Let f be a function such that f"'(x) is ...

Let f be a function such that `f"'(x)` is continuous, `f(x) ge 0`, `f(0) = 0`,`f'(0)=0`, and `f"(0) gt 0` The graph of f is shown below. Find the limit as `x->0^+`of the quotient (Area under curve and above [0,x])/( Area of triangle OAP)

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