How does e^(2ln(t)) equal t^2?

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Homework Help Overview

The discussion revolves around the mathematical expression e^(2ln(t)) and its equivalence to t^2. Participants are exploring the properties of logarithms and exponents to understand this relationship.

Discussion Character

  • Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • The original poster attempts to understand the transformation of e^(2ln|t|) and questions the disappearance of the e in the final expression. Some participants suggest breaking down the expression using known logarithmic identities, while others emphasize the importance of recognizing the properties of inverse functions.

Discussion Status

Participants are actively engaging with the problem, sharing their reasoning and questioning assumptions. Some guidance has been offered regarding the application of logarithmic properties and the relationship between logarithmic and exponential functions, but no consensus has been reached on the final interpretation.

Contextual Notes

There is a mention of confusion regarding the laws of exponents, indicating that participants are navigating through foundational concepts in logarithmic and exponential functions.

CinderBlockFist
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ok guys, i don't see how e^2ln|t| = t^2 can someone explain it to me please? Seems so easy but i don't see it.
 
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ok, so far i tried this. I know e^(lnx) = x


so, i broke the e^(2ln|t|) into to parts:


e^2 times e^(ln|t|) which equals t (from the top identity)


so I am left with e^2 times t. which is te^2

but the book says it equals t^2..so what happened to the e? (exponential function)
 
CinderBlockFist said:
ok, so far i tried this. I know e^(lnx) = x


so, i broke the e^(2ln|t|) into to parts:


e^2 times e^(ln|t|) which equals t (from the top identity)


so I am left with e^2 times t. which is te^2

but the book says it equals t^2..so what happened to the e? (exponential function)

you have

e^2 e^(ln t) = e^(2+ln t),

which is incorrect.


you want to use the properties:


a ln b = ln b^a

and

e^ln a = a.


the rest should be straightfoward.
 
Last edited:
First look at this rule for logarithms:

\log_b(a^x)=x\log_b(a).

Now apply that to your exponent:2\ln |t|. What do you get?

Then note that f(x)=\ln (x) and g(x)=e^x are inverse functions, which means that f(g(x))=g(f(x))=x.

Those two rules together will give you the answer.
 
SWEEET! THANK YOU GUYS. I got my laws of exponents mixed up.
 

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