Math Is Fun Forum

Tredici

Member

Registered: 2005-12-12

Posts: 28

Parametric Differentiation

Please help me find dy/dx. I've tried everything. I thought it'd be a case of simple quotient rule application, then chain rule by dividing dy/dt by dx/dt. Maybe it is, I may just be continuously slipping somewhere. Any help at all would be really appreciated. Thanks guys.

John E. Franklin

Member

Registered: 2005-08-29

Posts: 3,588

Re: Parametric Differentiation

I think you do  (t*dy)/dx, so answer is -t for slope.

I guess I said that wrong.
I mean you might do a dt to yt/x, so perhaps
slope is D(yt/x))dt.

I don't know how to say it.

This may be wrong because I made it up based on a few examples like y = t and x = t.
And the example of y = t^2 and x = t.

But what if y = t^3 and x = t^3, slope is 1, yeah, still works.  Maybe it's right, maybe not...

Last edited by John E. Franklin (2006-06-13 09:03:53)

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George,Y

Member

Registered: 2006-03-12

Posts: 1,379

Re: Parametric Differentiation

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X'(y-Xβ)=0

Zhylliolom

Real Member

Registered: 2005-09-05

Posts: 412

Re: Parametric Differentiation

For parametric functions,

To solve your specific problem, we find both dy/dt and dx/dt, and then simply put them in the numerator and denominator, respectively.

Then

John E. Franklin

Member

Registered: 2005-08-29

Posts: 3,588

Re: Parametric Differentiation

Silly me!  He's right, I checked a web page about it.
dy/dx  is  (dy/dt) / (dx/dt).
Oh well.  I think Zhyl is using the quotient rule, but I can't remember it, square in denominator and some combinations subtracted in numerator?

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Zhylliolom

Real Member

Registered: 2005-09-05

Posts: 412

Re: Parametric Differentiation

Silly me!  He's right, I checked a web page about it.
dy/dx  is  (dy/dt) / (dx/dt).
Oh well.  I think Zhyl is using the quotient rule, but I can't remember it, square in denominator and some combinations subtracted in numerator?

Yes, the quotient rule was used to determine dy/dt and dx/dt, but dy/dx was determined by simply putting dy/dt over dx/dt and simplifying. Just to spark your memory,

Somewhat pointless edit: Assuming v ≠ 0.

Last edited by Zhylliolom (2006-06-13 15:34:44)

John E. Franklin

Member

Registered: 2005-08-29

Posts: 3,588

Re: Parametric Differentiation

Thanks, I finally got it memorized now, again, many, many years later.

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