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Zero function with integral inequality

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I encountered seemingly trivial question but actually I stuck with the problem.

Show that if continuous function $x(t)$ such that $t\in[0,\infty]$ satisfies inequality $0\leq x(t)\leq \alpha \int_0^t x(s) ds$ for positive $\alpha$. Then $x(t) = 0$.

real-analysis integration
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