- #1
NickTesla
- 29
- 3
Already tried everything, mantissa, exponent, just do not know how to solve the problem, I would love to be able to understand it! 5 (1-e ^ -0.212765957) = e = 2.71 ^ = -0.212765957 here is my biggest question!
NickTesla said:Jidishrfu Thank you also for me is an honor to join the best forum of North America, we Brazilians are proud to participate and be partners and allies of the American people, is the best, I'm very happy because I'm a fan, aircraft , aerospace etc ... and I see the US friendship with BRAZIL. Thank you !
NickTesla said:I speak in regard to service and military cooperation! only that!
There was no intention humiliation! if I said something wrong! pardon!
I have no such intention, on the contrary, I would like to live in the US
NickTesla said:Klaatu, O Dia Que a Terra Parou (1951)
Keanu Reeves
This video is very spectacular,
quite the contrary I am a big fan of his country,
Someone getting against north america, is to declare fight to Brazilians who are residing in the US!
The logarithm of Napier, constant "e", is a mathematical concept used to describe the rate at which a quantity grows or decays exponentially. It is the inverse function of the exponential function, and is represented by the symbol "ln".
The logarithm of Napier, constant "e", can be calculated by taking the natural logarithm of the number "e". This can be done using a calculator or by using a logarithm table.
The Logarithm of Napier, constant "e", follows the same properties as any other logarithm. These include the product property, quotient property, and power property. Additionally, the logarithm of "e" is equal to 1, and the natural logarithm of 1 is equal to 0.
The Logarithm of Napier, constant "e", is used in various scientific fields, such as physics, chemistry, and biology. It helps in modeling exponential growth and decay phenomena, and is also used in differential equations to describe the behavior of complex systems.
The main difference between the Logarithm of Napier, constant "e", and other logarithms is the base. The natural logarithm uses "e" as its base, while other logarithms use different bases, such as 10 or 2. Additionally, the natural logarithm has some unique properties, such as the fact that its derivative is equal to 1/x.