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Need some log help (1 Viewer)
- Thread starter Avenger6
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lyounamu
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What are we doing for q 1?
I got the answer for q 2
a)
f'(x) = (derivate of (√2-x ))/(√2-x)
= (-1/2 〖(2-x)〗^(-0.5) )/(√2-x)
= (-1)/(2 (2-x) )
= -1 / 4-2x
= 1/2x -4
b) f(x) = log10 x
= ln x / ln 10
f'(x) = 1/ln10 x
I got the answer for q 2
a)
f'(x) = (derivate of (√2-x ))/(√2-x)
= (-1/2 〖(2-x)〗^(-0.5) )/(√2-x)
= (-1)/(2 (2-x) )
= -1 / 4-2x
= 1/2x -4
b) f(x) = log10 x
= ln x / ln 10
f'(x) = 1/ln10 x
Last edited:
foram
Awesome Member
1a) Using Quotient Rule y'=(u'v-uv')/u^2Avenger6 said:Hi, any help with the following questions would be greatly appreciated.
BTW, the 1 above the f in question 2a is supposed to indicate the derivative of, not to the power of 1.
y'=(lnx . 2e^2x - (e^2x)/x)/ (lnx)^2
1b) y'=u'v+uv'
y'= e^x . lnx + (e^x)/x
2a) f(x) = ln (sqrt.(2-x))
EDIT: f(x) = 1/2 ln(2-x)
f'(x) = (1/2)(-1) / (2-x)
f'(x) = -1/ (4-2x)
f'(1) = -1/ (4-2)
= -1/2
2b) y=log x
change of base
y=lnx/ln10
y'= 1/xln10
Last edited:
Mark576
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Uh, lyounamu, read Q2 again, it asks for f'(1). You only found the derivative:
f'(x) = 1/(2x-4) => f'(1) = 1/(2-4) = -1/2
EDIT:
f'(x) = 1/(2x-4) => f'(1) = 1/(2-4) = -1/2
EDIT:
Nope. Your method would work for the derivative of logex but the general rule is that d/dx (logef(x)) = f'(x)/f(x).foram said:
Last edited:
foram
Awesome Member
Yea, I forgot to take the power of 1/2 down.lyounamu said:
Thanks for the responses guys. Question 1a and b were asked to differentiate, sorry i didn't mention that. Im having a hard time interpreting some of the answers you guys gave so heres an image of where I got to with 1a and 1b, hopefully you can tell me where I have gone wrong.
Just for reference the textbook answer to 1a is (e^2x(2xlnx-1))/x(lnx)^2 and the answer to 1b is e^x(1/x+lnx)
Foram, I dont understand how you turned f(x) = ln (sqrt.(2-x)) into f(x) = 1/2 ln(2-x), where did the 1/2 come from??? I also don't quite understand the third to your answer for question 2b, i see how it becomes y=lnx/ln10 but dont understand how when derivived you, make it y'= 1/xln10???
Thank you for the help.
Just for reference the textbook answer to 1a is (e^2x(2xlnx-1))/x(lnx)^2 and the answer to 1b is e^x(1/x+lnx)
Foram, I dont understand how you turned f(x) = ln (sqrt.(2-x)) into f(x) = 1/2 ln(2-x), where did the 1/2 come from??? I also don't quite understand the third to your answer for question 2b, i see how it becomes y=lnx/ln10 but dont understand how when derivived you, make it y'= 1/xln10???
Thank you for the help.
tommykins
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1a) u' = 2e^2x not 2xe^(2x-1)
1b) u' = e^x, not xe^x-1
It isn't like normal differentiation with logs.
y = e^f(x)
y' = f'(x).e^f(x)
EDIT - can you tell me how you got that into a picture? Did you make it a PDF? If so, please PM me on how to do it
1b) u' = e^x, not xe^x-1
It isn't like normal differentiation with logs.
y = e^f(x)
y' = f'(x).e^f(x)
EDIT - can you tell me how you got that into a picture? Did you make it a PDF? If so, please PM me on how to do it
Last edited:
hey avenger 6...with q1 your on the right track...just u' is 2e2x
so y' = (u'v-v'u)/v2
y'= {(2e2x)(lnx)-(1/x)(e2x)}/(lnx)2
by taking a common factor of e2x out we get
y'= (e2x(2lnx - 1))/x(lnx)2
for question 2
y=exlnx
y'= ex(lnx) + (1/x)(ex)
taking common factor out...
y'= ex(1/x + lnx)
so y' = (u'v-v'u)/v2
y'= {(2e2x)(lnx)-(1/x)(e2x)}/(lnx)2
by taking a common factor of e2x out we get
y'= (e2x(2lnx - 1))/x(lnx)2
for question 2
y=exlnx
y'= ex(lnx) + (1/x)(ex)
taking common factor out...
y'= ex(1/x + lnx)
foram
Awesome Member
For 1.Avenger6 said:Thanks for the responses guys. Question 1a and b were asked to differentiate, sorry i didn't mention that. Im having a hard time interpreting some of the answers you guys gave so heres an image of where I got to with 1a and 1b, hopefully you can tell me where I have gone wrong.
Just for reference the textbook answer to 1a is (e^2x(2xlnx-1))/x(lnx)^2 and the answer to 1b is e^x(1/x+lnx)
Foram, I dont understand how you turned f(x) = ln (sqrt.(2-x)) into f(x) = 1/2 ln(2-x), where did the 1/2 come from??? I also don't quite understand the third to your answer for question 2b, i see how it becomes y=lnx/ln10 but dont understand how when derivived you, make it y'= 1/xln10???
Thank you for the help.
Your u' is wrong.
If y= e^x
y' = e^x
If y= e^f(x)
y' = f'(x).e^f(x) (chain rule)
Therefore if u=e^2x
u'=2e^2x
If u=e^x
u'=e^x
For 2.
sqrt.[f(x)] = [f(x)]^(1/2)
ln [f(x)]^a = a.ln[f(x)]
Therefore sqrt.(2-x) = (2-x) ^(1/2)
ln(2-x)^(1/2) = 1/2 .ln(2-x)
For 2 b)
For y=(ln[f(x)]/lna) ...[where a is a constant, lna must also be a constant]
therefore y' = [1/[f(x)] . f'(x)] /lna
foram
Awesome Member
Type it up in word 2007 then press alt + printscreen. Open paint, press ctrl +v. Cut out the part you want. copy and paste into new paint.tommykins said:1a) u' = 2e^2x not 2xe^(2x-1)
1b) u' = e^x, not xe^x-1
It isn't like normal differentiation with logs.
y = e^f(x)
y' = f'(x).e^f(x)
EDIT - can you tell me how you got that into a picture? Did you make it a PDF? If so, please PM me on how to do it