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Why are $\\log$ and $\\ln$ being used interchangeably? In some fields of engineering, log log means log10 log 10, in math it usually means ln ln, and in computer science it often means log2 log 2 (when it matters) Another example of this kind of notational difference is found in boolean algebra
Is log base 10 the same as ln? - Homework. Study. com In mathematics, some logarithms show up more often than others, and we classify these logarithms as special types of logarithms by the value of their base Answer and Explanation: 1 No, log 10 (x) is not the same as ln (x), although both of these are special logarithms that show up more often in the study of mathematics than any
calculus - Power series representation of $\ln (1+x)$? - Mathematics . . . I am reading an example in which the author is finding the power series representation of ln(1 + x) ln (1 + x) Here is the parts related to the question: I think that I get everything except for one thing: Why do we need to find a specific constant C C and not just leave at as an arbitrary constant? And why do we find the specific constant we need by setting x=0 and solve the given equation?
Why is the derivative of Ln (x) equal to 1 x with no domain restricted? We really should say "the derivative of f(x) = ln(x) f (x) = ln (x) is g(x) = 1 x, x> 0 g (x) = 1 x, x> 0 " But we usually elide that last part and assume it is clear from context: that because we are mentioning "derivative of ln(x) ln (x) ", it will be understood that we only mean this assertion to hold for x x in appropriate domain