Exponential form of curve is x= [tex]e^{y}[/tex]
What is Ln exponential form?
- The natural logarithm (ln) is a function that returns the exponent that must be applied to Euler's number to get the number to which the function is applied. In other words, if ln(a)=b , then eb=a e b = a .
- Ln stand for in math in the natural logarithm. It is log to the base of e. e is an irrational and transcendental number the first few digit of which are: 2.718281828459.
If we take the natural exponential of both sides, i.e.: Take e to the "sideth" power, we get
[tex]: e^y=xln(x)=ye^ln(x)=e^yx=e^y[/tex]
Therefore, Ln exponential form of curve is x = [tex]e^y}[/tex]
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