y=lnxy = \ln x

Graph of the Natural Logarithm y=lnxy = \ln x

y=lnxy = \ln x is the inverse of exe^x: it gives the power to which ee must be raised to obtain xx. Its domain is x>0x > 0 and its range is all real numbers.

It passes through 00 at x=1x = 1 and diverges to -\infty as x0+x \to 0^+ (the yy-axis is an asymptote). It satisfies ln(ab)=lna+lnb\ln(ab) = \ln a + \ln b, turning multiplication into addition.