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Use the properties of logarithms to write the following expression as one logarithm. Logs logr + 8logr s − 3logr t mc001-1. Jpg mc001-2. Jpg mc001-3. Jpg mc001-4. Jpg.

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Answer:

It is C On edge

Explanation:

Just took it:)

lhmarianateixeira

In this exercise we have to use the properties of the logarithm to write it in one way, like this:

[tex]log(r+s)(rs)^8/(rt)^3[/tex]

From these  recalling some properties of the logarithm, we find that:

  • When the logarithm is equal to the base, the logarithm will always be equal to 1.
  • Logarithm of any base, whose logarithm is equal to 1, will always have the result equal to 0.
  • Two logarithms with the same base are equal when the logarithms are also equal.

given the equation as:

[tex]log(s)log(r)+8log(rs)-3log(rt)\\log(s+r)+8log(rs)-3log(rt)\\logg(r+s)(rs)^8/(rt)^3[/tex]

See more about logarithm at brainly.com/question/10486788

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