How do you solve -2=log_x (1/100)?

1 Answer
Karthik G
Dec 21, 2015

x= 10

Explanation:

-2 = log_x (1/100)

There are many ways you can solve this problem. The best approach is to convert the given equation to exponent form.

Rule : log_b (a) = k => a= k^b

Using the rule we can get

x^-2 = 1/100
x^-2 =1/10^2
x^-2 = 10^-2 Rule 1/a^m = a^-m

x= 10 The final answer.

Alternate approach

-2 = log_x (1/100)
-2 = log_x (10^-2)
-2 = -2 log_x (10) Rule log(A)^n = n log(A)
1 = log_x (10)
x =10 because of the rule log_a (a) = 1 x has to be 10.

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