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| Solved by pluggable solver: Solving a System of Linear Equations by Elimination/Addition |
\n" ); document.write( " \n" ); document.write( " Lets start with the given system of linear equations \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " In order to solve for one variable, we must eliminate the other variable. So if we wanted to solve for y, we would have to eliminate x (or vice versa). \n" ); document.write( " \n" ); document.write( " So lets eliminate x. In order to do that, we need to have both x coefficients that are equal but have opposite signs (for instance 2 and -2 are equal but have opposite signs). This way they will add to zero. \n" ); document.write( " \n" ); document.write( " So to make the x coefficients equal but opposite, we need to multiply both x coefficients by some number to get them to an equal number. So if we wanted to get 2 and 4 to some equal number, we could try to get them to the LCM. \n" ); document.write( " \n" ); document.write( " Since the LCM of 2 and 4 is 4, we need to multiply both sides of the top equation by 2 and multiply both sides of the bottom equation by -1 like this: \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " So after multiplying we get this: \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " Notice how 4 and -4 add to zero, 2 and -2 add to zero, 12 and -12 and to zero (ie \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " So we're left with \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " which means any x or y value will satisfy the system of equations. So there are an infinite number of solutions \n" ); document.write( " \n" ); document.write( " \n" ); document.write( " So this system is dependent |