Yes. Logarithms to the base 10 are called common logarithms, and 2 is the correct common logarithm for 100.
log(36,200) = 4.558709 (rounded)log[log(36,200)] = 0.658842 (rounded)
Logarithms can be taken to any base. Common logarithms are logarithms taken to base 10; it is sometimes abbreviated to lg. Natural logarithms are logarithms taken to base e (= 2.71828....); it is usually abbreviated to ln.
It is because the logarithm function is strictly monotonic.
Common
The logarithm to the base 10 of 100 is 2, because 102 = 100.
y = 10 y = log x (the base of the log is 10, common logarithm) 10 = log x so that, 10^10 = x 10,000,000,000 = x
Natural log Common log Binary log
"Log" is not a normal variable, it stands for the logarithm function.log (a.b)=log a+log blog(a/b)=log a-log blog (a)^n= n log a
log(36,200) = 4.558709 (rounded)log[log(36,200)] = 0.658842 (rounded)
log base 10 x = logx
Logarithms can be taken to any base. Common logarithms are logarithms taken to base 10; it is sometimes abbreviated to lg. Natural logarithms are logarithms taken to base e (= 2.71828....); it is usually abbreviated to ln.
It is because the logarithm function is strictly monotonic.
Common
The logarithm to the base 10 of 100 is 2, because 102 = 100.
The 'common' log of 4 is 0.60206 (rounded) The 'natural' log of 4 is 1.3863 (rounded)
Log 0.072 =log 72/1000 =log (8)(9)/10*3 Log(2)*
logarithm of 100 = 2. If there is not a subscript number on your log, you assume it to be 10. In other words, the little subscript would be the base if you were raising it to a power, and the big number is the answer of the power. For example, log (base 10) 100 = 2 because 10 (the base) raised to a power of 2 (the log answer) = 100 (the number you just took the log of.)