SOLUTION: log(x/100)=1
Algebra.Com
Question 355368: log(x/100)=1
Answer by jsmallt9(3758) (Show Source): You can put this solution on YOUR website!
log(x/100) = 1
This is fairly simple to solve. One way to solve is starts with separating the log into two logs using the property of logarithms: :
log(x) - log(100) = 1
Since then log(100) = 2 so now we have:
log(x) - 2 = 1
Now we can isolate the log by adding 2 to each side:
log(x) = 3
At last of all we can rewrite this in exponential form. Since is equivalent to in general, your equation is equivalent to:
which simplifies to
1000 = x
RELATED QUESTIONS
log 100-log 5 = log... (answered by oscargut)
Simplify: log... (answered by Fombitz)
x=log(100)^10 (answered by MathLover1)
log x - log (x/100) =... (answered by richard1234)
evaluate.
{{{(log (1/9,27) - log (8,32))/(log (4,64) - log... (answered by Alan3354)
Solve and check
a) 2log(x-1) = 2+ log... (answered by josgarithmetic,lwsshak3)
log(log x) =... (answered by stanbon)
log(log x) =... (answered by nerdybill)
Solve for x: log 4 + 2 log x= log... (answered by lwsshak3)