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32 votes
32 votes
Without using logarithm tables, find value of x in the equation:

log x³+ log5x =5log2-log⅖​

User Leandra
by
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1 Answer

10 votes
10 votes

Answer:


x =2

Explanation:

Given


\log x\³+ \log5x =5\log2-\log(2)/(5)

Required

Find x

We have:


\log x\³+ \log5x =5\log2-\log(2)/(5)

Apply exponent rule


\log x\³+ \log5x =\log2^5-\log(2)/(5)


\log x\³+ \log5x =\log32 -\log(2)/(5)

Apply product and quotient rules of logarithm


\log (x\³* 5x) =\log(32 / (2)/(5))


\log (5x^4) =\log(80)

Cancel log on both sides


5x^4 = 80

Divide by 5


x^4 = 16

Take 4th roots of both sides


x =2

User Franz Holzinger
by
2.3k points