Solve for y: X=e^yEquation Solution

  • Thread starter Thread starter Mrencko
  • Start date Start date
AI Thread Summary
The discussion revolves around solving the equation X = e^y. Participants suggest taking the natural logarithm of both sides, leading to the conclusion that y = ln(X). There is some confusion regarding the negative sign and the correct interpretation of the equation, with clarifications that if X = e^-y, then y = -ln(X). The importance of correctly identifying the equation is emphasized, as it affects the solution. Ultimately, the correct solution for the original equation is confirmed to be y = ln(X).
Mrencko
Messages
109
Reaction score
0

Homework Statement


X=e^y i just need to do that i think this is maybe log but i don't know[/B]

Homework Equations

The Attempt at a Solution

 
Physics news on Phys.org
Mrencko said:

Homework Statement


X=e^y i just need to do that i think this is maybe log but i don't know[/B]

Homework Equations

The Attempt at a Solution

Show us what happens if you take the natural logarithm of both sides.
 
Log(x) =ylog(e)?
 
Mrencko said:
Log(x) =ylog(e)?

But what is the natural log of e? Think about what a natural logarithm is, and how it's defined.
 
Its one, can you apoint me to the solution i am lost
 
I found the solution y=-log(x)
 
Mrencko said:
I found the solution y=-log(x)
Sorry its y=-lnx
 
Mrencko said:
I found the solution y=-log(x)
Mrencko said:
Sorry its y=-lnx
Neither one of these is correct. Please show what you did to get your last equation.
 
  • #10
X=e^-y then lnx=-ylne then (lnx=-y)-1... Then (y=-lnx) or y=ln(1/x)
 
  • #11
Mrencko said:
X=e^-y then lnx=-ylne then (lnx=-y)-1... Then (y=-lnx) or y=ln(1/x)

Your original post had the equation x=e^y rather than x=e^-y. Which problem are you doing? The solution you have here is correct for x=e^-y except I'm not sure why you have a -1 in the 3rd equation which disappears in later equations yielding the correct answer.
 
  • #12
Mrencko said:
Its one, can you apoint me to the solution i am lost

If log (e) = 1, then what is y log (e)?
 
  • #13
Sorry i forgot the - and the-1 its just to change the - x to x and i was wrong whit log its ln
 
  • #14
If the original equation was supposed to be x = e-y, then the equivalent equation is y = -ln(x). By "equivalent" I mean that every ordered pair (x, y) that satisfies the first equation also satisfies the second equation.
 
  • #15
Yes thanks dude, i really apreciate the help
 

Similar threads

Find the range of the function ##f(x) = \frac{e^{2x}-e^x+1} {e^{2x}+e^x+1}##
Replies
8
Views
3K
Solving for y: e^(y) = y^(2) - 2
Replies
6
Views
2K
Why are there two solutions for e in ln| (y-2)/(y+2) | = 4x + c_2?
Replies
12
Views
2K
How to graph by hand: y=log((x/(x+2))
Replies
3
Views
1K
Writing a logarithm in a form not involving logarithms
Replies
4
Views
2K
Is there an explicit way to write the solution of nx = e^x?
Replies
3
Views
2K
Is there a rule that states that I should not divide in this scenario?
Replies
10
Views
1K
Express ##x^3+y^3## in terms of ##m## and ##n##
Replies
17
Views
3K
Log inside log -- find the x in its max domains?
Replies
10
Views
2K
Finding the inverse of ##y=2^{x}##
Replies
19
Views
3K

Hot Threads

Recent Insights

Back
Top