SOLUTION: 16+logbase3(a^4)>0

SOLUTION: 16+logbase3(a^4)>0

Algebra.Com

Question 756055: 16+logbase3(a^4)>0
Answer by tommyt3rd(5050) (Show Source): You can put this solution on YOUR website!
logbase3(a^4)>-16
4*logbase3(a)>-16
logbase3(a)>-4
3^logbase3(a)>3^-4
a>1/81
RELATED QUESTIONS
Please help me solve for x: a) logbase12(x^2-x)=1 b) (logbase2 x)^2-6*(logbase2 x)... (answered by edjones)

Rewrite the expressions as a single logarithm with coefficient... (answered by Alan3354)

Solve: a) logbase5 6-logbase5 x=logbase5 2 b) logbase2 8-logbase2 4=x c) logbase3 27+... (answered by stanbon)

Evaluate each of the following logarithms. a) logbase7 256 b) logbase3/4... (answered by stanbon)

Solve: a) logbase3 27+ logbase3 9-logbase3 81= logbase3 x ( I think the answer is 3) b) (answered by vleith)

SOLVE for x: a) logbase3 x + logbase3 (x-8)=2 b) logbase4 (x+2)+logbase4(x-4)=2 c)... (answered by edjones)

Solve for x: logbase2(logbase3(logbase4... (answered by stanbon,josmiceli)

Solve: logbase3(logbasex(logbase4 16)) = 1 Solve: 6^2logbase6 X + logbase6 X =125... (answered by stanbon)

What is the domain for... (answered by stanbon)