Solve System of Equations for Unique Solution | Exam Prep

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To find a unique solution for the system of equations 2x + 4y - z = 2 and x - y + 2z = 1, a third equation is necessary. This equation should ensure that the coefficients of x, y, and z do not form a linear combination of the existing equations. A practical approach is to guess a simple equation, such as x = some value, or to express x and y in terms of z, then create a linear equation based on their calculated values. This method allows for the determination of a unique solution for the variables x, y, and z. A well-chosen third equation will complete the system effectively.
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I have a system of equations

2x + 4y - z = 2
x - y + 2z = 1

I need to find a third equation so that there is a unique solution for the unknows x , y and z, and find them.

Please help

Thanks,
 
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Naeem said:
I have a system of equations

2x + 4y - z = 2
x - y + 2z = 1

I need to find a third equation so that there is a unique solution for the unknows x , y and z, and find them.

Please help

Thanks,
Just FYI, this belongs in the homework section, but anyway: all's you need to do is find an equation such that the vector whose entries are the coefficents of the x, y and z variables is not a linear combination of the two vectors obtained from the other two equations. Pretty much all you need to do is make a guess and check that it works. To make life easy you should probably pick an easy equation like x=something.
 
Or: solve the two equations for x, y in terms of z. Choose whatever value for z you want, calculate x,y for that z and just make up a linear equation that they will solve (for example x+ y+ z= whatever their actual sum is).
 

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