In Example 5(b), we compared the functions √✓logx and log √√x. Show that these functions take the same value for x = 10,000.

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Chapter2: Second-order Linear Odes
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12. In Example 5(b), we compared the functions √log x and
log√x. Show that these functions take the same value
for x = 10,000.
Transcribed Image Text:12. In Example 5(b), we compared the functions √log x and log√x. Show that these functions take the same value for x = 10,000.
Expert Solution
Step 1

What is Logarithmic Function:

In mathematics, the opposite of exponentiation is the logarithm. This means that the logarithm of a fixed number, base b, represents the exponent to which that fixed number must be raised in order to create a particular number x. In the simplest case, the logarithm records how many times the same factor appears throughout repeated multiplication. The notion that the logarithm is the opposite of exponentiation is also applicable to other mathematical systems. But in contexts, the logarithm frequently has various values.

Given:

Two functions logx and logx are given.

To Determine:

We prove that the two functions take same value at x=10000.

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