in init raise TypeError(x)

TypeError: Computation failed since Maxima requested additional constraints; using the 'assume' command before evaluation may help (example of legal syntax is 'assume(K>0)', see assume? for more details)

Is K an integer?

Apparently, maxima is asking whether K is an integer? But I explicitly declared it 'real'! How can I spell out to maxima that it should not assume that K is an integer?

I am simply expecting (R-d)^(1/K) or exp(log(R-d)/K) as answer.

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The assumption framework in both Sage and Maxima is fairly weak, though in this case it doesn't matter, since integers are real numbers, right?

However, you might want to try assume(K,'noninteger') because apparently Maxima does support this particular assumption (I had not seen it before). I can't try this right now, unfortunately, good luck!

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  • Perfect, it worked as expected! Thanks, somehow it did not come up in my googling! – asachet Sep 21 '16 at 13:41
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    Awesome. The noninteger parameter is not in the Sage doc, as far as I know, only the Maxima one; I've opened trac.sagemath.org/ticket/21554 to add it to the doc. (PS if this indeed answers please accept so that future visitors know this worked without reading the comments.) – kcrisman Sep 21 '16 at 14:40
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    Done - before accepting I wanted to check that my actual code was working fine as well (I posted a toy example only) and it does, thanks again. – asachet Sep 21 '16 at 16:14

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