document.write( "Question 110900: HELP HELP HELP\r
\n" ); document.write( "\n" ); document.write( "solve by addition if a unique solution does not exist state whether the system is inconsistent or dependent.\r
\n" ); document.write( "\n" ); document.write( "-3x+y=8
\n" ); document.write( "3x-2y=-10\r
\n" ); document.write( "\n" ); document.write( "thanks so much \n" ); document.write( "

Algebra.Com's Answer #80888 by jim_thompson5910(35256) $\"\"$ $\"About$

You can put this solution on YOUR website!
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Solved by pluggable solver: Solving a System of Linear Equations by Elimination/Addition

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\n" ); document.write( " Lets start with the given system of linear equations
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\n" ); document.write( " $\"-3%2Ax%2B1%2Ay=8\"$
\n" ); document.write( " $\"3%2Ax-2%2Ay=-10\"$
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\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).
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\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.
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\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 -3 and 3 to some equal number, we could try to get them to the LCM.
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\n" ); document.write( " Since the LCM of -3 and 3 is -3, we need to multiply both sides of the top equation by 1 and multiply both sides of the bottom equation by 1 like this:
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\n" ); document.write( " $\"1%2A%28-3%2Ax%2B1%2Ay%29=%288%29%2A1\"$ Multiply the top equation (both sides) by 1
\n" ); document.write( " $\"1%2A%283%2Ax-2%2Ay%29=%28-10%29%2A1\"$ Multiply the bottom equation (both sides) by 1
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\n" ); document.write( " So after multiplying we get this:
\n" ); document.write( " $\"-3%2Ax%2B1%2Ay=8\"$
\n" ); document.write( " $\"3%2Ax-2%2Ay=-10\"$
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\n" ); document.write( " Notice how -3 and 3 add to zero (ie $\"-3%2B3=0\"$ )
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\n" ); document.write( " Now add the equations together. In order to add 2 equations, group like terms and combine them
\n" ); document.write( " $\"%28-3%2Ax%2B3%2Ax%29%2B%281%2Ay-2%2Ay%29=8-10\"$
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\n" ); document.write( " $\"%28-3%2B3%29%2Ax%2B%281-2%29y=8-10\"$
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\n" ); document.write( " $\"cross%28-3%2B3%29%2Ax%2B%281-2%29%2Ay=8-10\"$ Notice the x coefficients add to zero and cancel out. This means we've eliminated x altogether.
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\n" ); document.write( " So after adding and canceling out the x terms we're left with:
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\n" ); document.write( " $\"-1%2Ay=-2\"$
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\n" ); document.write( " $\"y=-2%2F-1\"$ Divide both sides by $\"-1\"$ to solve for y
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\n" ); document.write( " $\"y=2\"$ Reduce
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\n" ); document.write( " Now plug this answer into the top equation $\"-3%2Ax%2B1%2Ay=8\"$ to solve for x
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\n" ); document.write( " $\"-3%2Ax%2B1%282%29=8\"$ Plug in $\"y=2\"$
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\n" ); document.write( " $\"-3%2Ax%2B2=8\"$ Multiply
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\n" ); document.write( " $\"-3%2Ax=8-2\"$ Subtract $\"2\"$ from both sides
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\n" ); document.write( " $\"-3%2Ax=6\"$ Combine the terms on the right side
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\n" ); document.write( " $\"cross%28%281%2F-3%29%28-3%29%29%2Ax=%286%29%281%2F-3%29\"$ Multiply both sides by $\"1%2F-3\"$ . This will cancel out $\"-3\"$ on the left side.
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\n" ); document.write( " $\"x=-2\"$ Multiply the terms on the right side
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\n" ); document.write( " So our answer is
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\n" ); document.write( " $\"x=-2\"$ , $\"y=2\"$
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\n" ); document.write( " which also looks like
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\n" ); document.write( " ( $\"-2\"$ , $\"2\"$ )
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\n" ); document.write( " Notice if we graph the equations (if you need help with graphing, check out this solver)
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\n" ); document.write( " $\"-3%2Ax%2B1%2Ay=8\"$
\n" ); document.write( " $\"3%2Ax-2%2Ay=-10\"$
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\n" ); document.write( " we get
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graph of $\"-3%2Ax%2B1%2Ay=8\"$ (red) $\"3%2Ax-2%2Ay=-10\"$ (green) (hint: you may have to solve for y to graph these) and the intersection of the lines (blue circle).
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\n" ); document.write( " and we can see that the two equations intersect at ( $\"-2\"$ , $\"2\"$ ). This verifies our answer.

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