SOLUTION: With reference to the fact that the functions log2 x and 2^x undo each other, explain each of the following statements. (a) log2 0 is undefined. (b) log2 x is negative when x i

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Question 1032364: With reference to the fact that the functions log2 x and 2^x undo each other, explain each of the
following statements.
(a) log2 0 is undefined.
(b) log2 x is negative when x is between 0 and 1.
(c) log2 500 is between 8 and 9.
(d) An x can be found so that log2(x) is greater than 1, 000, 000.
in all the log2 above 2 is the power of the log . I couldn't find a way to put the correct form in here.
Answer by robertb(5830)   (Show Source): You can put this solution on YOUR website!
(a) is undefined because there is NO real number x such that .
(b) is negative when x is between 0 and 1 because, if you will notice the graph of , for , the corresponding set of pullback x-values is exactly the interval (, 0).

(c) This is easy, because .
(d) An x can be found so that is greater than 1,000,000. Indeed, = 1,048,576 > 1,000,000.
You have to remember that logarithm is just a fancy way of writing an exponent satisfying a base condition.
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