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Proof of Logarithims (1 Viewer)

Justplainbored

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how do u prove that

....loge x
e....= x

and just in case u dont get what it says

its e to the power of logx base e = x
e^logx =x
 
Last edited:

oly1991

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e^lnx=x
ln(e^lnx)=lnx (logging both sides)
lnxlne=lnx (log laws)
lnx=lnx (lne=1)
x=lnx/ln
=x
therefore LHS=RHS

im not sure if that's 100% right but im pretty sure thats how u do it.
 
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Drongoski

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how do u prove that

....loge x
e....= x

and just in case u dont get what it says

its e to the power of logx base e = x
e^logx =x
The functions loge and 'e to the power of' are inverses of each other. When you take loge of x and then exponentiate it (e to the power of loge x) the 2nd function "edit undo" the first one thereby undoing the transformation by the loge giving you back the original x.

In the same way: loge ex = x
 
Last edited:

Trebla

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If you happen to do Ext1, then this is just using f-1[f(x)] = x, where f-1(x) is the inverse function of f(x).
 

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