Question

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prove of power law of logrithem ?????


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Answer 1

Proof of Power Law of Logarithms

Power Rule of logarithm reveals that log of a quantity in exponential form is equal to the product of exponent and logarithm of base of the exponential term. is a quantity and it is expressed in exponential form as . Therefore, q = m n .

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Answer 2

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Proof of Power Law of Logarithms

Power Rule of logarithm reveals that log of a quantity in exponential form is equal to the product of exponent and logarithm of base of the exponential term. is a quantity and it is expressed in exponential form as . Therefore, q = m n .

Additional information:-

• What is the power law for logs?
• When a logarithmic term has an exponent, the logarithm power rule says that we can transfer the exponent to the front of the logarithm. Along with the product rule and the quotient rule, the logarithm power rule can be used for expanding and condensing logarithms.

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