If x=log a base 2a, y=log 2a base 3a, z=3a base 4a, show that xyz+1=2y

1.	If x=log a base 2a, y=log 2a base 3a, z=3a base 4a, show that xyz+1=2yz
Answer» ong>ANSWER: x=log (a base 2a)=LOGA/(log2+loga) y=log (2a base 3a)=(log2+loga)/(log3+loga) z=log (3a base 4A)=(log3+loga)/(log4+loga) now LHS=xyz+1 put above x, y, z value ={(loga)/(log2+loga)}{(log2+loga)/(log3+loga)}{(log3+loga)/(log4+loga)}+1 =loga/(log4+loga)+1 =loga/(log4a)+1 =log (a base 4a)+1 RHS=2yz =2 {(log2+loga)/(log3+loga)}{(log3+loga)/(log4+loga)} =2 (log2+loga)/(log4+loga) =2log2a/log4a =log4a^2/log4a =log4a.a/log4a =log4a/log4a+loga/log4a =1+loga/log4a =log (a base 4a ) +1 hence LHS=RHS

If x=log a base 2a, y=log 2a base 3a, z=3a base 4a, show that xyz+1=2yz

Answer»

ong>ANSWER:

x=log (a base 2a)=LOGA/(log2+loga)

y=log (2a base 3a)=(log2+loga)/(log3+loga)

z=log (3a base 4A)=(log3+loga)/(log4+loga)

now

LHS=xyz+1

put above x, y, z value

={(loga)/(log2+loga)}{(log2+loga)/(log3+loga)}{(log3+loga)/(log4+loga)}+1

=loga/(log4+loga)+1

=loga/(log4a)+1

=log (a base 4a)+1

RHS=2yz

=2 {(log2+loga)/(log3+loga)}{(log3+loga)/(log4+loga)}

=2 (log2+loga)/(log4+loga)

=2log2a/log4a

=log4a^2/log4a

=log4a.a/log4a

=log4a/log4a+loga/log4a

=1+loga/log4a

=log (a base 4a ) +1

hence LHS=RHS

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If x=log a base 2a, y=log 2a base 3a, z=3a base 4a, show that xyz+1=2yz

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