# Reduce results in an error for a polynomial with real (non-integer) coefficients

In Mathematica, I tried to check some condition for a polynomial, whose parameters change in a range. My calculations are 5th order but I made a simple one to show my needs.

When I create a polynomial, which has integers as parameter, I use `Reduce` and it gives me right answer.

But when I use real numbers in the polynomial, `Reduce` doesn't work and gives this error:

Reduce was unable to solve the system with inexact coefficients. The answer was obtained by solving a corresponding exact system and numericizing the result.

Can anyone help?

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Looks fine to me... What's the answer that you were expecting? –  r.m. Nov 5 '11 at 20:07
I expect to not to see "Reduce: ratnz" error. That makes me curious about the result. –  trante Nov 5 '11 at 20:45

The `Reduce::ratnz` message is not an error, but a warning message. If you click on the `More` link or `>>`, whatever shows on your system, it'll take you to the documentation, which says:

This message is often generated when the first argument in `Reduce` includes inexact numbers. [...] The warning message can be avoided by using only exact numbers in the input to `Reduce`

Now, if you're annoyed by the message, you can turn the message off using

``````Off[Reduce::ratnz]
``````

which will turn off the warning for all further uses of `Reduce` or you can simply silence this operation using

``````Quiet@Reduce[...]
``````

If you want to avoid the message, then as the documentation says, you'll have to use exact numbers. One way is to use `Rationalize`. For example:

``````x = 1.391 + 0.771 a;
Reduce[Rationalize[x] > 0 && 1 <= a <= 80, {a}]

Out[1]= 1 <= a <= 80
``````

It gives you the output you desire, without a warning. There might be other ways depending on what exactly you're doing, but it's hard to say without knowing your exact expression. Hope this helped.

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Thank you very much –  trante Nov 14 '11 at 22:23