Logarithmic functions
Summary
- For a given \(x∈(0,∞)\) we define a function \(y=log x\) called the natural (logarithm) as follows:
- Find the unique value \(y\) such that \(e^y=x\) . This is the value for \(log x\)
- The natural domain for \(log x\) is \((0,∞)\) , the range is \(R\)
- \(logx\) is s strictly increasing function
- \(log x<0\) for \(0<x<1\)
- \(log 1=0\)
- \(log x>0\)
- Alternative notation: \(y=ln x\)
- Logarithm rules:
- \(e^{log x}=x\) for all \(x>0\)
- \(log e^x=x\) for all \(x\)
- \(log xy=log x+log y\) for \(x>0,y>0\)
- \(log x/y=log x-log y\) for \(x>0,y>0\)
- \(log x^y=ylog x\) for \(x>0\)