two variable equations number of solution.
A n'th degree equation has n solutions,thats what we know.But if there were 2 variables in the equation instead of 1 variable,what would happen?How many solutions would the equation have?I am a little uncertain, can anyone answer?
Re: two variable equations number of solution.
Any "More Than One" variables equation have infinitely many solutions! (If you allow Complex numbers)
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Re: two variable equations number of solution.
He meant the solutions are of the forms $x=\alpha y$ and so on with some complex number $\alpha$.Corei13 wrote:Any "More Than One" variables equation have infinitely many solutions! (If you allow Complex numbers)
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Nur Muhammad Shafiullah | Mahi
Re: two variable equations number of solution.
Yes, they have infinitely many solutions.
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Re: two variable equations number of solution.
thank you.Got it.