Determine constant $A$ such that $x[n] = x[n] star x[n]$

Question

Let $x[n] = Adelta[n] - frac{sin(frac{3n}{2})}{pi n}$. Determine constant $A$ such that for all $n$ $$x[n] = x[n] star x[n] tag{1}$$
I think it's not possible since $(1)$ leads to $$X(e^{jomega}) = X(e^{jomega})X(e^{jomega})$$ And this means $X(e^{jomega}) = 1$ or $X(e^{jomega}) = 0$. Also $$X(e^{jomega}) =  begin{cases} A - 1   &0le | omega| le frac{3}{2}   \ A &   frac{3}{2}lt | omega| le pi end{cases}$$
It means no value of $A$ works. I don't know whether is my answer correct. Maybe I've neglected something.

Matt L. · Answer

Systematically, you could just solve the problem by finding a solution $A$ that satisfies the following two equations:
$$(A-1)^2=A-1\A^2=A$$

Determine constant $A$ such that $x[n] = x[n] star x[n]$

One Answer

Add your own answers!

Ask a Question