Hi guys!!!I have a question..How can I show that the function that has the following identities:
\(\displaystyle \bullet\) \(\displaystyle f(x)\neq 0\) ,\(\displaystyle x\in\mathbb{R}\).
\(\displaystyle \bullet\) \(\displaystyle f(0)=f\left(\dfrac{2}{3}\right)\).
\(\displaystyle \int_{0}^{x}\frac{f(t)f(x-t)}{f(\frac{2+t}{3})f(\frac{2+x-t}{3})}=\int_{0}^{x}\frac{f^2{(t)}}{f^2{(\frac{2+t}{3}})}\)
is f(x)=c..??
That's what I did:
=>\(\displaystyle \int_{0}^{x}\frac{f(t)f(x-t)}{f(\frac{2+t}{3})f(\frac{2+x-t}{3})}=\int_{0}^{x}\frac{f^2{(t)}}{f^2{(\frac{2+t}{3}})}\)
\(\displaystyle \frac{f(x)f(0)}{f(\frac{2+x}{3})f(\frac{2}{3})}\)=\(\displaystyle \frac{f^2{(x)}}{f^2(\frac{2+x}{3})}\) .
Because \(\displaystyle f(0)=f(\frac{2}{3})\)
\(\displaystyle \frac{f(x)}{f(\frac{2+x}{3})}=\frac{f^{2}(x)}{f^2(\frac{2+x}{3}){}}\)
=> \(\displaystyle f^2{(\frac{2+x}{3})}f(x)=f^2{(x)}f{(\frac{2+x}{3})}\)
=>\(\displaystyle f{(\frac{2+x}{3})}=f(x)\) , \(\displaystyle f(x) \neq 0\)
=>f(x)=c
Can I find the derivative \(\displaystyle \int_{0}^{x}\frac{f(t)f(x-t)}{f(\frac{2+t}{3})f(\frac{2+x-t}{3})}=\int_{0}^{x}\frac{f^2{(t)}}{f^2{(\frac{2+t}{3}})}\) without using any theorem??
Also,how can I prove that \(\displaystyle f{(\frac{2+x}{3})}=f(x)\)=>f(x)=c??
I hope you can help me...Thanks in advance!
\(\displaystyle \bullet\) \(\displaystyle f(x)\neq 0\) ,\(\displaystyle x\in\mathbb{R}\).
\(\displaystyle \bullet\) \(\displaystyle f(0)=f\left(\dfrac{2}{3}\right)\).
\(\displaystyle \int_{0}^{x}\frac{f(t)f(x-t)}{f(\frac{2+t}{3})f(\frac{2+x-t}{3})}=\int_{0}^{x}\frac{f^2{(t)}}{f^2{(\frac{2+t}{3}})}\)
is f(x)=c..??
That's what I did:
=>\(\displaystyle \int_{0}^{x}\frac{f(t)f(x-t)}{f(\frac{2+t}{3})f(\frac{2+x-t}{3})}=\int_{0}^{x}\frac{f^2{(t)}}{f^2{(\frac{2+t}{3}})}\)
\(\displaystyle \frac{f(x)f(0)}{f(\frac{2+x}{3})f(\frac{2}{3})}\)=\(\displaystyle \frac{f^2{(x)}}{f^2(\frac{2+x}{3})}\) .
Because \(\displaystyle f(0)=f(\frac{2}{3})\)
\(\displaystyle \frac{f(x)}{f(\frac{2+x}{3})}=\frac{f^{2}(x)}{f^2(\frac{2+x}{3}){}}\)
=> \(\displaystyle f^2{(\frac{2+x}{3})}f(x)=f^2{(x)}f{(\frac{2+x}{3})}\)
=>\(\displaystyle f{(\frac{2+x}{3})}=f(x)\) , \(\displaystyle f(x) \neq 0\)
=>f(x)=c
Can I find the derivative \(\displaystyle \int_{0}^{x}\frac{f(t)f(x-t)}{f(\frac{2+t}{3})f(\frac{2+x-t}{3})}=\int_{0}^{x}\frac{f^2{(t)}}{f^2{(\frac{2+t}{3}})}\) without using any theorem??
Also,how can I prove that \(\displaystyle f{(\frac{2+x}{3})}=f(x)\)=>f(x)=c??
I hope you can help me...Thanks in advance!
