Let h be a twice continuously differenti...

Let h be a twice continuously differentiable positive function on an open interval J. Let `g(x) = ln(h(x)` for each `x in J` Suppose `(h'(x))^2 > h''(x)h(x)` for each `x in J`. Then

g is increasing on J

g is decreasing on J

g is concave up on J

g'(x) is decreasing function

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