Respuesta :
We have to find the potential solutions to [tex] 2 ln x = 4 ln 2 [/tex] from least to greatest.
Using the properties of ln function.
[tex] a \times ln b = ln b^{a}[/tex]
Therefore, we get
[tex] ln x^{2} = ln 2^{4} [/tex]
[tex] ln x^{2} = ln 16 [/tex]
taking antilog on both the sides, we get
[tex] x^{2} = 16 [/tex]
So, [tex] x = \pm 4 [/tex]
Therefore, the potential solutions to 2 ln x = 4 ln 2 from least to greatest is -4 and 4.
