If {log _4}5 = a and {log _5}6 = b, then {log | vedclass

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Question

(d) $ab = {\log _4}5.{\log _5}6 = {\log _4}6 = {1 \over 2}{\log _2}6$

$ab = {1 \over 2}(1 + {\log _2}3) \Rightarrow 2ab - 1 = {\log _2}3$

$	her

Vedclass · Accepted Answer

${1 \over {2ab - 1}}$

Vedclass · Answer

(d) $ab = {\log _4}5.{\log _5}6 = {\log _4}6 = {1 \over 2}{\log _2}6$

$ab = {1 \over 2}(1 + {\log _2}3) \Rightarrow 2ab - 1 = {\log _2}3$

$	herefore {\log _3}2 = {1 \over {2ab - 1}}$.

If ${\log _4}5 = a$ and ${\log _5}6 = b,$ then ${\log _3}2$ is equal to

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