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Write the expression as a single logarithm. 5logby + 6 log b x
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Write the expression as a single logarithm. 5logby + 6 log b x

User Niklasfi
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2 Answers

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Logb ((y^5)(x^6)) is the answer
User Richard Tuin
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Answer:

The given expression
5log_(b)y+6log_(b) x can be written as a single logarithm as
log_(b)(y^5x^6)

Explanation:

Consider the given expression,


5log_(b)y+6log_(b)x

Using the property of logarithm,
log_ax^n=nlog_ax

Applying reverse of above property, given expression becomes,


5log_(b)y+6log_(b)x


\Rightarrow log_(b)y^5+log_(b)x^6 ...(1)

Now again using the property of logarithm
log_(a)xy=log_ax+log_ay

(1) can be written as,


log_(b)y^5+log_(b)x^6


\Rightarrow log_(b)(y^5x^6)

Thus, the given expression
5log_(b)y+6log_(b) x can be written as a single logarithm as
log_(b)(y^5x^6)

User Flavio Moraes
by
6.3k points
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