How to draw or describe Level curves of $xln (y^2-x)$
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How to find the level curves of $$f(x,y)=xln (y^2-x)$$
If I had $f(x,y)=ln (y^2-x)$, the level curves would have the equation $x=y^2-e^k$, which is a parabola with horizontal axis of symmetry. But now when I have $x$ that multiples on, I get stuck.
calculus
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show 2 more comments
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How to find the level curves of $$f(x,y)=xln (y^2-x)$$
If I had $f(x,y)=ln (y^2-x)$, the level curves would have the equation $x=y^2-e^k$, which is a parabola with horizontal axis of symmetry. But now when I have $x$ that multiples on, I get stuck.
calculus
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What do you mean with "$x$ that multiplies on"? When you fix $k$, you have a graph. Therefore, for a fixed $k$, $x=y^2 - e^k$ is a level curve. I don't see any problem here.
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– Matti P.
Dec 18 '18 at 9:00
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desmos.com/calculator/njpygyntxe
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– Matti P.
Dec 18 '18 at 9:01
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@MattiP. OP is talking about $xln(y^2-x)$
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– Shubham Johri
Dec 18 '18 at 9:02
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@ShubhamJohri ahaa, that wasn't very clear in the question definition.
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– Matti P.
Dec 18 '18 at 9:03
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Why not just solve $f(x,y)=k$ for $y$ (up to $pm$) and plot the curve?
$endgroup$
– MPW
Dec 18 '18 at 9:04
|
show 2 more comments
$begingroup$
How to find the level curves of $$f(x,y)=xln (y^2-x)$$
If I had $f(x,y)=ln (y^2-x)$, the level curves would have the equation $x=y^2-e^k$, which is a parabola with horizontal axis of symmetry. But now when I have $x$ that multiples on, I get stuck.
calculus
$endgroup$
How to find the level curves of $$f(x,y)=xln (y^2-x)$$
If I had $f(x,y)=ln (y^2-x)$, the level curves would have the equation $x=y^2-e^k$, which is a parabola with horizontal axis of symmetry. But now when I have $x$ that multiples on, I get stuck.
calculus
calculus
edited Dec 18 '18 at 9:11
Shubham Johri
5,189718
5,189718
asked Dec 18 '18 at 8:55
user575062user575062
62
62
$begingroup$
What do you mean with "$x$ that multiplies on"? When you fix $k$, you have a graph. Therefore, for a fixed $k$, $x=y^2 - e^k$ is a level curve. I don't see any problem here.
$endgroup$
– Matti P.
Dec 18 '18 at 9:00
$begingroup$
desmos.com/calculator/njpygyntxe
$endgroup$
– Matti P.
Dec 18 '18 at 9:01
$begingroup$
@MattiP. OP is talking about $xln(y^2-x)$
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:02
$begingroup$
@ShubhamJohri ahaa, that wasn't very clear in the question definition.
$endgroup$
– Matti P.
Dec 18 '18 at 9:03
$begingroup$
Why not just solve $f(x,y)=k$ for $y$ (up to $pm$) and plot the curve?
$endgroup$
– MPW
Dec 18 '18 at 9:04
|
show 2 more comments
$begingroup$
What do you mean with "$x$ that multiplies on"? When you fix $k$, you have a graph. Therefore, for a fixed $k$, $x=y^2 - e^k$ is a level curve. I don't see any problem here.
$endgroup$
– Matti P.
Dec 18 '18 at 9:00
$begingroup$
desmos.com/calculator/njpygyntxe
$endgroup$
– Matti P.
Dec 18 '18 at 9:01
$begingroup$
@MattiP. OP is talking about $xln(y^2-x)$
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:02
$begingroup$
@ShubhamJohri ahaa, that wasn't very clear in the question definition.
$endgroup$
– Matti P.
Dec 18 '18 at 9:03
$begingroup$
Why not just solve $f(x,y)=k$ for $y$ (up to $pm$) and plot the curve?
$endgroup$
– MPW
Dec 18 '18 at 9:04
$begingroup$
What do you mean with "$x$ that multiplies on"? When you fix $k$, you have a graph. Therefore, for a fixed $k$, $x=y^2 - e^k$ is a level curve. I don't see any problem here.
$endgroup$
– Matti P.
Dec 18 '18 at 9:00
$begingroup$
What do you mean with "$x$ that multiplies on"? When you fix $k$, you have a graph. Therefore, for a fixed $k$, $x=y^2 - e^k$ is a level curve. I don't see any problem here.
$endgroup$
– Matti P.
Dec 18 '18 at 9:00
$begingroup$
desmos.com/calculator/njpygyntxe
$endgroup$
– Matti P.
Dec 18 '18 at 9:01
$begingroup$
desmos.com/calculator/njpygyntxe
$endgroup$
– Matti P.
Dec 18 '18 at 9:01
$begingroup$
@MattiP. OP is talking about $xln(y^2-x)$
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:02
$begingroup$
@MattiP. OP is talking about $xln(y^2-x)$
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:02
$begingroup$
@ShubhamJohri ahaa, that wasn't very clear in the question definition.
$endgroup$
– Matti P.
Dec 18 '18 at 9:03
$begingroup$
@ShubhamJohri ahaa, that wasn't very clear in the question definition.
$endgroup$
– Matti P.
Dec 18 '18 at 9:03
$begingroup$
Why not just solve $f(x,y)=k$ for $y$ (up to $pm$) and plot the curve?
$endgroup$
– MPW
Dec 18 '18 at 9:04
$begingroup$
Why not just solve $f(x,y)=k$ for $y$ (up to $pm$) and plot the curve?
$endgroup$
– MPW
Dec 18 '18 at 9:04
|
show 2 more comments
1 Answer
1
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oldest
votes
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The level curves have the equation $xln(y^2-x)=kinBbb R$. The point $(0,y)$ lies on the level curve only for $k=0$. For $kne0,xne0$.
For $k,xne0$, you can isolate $x,y$ as under:
$displaystyle xln(y^2-x)=kimplies y^2=x+e^{frac kx} (k,xne0)$
When $k=0$, you get the level curves $x=0ne y,y^2=x+1$ in the $xy$ plane.
The level curves are $begin{cases}displaystyle y^2=x+e^frac zx,&zne0\x=0ne y,y^2=x+1, &z=0end{cases}$
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I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
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– user575062
Dec 18 '18 at 9:09
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@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
add a comment |
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1 Answer
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1 Answer
1
active
oldest
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$begingroup$
The level curves have the equation $xln(y^2-x)=kinBbb R$. The point $(0,y)$ lies on the level curve only for $k=0$. For $kne0,xne0$.
For $k,xne0$, you can isolate $x,y$ as under:
$displaystyle xln(y^2-x)=kimplies y^2=x+e^{frac kx} (k,xne0)$
When $k=0$, you get the level curves $x=0ne y,y^2=x+1$ in the $xy$ plane.
The level curves are $begin{cases}displaystyle y^2=x+e^frac zx,&zne0\x=0ne y,y^2=x+1, &z=0end{cases}$
$endgroup$
$begingroup$
I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
$endgroup$
– user575062
Dec 18 '18 at 9:09
$begingroup$
@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
add a comment |
$begingroup$
The level curves have the equation $xln(y^2-x)=kinBbb R$. The point $(0,y)$ lies on the level curve only for $k=0$. For $kne0,xne0$.
For $k,xne0$, you can isolate $x,y$ as under:
$displaystyle xln(y^2-x)=kimplies y^2=x+e^{frac kx} (k,xne0)$
When $k=0$, you get the level curves $x=0ne y,y^2=x+1$ in the $xy$ plane.
The level curves are $begin{cases}displaystyle y^2=x+e^frac zx,&zne0\x=0ne y,y^2=x+1, &z=0end{cases}$
$endgroup$
$begingroup$
I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
$endgroup$
– user575062
Dec 18 '18 at 9:09
$begingroup$
@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
add a comment |
$begingroup$
The level curves have the equation $xln(y^2-x)=kinBbb R$. The point $(0,y)$ lies on the level curve only for $k=0$. For $kne0,xne0$.
For $k,xne0$, you can isolate $x,y$ as under:
$displaystyle xln(y^2-x)=kimplies y^2=x+e^{frac kx} (k,xne0)$
When $k=0$, you get the level curves $x=0ne y,y^2=x+1$ in the $xy$ plane.
The level curves are $begin{cases}displaystyle y^2=x+e^frac zx,&zne0\x=0ne y,y^2=x+1, &z=0end{cases}$
$endgroup$
The level curves have the equation $xln(y^2-x)=kinBbb R$. The point $(0,y)$ lies on the level curve only for $k=0$. For $kne0,xne0$.
For $k,xne0$, you can isolate $x,y$ as under:
$displaystyle xln(y^2-x)=kimplies y^2=x+e^{frac kx} (k,xne0)$
When $k=0$, you get the level curves $x=0ne y,y^2=x+1$ in the $xy$ plane.
The level curves are $begin{cases}displaystyle y^2=x+e^frac zx,&zne0\x=0ne y,y^2=x+1, &z=0end{cases}$
edited Dec 18 '18 at 9:22
answered Dec 18 '18 at 9:01
Shubham JohriShubham Johri
5,189718
5,189718
$begingroup$
I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
$endgroup$
– user575062
Dec 18 '18 at 9:09
$begingroup$
@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
add a comment |
$begingroup$
I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
$endgroup$
– user575062
Dec 18 '18 at 9:09
$begingroup$
@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
$begingroup$
I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
$endgroup$
– user575062
Dec 18 '18 at 9:09
$begingroup$
I don't think that you should divide by $x$ or exclude 0 since it is inside the domain of the function. Or can you explain why you exclude 0?
$endgroup$
– user575062
Dec 18 '18 at 9:09
$begingroup$
@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
$begingroup$
@user575062 Please see the modified answer
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:22
add a comment |
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$begingroup$
What do you mean with "$x$ that multiplies on"? When you fix $k$, you have a graph. Therefore, for a fixed $k$, $x=y^2 - e^k$ is a level curve. I don't see any problem here.
$endgroup$
– Matti P.
Dec 18 '18 at 9:00
$begingroup$
desmos.com/calculator/njpygyntxe
$endgroup$
– Matti P.
Dec 18 '18 at 9:01
$begingroup$
@MattiP. OP is talking about $xln(y^2-x)$
$endgroup$
– Shubham Johri
Dec 18 '18 at 9:02
$begingroup$
@ShubhamJohri ahaa, that wasn't very clear in the question definition.
$endgroup$
– Matti P.
Dec 18 '18 at 9:03
$begingroup$
Why not just solve $f(x,y)=k$ for $y$ (up to $pm$) and plot the curve?
$endgroup$
– MPW
Dec 18 '18 at 9:04