Question 861659
If log(5)base3=x, how do I express 2log(45)base3-(1/2)log(225)base3 in terms of x?
{{{log(3,(2log(45)))-(1/2)log(3,(225))}}}
{{{log(3,(2log(9)))+log(3,(2log(5)))-(1/2)log(3,(25))-(1/2)log(3,(9))}}}
{{{log(3,(9))=2}}}
{{{log(3,(2log(9)))+log(3,(2log(5)))-(1/2)log(3,(5^2))-(1/2)*2}}}
{{{2*2+log(3,(2log(5)))-log(3,(5))-1}}}
{{{4+2x-x-1}}}
{{{x+3}}}
note: let me know if my solution is correct, helpful and understandable.