How do you solve (1/3)^x = -3 ?

1 Answer
George C.
Dec 8, 2016

x = -1 + ((2k+1)pi)/(ln(3)) i" " for any integer k

Explanation:

For any Real value of x we have (1/3)^x > 0. So there is no Real solution.

There are Complex solutions. Consider Euler's identity:

e^(ipi) = -1

Hence:

e^(i(2k+1)pi) = -1" " for any integer k

Now:

(1/3)^x = (e^(ln (1/3)))^x = e^(-xln(3))

So if " "x = -1 + ((2k+1)pi)/(ln(3)) i" " then we find:

(1/3)^x = e^(-ln(3)(-1 + ((2k+1)pi)/(ln(3)) i))

color(white)((1/3)^x) = e^(ln(3) + (2k+1)pi i)

color(white)((1/3)^x) = e^(ln(3)) * e^((2k+1)pi i)

color(white)((1/3)^x) = 3 * (-1)

color(white)((1/3)^x) = -3

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