MedVision ad

differentiation of exponentials question (1 Viewer)

kloudsurfer

Member
Joined
Jun 6, 2006
Messages
848
Location
Narellan
Gender
Female
HSC
2007
Hey,
A couple of questions like this have popped up and i dont know how to do them. Could anyone help me?

Find the stationary point on the curve y=xe^x and determine its nature.

Thanks in advance.
 

imaginarylife

Member
Joined
Apr 3, 2006
Messages
33
Gender
Female
HSC
2007
y = x e^x

using product rule, dy/dx = x e^x + e^x
stationary point when dy/dx = 0
e^x(x +1) = 0
e^x cannot = 0, therefore stat. pt. when x = -1

to determine its nature use second derivative or test points either side
by product rule,
y"= e^x(x+1) + e^x
= e^x(x+2)
for x= -1, y" is positive
therefore it is concave up
therefore min. turning point at (-1, -e^-1)
 
Last edited:

jb_nc

Google "9-11" and "truth"
Joined
Dec 20, 2004
Messages
5,391
Gender
Male
HSC
N/A
kloudsurfer said:
As x -> minus infinity, y -> a tiny positive number. It's never 0.
 

aussiechica7

Member
Joined
Dec 11, 2006
Messages
416
Gender
Female
HSC
2004
hehe i think something like that question was in my methods exam (2003)
 

kloudsurfer

Member
Joined
Jun 6, 2006
Messages
848
Location
Narellan
Gender
Female
HSC
2007
ellen.louise said:
Because x=0 is the assymptote for the curve: no value you ever put in for x in y=e^x will ever equal 0 or a neg. number.
Oh right...

Ok really I have no idea.

Why is x=0 the asymptote again?

I think I have to go over some yr 11 stuff...
 

idling fire

Member
Joined
Oct 29, 2006
Messages
252
Location
In a locality.
Gender
Female
HSC
2007
ellen.louise said:
Because x=0 is the assymptote for the curve
Uhm... no... incorrect.
The second part was right though:
ellen.louise said:
no value you ever put in for x in y=e^x will ever equal 0 or a neg. number.
x CAN equal zero. Domain for x is all real numbers.
y CANNOT equal zero, because no value of x can ever make the RHS zero.
Therefore asymptote is y=0 (the x-axis) for y=e^x.
 

ellen.louise

Member
Joined
Mar 27, 2007
Messages
516
Location
Locked in my cupboard
Gender
Female
HSC
2007
kloudsurfer said:
Oh right...

Ok really I have no idea.

Why is x=0 the asymptote again?

I think I have to go over some yr 11 stuff...
because it just is...
um...
oooh! got it!!!!

because if y=e^x, x=logey. and.... and.... someone help here!!!

NO I WAS WRONG!!! it's for the log curve that x=0 is the assymptote. (I probably should have checked my trusty template earlier)

for y=e^x, y=0 is the assymptote, because x=log e y and you cannot find the log of a negative number, and you can't multiply anything by a power that comes to 0. :)
 

kloudsurfer

Member
Joined
Jun 6, 2006
Messages
848
Location
Narellan
Gender
Female
HSC
2007
ellen.louise said:
for y=e^x, y=0 is the assymptote, because x=log e y and you cannot find the log of a negative number, and you can't multiply anything by a power that comes to 0. :)
:confused:

Still confused.

Will this make sense further into the topic? Because we havent even learnt about logs yet, we are only up to differentiation of exponentials.
 

bos1234

Member
Joined
Oct 9, 2006
Messages
491
Gender
Male
HSC
2007
To find the x-intercept sub in y=0 and solve

y=e^x
0=e^x


if you draw the exponential curve y = e^x you will see that it never touches or goes below the x-axis. So the x-axis is an asymptote so the above equation cannot be solved

-------------------------------------------
Also you can do this by above to see it has no soln.

----------------------------------------------

hope u understood

thanks bye
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top