The derivative of $ 2^{frac{x}{ln x}} $
I am supposed to find the derivative of $ 2^{frac{x}{ln x}} $. My answer is $$ 2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}cdot frac{1}{x} .$$ Is it correct? Thanks.
derivatives
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I am supposed to find the derivative of $ 2^{frac{x}{ln x}} $. My answer is $$ 2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}cdot frac{1}{x} .$$ Is it correct? Thanks.
derivatives
add a comment |
I am supposed to find the derivative of $ 2^{frac{x}{ln x}} $. My answer is $$ 2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}cdot frac{1}{x} .$$ Is it correct? Thanks.
derivatives
I am supposed to find the derivative of $ 2^{frac{x}{ln x}} $. My answer is $$ 2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}cdot frac{1}{x} .$$ Is it correct? Thanks.
derivatives
derivatives
edited Nov 26 '18 at 19:49
Robert Z
93.5k1061132
93.5k1061132
asked Nov 26 '18 at 19:05
Johny547
1154
1154
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You are almost correct. You have just an extra factor $1/x$ at the end. The correct derivative is
$$D(2^{frac{x}{ln x}})=2^{frac{x}{ln x}} cdot ln 2 cdot Dleft(frac{x}{ln x}right)=2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}.$$
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
add a comment |
Let $y=2^frac{x}{ln{x}}$. Then
$$ln{y}=ln{2}^{frac{x}{ln{x}}}=frac{x}{ln{x}}cdotln2$$
Now $$frac{1}{y}cdotfrac{dy}{dx}=ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
Now multiply by $y$ and get
$$frac{dy}{dx}=yln{2}left[frac{ln{x}-1}{(ln x)^2}right]=2^frac{x}{ln{x}}ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
You can do all sorts of algebra to reduce this but it is the derivative.
add a comment |
Mathematica gives:
$$frac{log (2) 2^{frac{x}{log (x)}} (log (x)-1)}{log ^2(x)}$$
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
add a comment |
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3 Answers
3
active
oldest
votes
3 Answers
3
active
oldest
votes
active
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active
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You are almost correct. You have just an extra factor $1/x$ at the end. The correct derivative is
$$D(2^{frac{x}{ln x}})=2^{frac{x}{ln x}} cdot ln 2 cdot Dleft(frac{x}{ln x}right)=2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}.$$
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
add a comment |
You are almost correct. You have just an extra factor $1/x$ at the end. The correct derivative is
$$D(2^{frac{x}{ln x}})=2^{frac{x}{ln x}} cdot ln 2 cdot Dleft(frac{x}{ln x}right)=2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}.$$
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
add a comment |
You are almost correct. You have just an extra factor $1/x$ at the end. The correct derivative is
$$D(2^{frac{x}{ln x}})=2^{frac{x}{ln x}} cdot ln 2 cdot Dleft(frac{x}{ln x}right)=2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}.$$
You are almost correct. You have just an extra factor $1/x$ at the end. The correct derivative is
$$D(2^{frac{x}{ln x}})=2^{frac{x}{ln x}} cdot ln 2 cdot Dleft(frac{x}{ln x}right)=2^{frac{x}{ln x}} cdot ln 2 cdot frac{ln x-xcdot frac{1}{x}}{ln^{2}x}.$$
edited Nov 26 '18 at 19:56
answered Nov 26 '18 at 19:19
Robert Z
93.5k1061132
93.5k1061132
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
add a comment |
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Isn't your answer the same as mine?
– Johny547
Nov 26 '18 at 19:20
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
Your answer had an extra $frac{1}{x}$ at the end.
– KM101
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
No, you have en extra factor $1/x$ ate the end.
– Robert Z
Nov 26 '18 at 19:22
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
Thanks, I see it now.
– Johny547
Nov 26 '18 at 19:23
add a comment |
Let $y=2^frac{x}{ln{x}}$. Then
$$ln{y}=ln{2}^{frac{x}{ln{x}}}=frac{x}{ln{x}}cdotln2$$
Now $$frac{1}{y}cdotfrac{dy}{dx}=ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
Now multiply by $y$ and get
$$frac{dy}{dx}=yln{2}left[frac{ln{x}-1}{(ln x)^2}right]=2^frac{x}{ln{x}}ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
You can do all sorts of algebra to reduce this but it is the derivative.
add a comment |
Let $y=2^frac{x}{ln{x}}$. Then
$$ln{y}=ln{2}^{frac{x}{ln{x}}}=frac{x}{ln{x}}cdotln2$$
Now $$frac{1}{y}cdotfrac{dy}{dx}=ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
Now multiply by $y$ and get
$$frac{dy}{dx}=yln{2}left[frac{ln{x}-1}{(ln x)^2}right]=2^frac{x}{ln{x}}ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
You can do all sorts of algebra to reduce this but it is the derivative.
add a comment |
Let $y=2^frac{x}{ln{x}}$. Then
$$ln{y}=ln{2}^{frac{x}{ln{x}}}=frac{x}{ln{x}}cdotln2$$
Now $$frac{1}{y}cdotfrac{dy}{dx}=ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
Now multiply by $y$ and get
$$frac{dy}{dx}=yln{2}left[frac{ln{x}-1}{(ln x)^2}right]=2^frac{x}{ln{x}}ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
You can do all sorts of algebra to reduce this but it is the derivative.
Let $y=2^frac{x}{ln{x}}$. Then
$$ln{y}=ln{2}^{frac{x}{ln{x}}}=frac{x}{ln{x}}cdotln2$$
Now $$frac{1}{y}cdotfrac{dy}{dx}=ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
Now multiply by $y$ and get
$$frac{dy}{dx}=yln{2}left[frac{ln{x}-1}{(ln x)^2}right]=2^frac{x}{ln{x}}ln{2}left[frac{ln{x}-1}{(ln x)^2}right]$$
You can do all sorts of algebra to reduce this but it is the derivative.
answered Nov 26 '18 at 19:17
Eleven-Eleven
5,39572659
5,39572659
add a comment |
add a comment |
Mathematica gives:
$$frac{log (2) 2^{frac{x}{log (x)}} (log (x)-1)}{log ^2(x)}$$
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
add a comment |
Mathematica gives:
$$frac{log (2) 2^{frac{x}{log (x)}} (log (x)-1)}{log ^2(x)}$$
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
add a comment |
Mathematica gives:
$$frac{log (2) 2^{frac{x}{log (x)}} (log (x)-1)}{log ^2(x)}$$
Mathematica gives:
$$frac{log (2) 2^{frac{x}{log (x)}} (log (x)-1)}{log ^2(x)}$$
edited Nov 26 '18 at 19:32
answered Nov 26 '18 at 19:15
David G. Stork
9,92521232
9,92521232
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
add a comment |
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
But that is after simplification, right? Mine is without.
– Johny547
Nov 26 '18 at 19:16
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Did you press the right buttons? Your derivative seems to be wrong!
– Robert Z
Nov 26 '18 at 19:30
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
Oopsss... fixed. Thanks.
– David G. Stork
Nov 26 '18 at 19:32
add a comment |
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