Derivative of Log e
The value of log e at both bases i.e. 10 and e is a constant value. The value of log e at base e is 1 and the value of log e at base 10 is 0.434 approximately. Hence, in both cases we get a constant value and we know that the derivative of a constant is zero. Hence, the derivative of log e is zero. This can be given as follows
- d/dx(logee) = d/dx(1) = 0
- d/dx(log10e) = d/dx(0.434) = 0
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Value of Log e
Value of log e is 0.434294481. There are two values of log e, first is log e base e which is equal to 1, and second is log e base 10 which is equal to 0.434294481.
Log e is made up of two terms Log and e where Log is a logarithm function, where one number is raised on the power of another number to calculate mathematical expression and e is an irrational constant also known as an exponential constant.
Let’s learn about value of log e, how the value of log e is derived, and how to calculate the value of log e.