Understanding the Relationship between Ln and e^x

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SUMMARY

The discussion centers on the mathematical identity involving the expression e^(14ln(x)). The correct simplification of this expression is y = x^14, confirmed through the properties of logarithms and exponents. The participants clarify that 14ln(x) is indeed equal to ln(x^14), reinforcing the foundational logarithmic identity that e^(ln(a)) = a. This understanding is crucial for solving related problems in logarithmic and exponential functions.

PREREQUISITES
  • Understanding of logarithmic identities, specifically e^(ln(a)) = a
  • Familiarity with properties of exponents and logarithms
  • Basic algebraic manipulation skills
  • Knowledge of the natural logarithm (ln) and the exponential function (e^x)
NEXT STEPS
  • Study the properties of logarithms, including the product, quotient, and power rules
  • Learn about exponential functions and their applications in calculus
  • Explore the relationship between logarithmic and exponential functions in greater depth
  • Practice solving problems involving logarithmic identities and simplifications
USEFUL FOR

Students studying algebra, particularly those focusing on logarithmic and exponential functions, as well as educators seeking to reinforce these concepts in their teaching materials.

Tricky557
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Homework Statement



I'm just not sure what the answer to this is. I think it's an identity for e^x and ln, but I've never had a course that dealt with e^x or logs. So I don't know.

What is the answer to e^14ln(x)? It's part of a larger problem, but I can't get the rest of it done until I know that.


Homework Equations



None.

The Attempt at a Solution



I think the answer is x^14. But I'm not sure.
 
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Well, what was your reasoning?



Aside: when you're writing linearly, be careful about parentheses! The expression
e^14ln(x)​
means
e^{14} \ln(x)
whereas
e^(14ln(x))​
means
e^{14 \ln(x)}
 
Yes, sorry about that. I did mean to write:

e^(14*ln(x))

I was thinking, that if I equated some random variable(say y) to e^(14ln(x)), then I could just solve that equation.

y= e^(14*ln(x))
lny= 14lnx

lny = 14lnx

lny = ln(x^14)

e^ of both sides

y = x^14The part of that I am unsure about is:

Does 14lnx = ln(x^14) ?
 
Yes, that works, so you can see that by definition, elnx = x. Also, a*lnx = ln(ax)
 
Tricky557 said:
Yes, sorry about that. I did mean to write:

e^(14*ln(x))

I was thinking, that if I equated some random variable(say y) to e^(14ln(x)), then I could just solve that equation.
That's not the best approach. The intended goal of this problem is for you to simplify the given expression. Setting your expression equal to, say, y, doesn't help much to move things toward your goal of simplification.

Use the properties of logs and exponents to rewrite your expression in a different (and simpler) form.
Tricky557 said:
y= e^(14*ln(x))
lny= 14lnx

lny = 14lnx

lny = ln(x^14)

e^ of both sides

y = x^14


The part of that I am unsure about is:

Does 14lnx = ln(x^14) ?
Yes.
 
Thanks for the help!
 

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