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For the equation:
You can write the solution as:
Or different.
- Integers asked us. Not a lot not in a convenient form the recorded decision, but it is. Go to positive numbers is not difficult.Offline
What about this equation:
For this we need to use the solutions of the Pell equation.
To find solutions easily. Knowing the first solution
-Knowing one solution, the following can be found by the formula.
Knowing any solution and using it, you can find the solution to this equation by the formula.
Or different formula.
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For the system of equations:
Rewrite all the same this solution to compare.
- coefficients specified by the problem statement. I was interested in other solutions when solutions are not multiples.Last edited by individ (2015-01-31 00:43:07)
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Equation if we write in the General form:
If in this equation there any equivalent to a quadratic form in which the root is an integer.
Then there are solutions. They can be written by making the replacement.
Then decisions can be recorded and they are as follows:
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- integers asked us.Offline
When he wrote the equation he meant probably that entry.
It turns out, this equation has a connection with the Pell equation:
For
it is necessary to use the first solution . For it is necessary to use the first solution . Knowing what the decision can be found on the following formula.Using the solutions of the Pell equation can be found when there are solutions.
Will make a replacement.
Then the solution can be written: - integers asked us. May be necessary, after all the calculations is to obtain a relatively simple solution, divided by the common divisor.Offline
I thought as this task to generalize and use for any numbers. It turned out that you can do without calculations. For the system of equations:
Enough to factor the following number:
Using these numbers you can easily write the solution of this system of equations.
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For the equation:
write the formula so that it was easier to go through. To facilitate calculations will make the replacement.
Then decisions can be recorded and they are.
- integers, which we ask.Offline
For such equations:
- you can specify any, then decisions can be recorded. - integers asked us.Offline
For the equation:
If the number
is the problem any, and is such as this:Then the solution can be written:
- integers which we are set.It's my decision.
How did you solve the other you can see there.
http://mathoverflow.net/questions/38354 … 180#196180
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For the equation:
If you can represent numbers as:
This decision when the coefficients are related through the equation of Pell.
To simplify calculations we will make this change.
Then the solution can be written:
- integers which we ask.Last edited by individ (2015-02-11 04:41:53)
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If you solve the system of equations:
When the standard approach solution and using a replacement.
Then the solution can be written as :
- integers which we ask.Offline
For the system of equations:
If you can decompose the coefficient multipliers as follows:
Their work squares:
Then decisions can be recorded.
You can add another simple option. If the ratio can be written as:
Then decisions can be recorded.
Last edited by individ (2015-02-19 02:06:24)
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One of the solutions to the equation. To get infinite amount of different.
If you can imagine.
Then decisions can be recorded.
If you can imagine.
Then decisions can be recorded.
- integers which we ask.Offline
This system of Diophantine equations was proposed. Form APMO 2000. 2.
Has this type:
One easy solution can be written as:
- integers which we ask.It is better to write such a decision.
- any integer.Last edited by individ (2015-02-26 02:03:14)
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Equation;
Decisions are not always there. To find out, I use too much. Decompose the multiplier number.
Finding the number $t$ and $k$, the solution writes:
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Hello individ. Hope you don't mind me contributing to your thread. I just considered diophantines of the form
[list=*]
[*]
This is solvable if and only if gcd(a,b) divides c. The general solution is
[list=*]
[*]
where
and X=x, Y=y is a particular solution. See this post:
[list=*]
[*]http://www.mathisfunforum.com/viewtopic … 53#p356253[/*]
[/list]
Last edited by Olinguito (2015-04-05 03:49:20)
Bassaricyon neblina
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This equation is a variation on this type of equations.
http://math.stackexchange.com/questions … e-patterns
If we consider the equation of a certain type.
The solutions can be written simply using the sequence. The next element which is obtained from the previous one.
If we use the first element of the sequence.
Then the formula will look like.
If we use the first element of the sequence.
Then the formula will look like.
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For generalization of the Pell equation question arises constantly. For example in this thread.
http://math.stackexchange.com/questions … 363#831363
So writes the Pell equation in General form.
If we know any solution of this equation.
If we use any solutions of the following equation Pell.
Then the following solution of the desired equation can be found by the formula.
We must remember that then can be reduced by a common factor.
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The system of equations.
Equivalent to the need to solve the following system of equations.
To ease calculations we change.
Then we need the number to obtain Pythagorean triples can be found by the formula.
At any stage of the computation can be divided into common divisor.
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For the system of equations.
If we do the replacement.
Then the solution will have the form:
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For the system:
The solutions can be written as.
integers.Offline
To solve the system of equations:
It is better to use such solutions.
integers asked us.Offline
One approach is to write the General formula. For the equation.
The formula looks for simplicity without coprime solutions.
After substituting numbers
to reduce common divisor. in such a number. in such a number.Offline
The system of book 2 tasks 22 , 23 . The system is from the book of Diophantus.
Found this solution, but it sets a very different kind of decision. Different from the previous one.
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Last edited by individ (2015-08-18 19:01:02)
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For the system of book 2 task 30.
Decisions will be.
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