I am confused about notation for composition and products of a function $f$. I know that $f \circ f$ implies composition but how we will denote product of same function and whether there is another way to write $f \circ f$?
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- $\begingroup$ write parentheses if unsure which goes first, $(f\circ f) g = f(f)\cdot g$, $f\circ (g\cdot f) = f(g\cdot f)$ $\endgroup$mathreadler– mathreadler2017-08-29 16:54:42 +00:00Commented Aug 29, 2017 at 16:54
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7 The product of $f$ with itself is $f.f$, $f\times f$, or $f^2$.
answered Aug 29, 2017 at 16:49
José Carlos Santos
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- 1$\begingroup$ This would be a better Answer if you gave the contrast between notation for the product of $f$ with itself versus the composition of $f$ with itself. $\endgroup$hardmath– hardmath2017-08-29 17:12:21 +00:00Commented Aug 29, 2017 at 17:12
- $\begingroup$ Okay sir thanks and is there any other notation for (fof) ? $\endgroup$a learner– a learner2017-08-29 17:12:35 +00:00Commented Aug 29, 2017 at 17:12
- $\begingroup$ @alearner Yes: $f^{(2)}$. More generally, the composition of $f$ with itself $n$ times is denoted by $f^{(n)}$. $\endgroup$José Carlos Santos– José Carlos Santos2017-08-29 17:17:25 +00:00Commented Aug 29, 2017 at 17:17
- 1$\begingroup$ Okay sir but f^(n) can be used to denote n times differentiation of a function ,isn't it? $\endgroup$a learner– a learner2017-08-29 17:27:51 +00:00Commented Aug 29, 2017 at 17:27
- $\begingroup$ @alearner I am sorry. I made a mistake. You are right about $f^{(n)}$. The standard notation for $f$ composed with itself $n$ times is $f^n$. Of course, in a context in which $f$ can be multiplied with itself you will have to be careful. $\endgroup$José Carlos Santos– José Carlos Santos2017-08-29 17:41:02 +00:00Commented Aug 29, 2017 at 17:41