So I wonder if Maple can reduce such lines like $\frac{1}{(\textrm{can}-a-b\cdot i)^2}-\frac{1}{(\textrm{can}+\textrm{cod}-a-b \cdot i)^2}$ (assuming all variables but $i$ are real)?
Is $\frac{1}{(\textrm{can}-a-b\cdot i)^2}-\frac{1}{(\textrm{can}+\textrm{cod}-a-b \cdot i)^2}$ in any way simplifiable with Maple?
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0`can` is variable, `cod` is a variable, also `a`and`b` – 2011-09-10
2 Answers
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Writing $x = can - a - i\cdot b$ and $y = cod$, your expression is equivalent to
$\frac{1}{x^2} - \frac{1}{(x + y)^2}$
You could try reducing it to a single fraction:
$\frac{1}{x^2} - \frac{1}{(x + y)^2} = \frac{(x + y)^2 - x^2}{x^2 (x + y)^2} = \frac{2xy + y^2}{x^2 (x + y)^2} = \frac{y(2x + y)}{x^2 (x + y)^2}$
I guess you'll have to decide which one looks cleanest or works best for your purposes, but it will not get much better than what you had originally.
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Let $\mathtt{A}$ be your expression. Both $\mathtt{simplify(A)}$ and $\mathtt{evalc(A)}$ are longer than $\mathtt{A}$, so probably most people would not call them "simplifications".