Solve the equation for x : log4+(1+1/(2x...

Solve the equation for `x : log4+(1+1/(2x))log3=log(root(x)3+27)`

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

Solve the equation for x:log4+(1+(1)/(2x))log3=log(root(z)(3)+27)

Solve the equation for x : log4+(1+1/(2x))log3=log(3^(1/x)+27)

Solve the equation for x : log4+(1+1/(2x))log3=log(3^(1/x)+27)

log4+(1+(1)/(2x))log3=log(3^((1)/(x))+27)

Solve the following equation for x: 9^(log_(3)(log_(2)x))=log_(2)x-(log_(2)x)^(2)+1

Solve the equation log(x+1)+log(x-1)=log3

Solve the following equation : log x+log3+3log 2=2log4

Solve the equations for x and y:(3x)^(log3)=(4y)^(log 4), 4 ^(log x) = 3 ^(log y) .

Solve the equations for x and y:(3x)^(log3)=(4y)^(log 4), 4 ^(log x) = 3 ^(log y) .

Solve the equations for x and y:(3x)^(log3)=(4y)^(log 4), 4 ^(log x) = 3 ^(log y) .

Recommended Questions

Solve the equation for x : log4+(1+1/(2x))log3=log(root(x)3+27)
Text Solution
|
If (3a)^(log3)=(4b)^(log4) and 4^(log a)=3^(log b), then a+b=
Text Solution
|
log x=(log3)+(log4)+(log5)
Text Solution
|
Solve : 2(log)3x-4(log)x 27lt=5 (x >1)
Text Solution
|
log4+(1+(1)/(2x))log3=log(3^((1)/(x))+27)
Text Solution
|
Solve the equation for x : log4+(1+1/(2x))log3=log(root(x)3+27)
Text Solution
|
Solve the equations for x and y:(3x)^(log3)=(4y)^(log 4), 4 ^(log x) ...
Text Solution
|
Evaluate:lim(x rarr -1) (logx^(2)-log((1)/(x^(4)))+log3)/(log((x^(3))/...
Text Solution
|
Solve the equations for x and y:(3x)^(log3)=(4y)^(log 4), 4 ^(log x) ...
Text Solution
|