Difference between revisions of "Q-derivative power rule"

Revision as of 18:28, 20 September 2016

The following formula holds: $$D_q(z^n)=[n]_q z^{n-1},$$ where $D_q$ denotes the $q$-derivative and $[n]_q$ denotes the $q$-number.

@@ Line 2: / Line 2: @@
 The following formula holds:
 $$D_q(z^n)=[n]_q z^{n-1},$$
-where $D_q$ denotes the [[q-derivative|$q$-derivative]] and $[n]_q$ denotes the [[q-factorial|$q$-factorial]].
+where $D_q$ denotes the [[q-derivative|$q$-derivative]] and $[n]_q$ denotes the [[q-number|$q$-number]].
 ==Proof==