Answered

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what is the log(45)/log(15) simplified?

Sagot :

Panoyin
[tex]\frac{log(45)}{log{(15)}} = \frac{log(9 * 5)}{log{(3 * 5)}} = \frac{log(9) + log(5)}{log(3) + log(5)} = \frac{log(3^{2}) + log(5)}{log(3) + log(5)} = \frac{2log(3) + log(5)}{log(3) + log(5)} = \frac{2log(3)}{log(3) + log(5)} + \frac{log(5)}{log(3) + log(5)}[/tex]
Sorry...I completely goofed on my previous answer. You could do what Panoyin did, but you could also remember that logbase(a)x = logbaseb(x)/logbaseb(a). Therefore, log(45)/log(15) can simplify to logbase15(45)
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