How do you solve #20=50(1.04)^x#?

1 Answer
Karthik G
Dec 21, 2015

-23.36241894

The answer can be rounded up according to the requirements

Explanation:

#20 = 50(1.04)^x#

Step 1: Isolate the term containing the exponent to one side of the equation. This is achieved by dividing both sides by 50.

#20/50 = (1.04)^x#
#0.4 = (1.04)^x#

Step 2: in order to solve for "x" we have to use the power rule of logarithms i.e. #log(A^n) = nlog(A)# note you can use ln( ) or log( ) depending on your choice.

Let us take log to the base 10.

#log(0.4) = log(1.04)^x#
#log(0.4) = xlog(1.04)#

Step 3: Divide both sides by log (1.04).
#log(0.4)/log(1.04) = x#

#x=-23.36241894#

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