Sriman Dutta Posted March 28, 2017 Posted March 28, 2017 Suppose you are given the relation that [math] a^a= b [/math] . Then how you do you proceed to find a in terms of b ? Or, the solution doesn't exist.
zztop Posted March 28, 2017 Posted March 28, 2017 Suppose you are given the relation that [math] a^a= b [/math] . Then how you do you proceed to find a in terms of b ? Or, the solution doesn't exist. Transcendental equations
Xerxes Posted March 28, 2017 Posted March 28, 2017 Irrelevant link. [math]a^a=b \Rightarrow a=\log_a b =(^a\sqrt{b})[/math]. Of course this generalizes - [math]x^y=z \Rightarrow y=log_xz\,\,\ne \,\,(^y\sqrt{z})[/math]
zztop Posted March 28, 2017 Posted March 28, 2017 (edited) Irrelevant link. [math]a^a=b \Rightarrow a=\log_a b =(^a\sqrt{b})[/math]. The link is fully relevant, he's trying to find "a" as a function of "b". You can't do that. Of course this generalizes - [math]x^y=z \Rightarrow y=log_xz\,\,\ne \,\,(^y\sqrt{z})[/math] This is a DIFFERENT problem. Do you see the difference? Edited March 28, 2017 by zztop
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