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Prove this? (1 Viewer)

ayehann

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i know there probably some silly rule that says this but...
how do i prove that ln2 = -ln(1/2)
 

MC Squidge

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LHS=ln2

RHS=-ln(1/2)
=-ln(2^-1)
=--1ln2
=ln2
=LHS

LHS=RHS
:. ln2=-ln(1/2)
 

ayehann

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AHHH! thanks guys...
btw isnt it funny how your all doing extn 2 maths.. just noticed that :p
 
Last edited:

micuzzo

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how about:

ln2=-ln0.5

ln2 + ln0.5 = 0

LHS = ln1=0=RHS

Q.E.D
 

jet

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In all actuality, it is just an application of a log law which you can assume:
 

azureus88

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no im fairly sure you CANNOT do that
as that would involve ASSUMING that the equality holds

LHS and RHS should be kept separately at all times
nah, im pretty sure you can do that, he's just adding ln0.5 to both sites. If the original equality holds, then adding ln0.5 to both sides should preserve the equality.
 

GUSSSSSSSSSSSSS

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nah, im pretty sure you can do that, he's just adding ln0.5 to both sites. If the original equality holds, then adding ln0.5 to both sides should preserve the equality.

thats the problem....that argument relies IF the original equality holds

we have to PROVE that it holds, and therefore CANNOT assume that it holds in the first place
 

Trebla

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Someone prove: loga + logb = logab :)
Being general with base x, consider:
y = xlogxa + logxb
= (xlogxa)(xlogxb)
= a.b
Therefore:
logxy = logx(ab)
Also,
logxy = logx(xlogxa + logxb)
= logxa + logxb
So the formula holds...:p
 

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