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Glen_b's@Glen_b's post already answers the question perfectly.
Useful interpretation of f$f$: If the proportion f(a)/f(b) = c$\frac{f(a)}{f(b)} = c$, this tells you that values around a$a$ are c$c$ times as frequent than values around b$b$.
Michael
Glen_b's post already answers the question perfectly.
Useful interpretation of f: If the proportion f(a)/f(b) = c, this tells you that values around a are c times as frequent than values around b.
Michael
@Glen_b's post already answers the question perfectly.
Useful interpretation of $f$: If the proportion $\frac{f(a)}{f(b)} = c$, this tells you that values around $a$ are $c$ times as frequent than values around $b$.
