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Select the correct answer. How would you write this expression as a sum or difference? log_(3) (^(5√(x)) X y )

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Maambmb · Answer 1 · 2022-11-13T08:42:08+0000

Answer:

$\log_(3) ({5√(x)} * y ) = \log_(3)({5) + \log_(3)(√(x)) +\log_(3)( y )$

Explanation:

Given

$\log_(3) ({5√(x)} * y )$

Required

Write as sum or difference

Using addition law of logarithm, the equation becomes:

$\log_(3) ({5√(x)} * y ) = \log_(3)({5√(x)) +\log_(3)( y )$

Expand

$\log_(3) ({5√(x)} * y ) = \log_(3)({5 * √(x)) +\log_(3)( y )$

Apply addition law

$\log_(3) ({5√(x)} * y ) = \log_(3)({5) + \log_(3)(√(x)) +\log_(3)( y )$

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