Math, asked by navsan, 1 year ago

show that log 162/343 + 2 log 7/9 - log 1/7= log 2

Answers

Answered by sukanya05

206

see this and use the properties of log .

Attachments:

Answered by DelcieRiveria

199

Answer:

Hence proved that $log(\frac{162}{343})+2log(\frac{7}{9})-log(\frac{1}{7})=log2$

Step-by-step explanation:

We have to prove

$log(\frac{162}{343})+2log(\frac{7}{9})-log(\frac{1}{7})=log2$

Left hand side,

$log(\frac{162}{343})+2log(\frac{7}{9})-log(\frac{1}{7})$

$log(\frac{162}{343})+log(\frac{7}{9})^2-log(\frac{1}{7})$ $[\because loga^b=bloga]$

$log(\frac{162}{343})+log(\frac{49}{81})-log(\frac{1}{7})$

$log(\frac{162}{343}\times \frac{49}{81})-log(\frac{1}{7})$ $[\because loga+logb=log(ab)]$

$log(\frac{2}{7})-log(\frac{1}{7})$

$log(\frac{\frac{2}{7}}{\frac{1}{7}})$ $[\because loga-logb=log(\frac{a}{b})]$

$log(\frac{2}{7}\times \frac{7}{1})$

$log(2)$

$L.H.S=R.H.S$

Hence proved.

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