I have thought of $f(x)=x^2$, but it’s not always positive and it doesn’t work when $x$ or $t$ is negative.
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We have $$f(x+t)=\left[\sqrt {f(x)}+\sqrt {f(t)}\right]^2$$which leads to$$\sqrt {f(x+t)}=\sqrt {f(x)}+\sqrt {f(t)}$$since $f(x)\ge 0$. By defining $g(x)=\sqrt {f(x)}\ge0$ we obtain $$g(x+t)=g(x)+g(t)$$Therefore the final answer becomes:
$f(x)=g^2(x)$ is the general solution, provided $g(x)$ is a non-negative additive function.
Mostafa Ayaz
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Sorry, I made a mistake copying down the question, it should be f(x)>=0 – Peter Wang Aug 17 '19 at 22:39
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The equation at $x=t=0$ gives us: $f (0)=2*f (0) + 2×f (0) $. So $0 <f (0)=0$. Thus, there isn't any $f $ satisfying this.
Paul
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Sorry, I made a mistake copying down the question, it should be f(x)>=0 – Peter Wang Aug 17 '19 at 22:39