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Solve the equation in part (a) analytically. Support the answer with a calculator graph. Then use the graph to solve the associated inequalities in parts (b) and (c).

Solve the equation in part a analytically Support the answer with a calculator graph Then use the graph to solve the associated inequalities in parts b and c class=

Respuesta :

we apply Ln and laws of exponents

[tex]\begin{gathered} 256^{3x}=64^{x+1} \\ \ln (256^{3x})=\ln (64^{x+1}) \\ 3x\ln (256)=(x+1)\ln (64) \\ \end{gathered}[/tex]

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