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#1 2009-11-10 08:10:09
- henrybrice
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- Registered: 2009-11-09
- Posts: 6
differential equations
I have a differential equation xy'-y=0 (or, if you prefer: x(dx/dy)-y=0) and am meant to decide if there is a common point in this family of functions, i.e. is there a point which they all pass through.
How do I go about checking something like this?
(sorry if my terminology is wrong, I am not studying in English!)
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#2 2009-11-10 08:27:07
- JaneFairfax
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- Registered: 2007-02-23
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Re: differential equations
xy'-y=0 (or, if you prefer: x(dx/dy)-y=0)
Doesnt actually mean ?
The way I do it is to solve the differential equation (by separating the variables and integrating) getting the general solution
. Hence the solution family is the set of all nonvertical straight lines through the origin, so is the common point you are looking for.Offline
#3 2009-11-10 08:33:40
- henrybrice
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- Registered: 2009-11-09
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Re: differential equations
y' is indeed meant to be dy/dx, sorry, my typo!
wouldn't the solution be y=x+c? And in that case wouldn't each one cross the y axis at a different place depending on c?
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#4 2009-11-10 13:45:08
- Ricky
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- Registered: 2005-12-04
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Re: differential equations
wouldn't the solution be y=x+c? And in that case wouldn't each one cross the y axis at a different place depending on c?
No, after integration you wind up with
Putting both of these over e will turn the addition on the RHS to multiplication.
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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#5 2009-11-10 18:15:08
- henrybrice
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- Registered: 2009-11-09
- Posts: 6
Re: differential equations
Okay! Thanks very much for all the help 
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