Question
Part E We know that logarithmic functions are bit more unusual than functions we've seen in the past; such as linear, exponential, quadratic, and even polynomial and radical functions We rarely see them in examples, so whats their real purpose as functions?Font SizesCharacters used: 0 / 15000
Part E We know that logarithmic functions are bit more unusual than functions we've seen in the past; such as linear, exponential, quadratic, and even polynomial and radical functions We rarely see them in examples, so whats their real purpose as functions? Font Sizes Characters used: 0 / 15000
Answers
Explain why the natural logarithmic function $ y = \ln x $ is used much more frequently in calculus that the other logarithmic functions $ y = \log_b x. $
The exponential, normal big function are examples off, known as a bride. Functions also called a chance, Marvan said. Nathan Funds, It's
This question asks us to explain by the natural logarithmic function is used more frequency than the other large arithmetic functions. The reason why, for this is because we know what the derivative of natural longer than a line of excess we know the derivative of the natural log of acts is simple and actually more simple than the derivatives of other functions.
Hello. Once on this young question, we have been asked that why log best E X is more used more frequently then lo g x like when? Differentiate this we get there by D X, Take Western law X, which is the quest one upon X log. Hey, thank you. When this a becomes e, the value is one upon X Ellen Basie, which is close to one by X. So, uh, so when they become seen exponentially when he becomes see, the formula for remembering is much more simpler then this. This is the reason, uh, we are using more frequently than dog basically x that law based X.
Kristen. When we hav e or f a backs, is it easy? Rex? This is an exponential function, and we use this function often, um, when solving for equations on. But it's also used in a lot of applications, especially with, um, continuous com pounding. Therefore, we wish to study its, um, in the section.
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