I am trying to figure out whether the following equation is non-linear or if it's linear, how would I solve it?
$x+\frac{2}{y}=0$
It can be rewritten as $x+y^{-2}=0$ so I guess if this is non-linear.
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6 - 1$\begingroup$ Indeed, the function is not linear. $\endgroup$Arturo Magidin– Arturo Magidin2011-09-25 21:43:57 +00:00Commented Sep 25, 2011 at 21:43
- $\begingroup$ But it would be $xy+2=0$, not $x+y^{-2}=0$. $\endgroup$Ross Millikan– Ross Millikan2011-09-25 21:50:59 +00:00Commented Sep 25, 2011 at 21:50
- 1$\begingroup$ Or it would be $x + 2y^{-1}=0$. $\endgroup$Arturo Magidin– Arturo Magidin2011-09-25 21:54:56 +00:00Commented Sep 25, 2011 at 21:54
- 2$\begingroup$ But if all your $y$'s appear as denominators, you can make a linear equation system by substituting $u=1/y$. $\endgroup$hmakholm left over Monica– hmakholm left over Monica2011-09-25 22:31:35 +00:00Commented Sep 25, 2011 at 22:31
- 4$\begingroup$ @DBLim: When you are dealing with a question from a beginner that is trying to puzzle out some of the basics, please don't "correct" what was likely an error rather than a typo as an edit; it's important to point out those errors to prevent them from being committed again. If you simply edit them out, the OP may not realize he had made an algebraic error along the line. $\endgroup$Arturo Magidin– Arturo Magidin2011-09-25 22:34:29 +00:00Commented Sep 25, 2011 at 22:34
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1 Answer
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It is non-linear, and the criteria of linearity I've put in answer to your previous question. Here $f(x,y) = x+\frac2y$ and for $\alpha = 1,\beta = 1$ we have $$ f(x'+x'',y'+y'') = x'+x''+\frac2{y'}+\frac2{y''}\neq x'+x''+\frac2{y'+y''} = f(x',y')+f(x'',y'') $$ thus the equation is non-linear.
Saw the possible misprint in your question: $\frac2y\neq y^{-2} = \frac1{y^2}$.
