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3 Variable Systems of Equations – Elimination Method3 Variable Systems of Equations – Elimination Method
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Question 1 of 5
1. Question
Solve the following systems of equations by elimination.`3x-y+2z=5``4x+2y-z=6``5x-3y+z=1`-
`x=` (1)`y=` (2)`z=` (2)
Hint
Help VideoCorrect
Nice Job!
Incorrect
Elimination Method
- `1)` make sure 2 equations have a variable with same coefficients but opposite signs
- `2)` add or subtract the equations so that one variable is cancelled
- `3)` solve for the variable that remains
- `4)` substitute known value to one of the equations to solve for the other variable
First, label the equations `1`, `2` and `3` respectively.`3x-y+2z` `=` `5` Equation `1` `4x+2y-z` `=` `6` Equation `2` `5x-3y+z` `=` `1` Equation `3` Next, add equation `2` to equation `3` since their variable `z` both have `1` as coefficient but with opposite signs. Label the result as equation `A`.`4x+2y-z` `=` `6` `+` `5x-3y+z` `=` `1` `-z+z` cancels out `9x-y` `=` `7` Equation `A` Next, multiply the values of equation `2` by `2` and add the product to equation `1`. Label the result as equation `B`.`2xx``(4x+2y-z)` `=` `2xx``6` Multiply equation `2` by `2` `8x+4y-2z` `=` `12` `8x+4y-2z` `=` `12` `+` `3x-y+2z` `=` `5` `+2z-2z` cancels out `11x+3y` `=` `17` Equation `B` Next, multiply the values of equation `A` by `3` and add the product to equation `B` to find the value of `x`.`3xx``(9x-y)` `=` `3xx``7` Multiply equation `A` by `3` `27x-3y` `=` `21` `27x-3y` `=` `21` `+` `11x+3y` `=` `17` `38x` `=` `38` `-3y+3y` cancels out `38x``div38` `=` `38``div38` Divide both sides by `38` `x` `=` `1` Now, substitute the value of `x` into equation `A` to solve for `y`.`9``x` `-y` `=` `7` Equation `A` `9(``1``)-y` `=` `7` `x=1` `9-y` `=` `7` `9-y` `-9` `=` `7` `-9` Subtract `9` from both sides `-y` `=` `-2` `-y` `times(-1)` `=` `-2` `times(-1)` Multiply both sides by `-1` `y` `=` `2` Finally, substitute the value of `x` and `y` into equation `1` to solve for `z`.`3``x``-``y` `+2z` `=` `5` Equation `1` `3(``1``)-``2` `+2z` `=` `5` `x=1` and `y=2` `3-2+2z` `=` `5` `1+2z` `=` `5` `1+2z` `-1` `=` `5` `-1` Subtract `1` from both sides `2z` `=` `4` `2z` `div2` `=` `4` `div2` Divide both sides by `2` `z` `=` `2` `x=1``y =2``z =2` -
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Question 2 of 5
2. Question
Solve the following systems of equations by elimination.`3x+5y+z=5``9x+2y+7z=32``6x+3y+4z=19`-
`x=` (3)`y=` (-1)`z=` (1)
Hint
Help VideoCorrect
Keep Going!
Incorrect
Elimination Method
- `1)` make sure 2 equations have a variable with same coefficients but opposite signs
- `2)` add or subtract the equations so that one variable is cancelled
- `3)` solve for the variable that remains
- `4)` substitute known value to one of the equations to solve for the other variable
First, label the equations `1`, `2` and `3` respectively.`3x+5y+z` `=` `5` Equation `1` `9x+2y+7z` `=` `32` Equation `2` `6x+3y+4z` `=` `19` Equation `3` Next, multiply the values of equation `1` by `3` and subtract equation `1` from the product. Label the result as equation `A`.`3xx``(3x+5y+z)` `=` `3xx``5` Multiply equation `1` by `3` `9x+15y+3z` `=` `15` `9x+15y+3z` `=` `15` `-` `9x-2y-7z` `=` `32` `9x-9x` cancels out `13y-4z` `=` `-17` Equation `A` Then, multiply the values of equation `1` by `2` and subtract equation `3` from the product. Label the result as equation `B`.`2xx``(3x+5y+z)` `=` `2xx``5` Multiply equation `1` by `2` `6x+10y+2z` `=` `10` `6x+10y+2z` `=` `10` `-` `6x-3y-4z` `=` `19` `6x-6x` cancels out `7y-2z` `=` `-9` Equation `B` Now, multiply the values of equation `B` by `2` and subtract equation `A` from the product to find the value of `y`.`2xx``(7y-2z)` `=` `2xx``-9` Multiply equation `B` by `2` `14y-4z` `=` `-18` `14y-4z` `=` `-18` `-` `13y+4z` `=` `17` `-4z+4z` cancels out `y` `=` `-1` Now, substitute the value of `y` into equation `B` to solve for `z`.`7``y` `-2z` `=` `-9` Equation `B` `7(``-1``)-2z` `=` `-9` `y=-1` `-7-2z` `=` `-9` `-7-2z` `+7` `=` `-9` `+7` Add `7` to both sides `-2z` `=` `-2` `-2z` `div(-2)` `=` `-2` `div(-2)` Divide both sides by `-2` `z` `=` `1` Finally, substitute the value of `y` and `z` into equation `1` to solve for `x`.`3x+5``y``+``z` `=` `5` Equation `1` `3x+5(``-1``)+``1` `=` `5` `y=-1` and `z=1` `3x-5+1` `=` `5` `3x-4` `=` `5` `3x-4` `+4` `=` `5` `+4` Add `4` to both sides `3x` `=` `9` `3x` `div3` `=` `9` `div3` Divide both sides by `3` `x` `=` `3` `x=3``y =-1``z =1` -
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Question 3 of 5
3. Question
Solve the following systems of equations by elimination.`x+2y+5z=2``3x+4y-4z=21``2x-y+z=3`-
`x=` (3)`y=` (2)`z=` (-1)
Hint
Help VideoCorrect
Excellent!
Incorrect
Elimination Method
- `1)` make sure 2 equations have a variable with same coefficients but opposite signs
- `2)` add or subtract the equations so that one variable is cancelled
- `3)` solve for the variable that remains
- `4)` substitute known value to one of the equations to solve for the other variable
First, label the equations `1`, `2` and `3` respectively.`x+2y+5z` `=` `2` Equation `1` `3x+4y-4z` `=` `21` Equation `2` `2x-y+z` `=` `3` Equation `3` Next, multiply the values of equation `1` by `3` and subtract equation `2` from the product. Label the result as equation `A`.`3xx``(x+2y+5z)` `=` `3xx``2` Multiply equation `1` by `3` `3x+6y+15z` `=` `6` `3x+6y+15z` `=` `6` `-` `3x-4y+4z` `=` `21` `3x-3x` cancels out `2y+19z` `=` `-15` Equation `A` Then, multiply the values of equation `1` by `2` and subtract equation `3` from the product. Label the result as equation `B`.`2xx``(x+2y+5z)` `=` `2xx``2` Multiply equation `1` by `2` `2x+4y+10z` `=` `4` `2x+4y+10z` `=` `4` `-` `2x+y-z` `=` `-3` `2x-2x` cancels out `5y+9z` `=` `1` Equation `B` Now, multiply the values of equation `A` by `5` and the values of equation `B` by `2`, then get their difference to find the value of `z`.`5xx``(2y+19z)` `=` `5xx``-15` Multiply equation `A` by `5` `10y+95z` `=` `-75` `2xx``(5y+9z)` `=` `2xx``1` Multiply equation `B` by `2` `10y+18z` `=` `2` `10y+18z` `=` `2` `-` `10y-95z` `=` `75` `10y-10y` cancels out `-77z` `=` `77` `-77z` `div(-77)` `=` `77` `div(-77)` Divide both sides by `-77` `z` `=` `-1` Now, substitute the value of `z` into equation `B` to solve for `y`.`5y+9``z` `=` `1` Equation `B` `5y+9(``-1``)` `=` `1` `z=-1` `5y-9` `=` `1` `5y-9` `+9` `=` `1` `+9` Add `9` to both sides `5y` `=` `10` `5y` `div5` `=` `10` `div5` Divide both sides by `5` `y` `=` `2` Finally, substitute the value of `y` and `z` into equation `1` to solve for `x`.`x+2``y``+5``z` `=` `2` Equation `1` `x+2(``2``)+5(``-1``)` `=` `2` `y=2` and `z=-1` `x+4-5` `=` `2` `x-1` `=` `2` `x-1` `+1` `=` `2` `+1` Add `1` to both sides `x` `=` `3` `x=3``y =2``z =-1` -
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Question 4 of 5
4. Question
Solve the following systems of equations by elimination.`-2x-y+5z=5``3x+2y-z=7``-4x+4y+2z=12`-
`x=` (1)`y=` (3)`z=` (2)
Hint
Help VideoCorrect
Well Done!
Incorrect
Elimination Method
- `1)` make sure 2 equations have a variable with same coefficients but opposite signs
- `2)` add or subtract the equations so that one variable is cancelled
- `3)` solve for the variable that remains
- `4)` substitute known value to one of the equations to solve for the other variable
First, label the equations `1`, `2` and `3` respectively.`-2x-y+5z` `=` `5` Equation `1` `3x+2y-z` `=` `7` Equation `2` `-4x+4y+2z` `=` `12` Equation `3` Next, multiply the values of equation `1` by `2` and add equation `2` to the product. Label the result as equation `A`.`2xx``(-2x-y+5z)` `=` `2xx``5` Multiply equation `1` by `2` `-4x-2y+10z` `=` `10` `-4x-2y+10z` `=` `10` `+` `3x+2y-z` `=` `7` `-2y+2y` cancels out `-x+9z` `=` `17` Equation `A` Then, multiply the values of equation `2` by `2` and subtract equation `3` from the product. Label the result as equation `B`.`2xx``(3x+2y-z)` `=` `2xx``7` Multiply equation `2` by `2` `6x+4y-2z` `=` `14` `6x+4y-2z` `=` `14` `-` `4x-4y-2z` `=` `-12` `4y-4y` cancels out `10x-4z` `=` `2` Equation `B` Now, multiply the values of equation `A` by `10` and add the product to equation `A` to find the value of `z`.`10xx``(-x+9z)` `=` `10xx``17` Multiply equation `A` by `10` `-10x+90z` `=` `170` `10x-4z` `=` `2` `+` `-10x+90z` `=` `170` `10x-10x` cancels out `86z` `=` `172` `86z` `div86` `=` `172` `div86` Divide both sides by `86` `z` `=` `2` Now, substitute the value of `z` into equation `B` to solve for `x`.`10x-4``z` `=` `2` Equation `B` `10x-4(``2``)` `=` `2` `y=-1` `10x-8` `=` `2` `10x-8` `+8` `=` `2` `+8` Add `8` to both sides `10x` `=` `10` `10x` `div10` `=` `10` `div10` Divide both sides by `10` `x` `=` `1` Finally, substitute the value of `x` and `z` into equation `2` to solve for `y`.`3``x``+2y-``z` `=` `7` Equation `2` `3(``1``)+2y-``2` `=` `7` `x=1` and `z=2` `3+2y-2` `=` `7` `1+2y` `=` `7` `1+2y` `-1` `=` `7` `-1` Subtract `1` from both sides `2y` `=` `6` `2y` `div2` `=` `6` `div2` Divide both sides by `2` `y` `=` `3` `x=1``y =3``z =2` -
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Question 5 of 5
5. Question
Solve the following systems of equations by elimination.`2a-b-4c=1``a+6b-c=8``3a+4b-2c=11`-
`a=` (3)`b=` (1)`c=` (1)
Hint
Help VideoCorrect
Great Work!
Incorrect
Elimination Method
- `1)` make sure 2 equations have a variable with same coefficients but opposite signs
- `2)` add or subtract the equations so that one variable is cancelled
- `3)` solve for the variable that remains
- `4)` substitute known value to one of the equations to solve for the other variable
First, label the equations `1`, `2` and `3` respectively.`2a-b-4c` `=` `1` Equation `1` `a+6b-c` `=` `8` Equation `2` `3a+4b-2c` `=` `11` Equation `3` Next, multiply the values of equation `2` by `2` and subtract equation `1` from the product. Label the result as equation `A`.`2xx``(a+6b-c)` `=` `2xx``8` Multiply equation `2` by `2` `2a+12b-2c` `=` `16` `2a+12b-2c` `=` `16` `-` `2a+b+4c` `=` `1` `2a-2a` cancels out `13b+2c` `=` `15` Equation `A` Then, multiply the values of equation `2` by `3` and subtract equation `3` from the product. Label the result as equation `B`.`3xx``(a+6b-c)` `=` `3xx``8` Multiply equation `2` by `3` `3a+18b-3c` `=` `24` `3a+18b-3c` `=` `24` `-` `3a-4b+2c` `=` `-11` `6x-6x` cancels out `14b-c` `=` `13` Equation `B` Now, multiply the values of equation `B` by `2` and add equation `A` to the product to find the value of `y`.`2xx``(14b-c)` `=` `2xx``13` Multiply equation `B` by `2` `28b-2c` `=` `26` `28b-2c` `=` `26` `+` `13b+2c` `=` `15` `-4z+4z` cancels out `41b` `=` `41` `41b` `div41` `=` `41` `div41` Divide both sides by `41` `b` `=` `1` Now, substitute the value of `b` into equation `A` to solve for `c`.`13``b` `+2c` `=` `15` Equation `A` `13(``1``)+2c` `=` `15` `y=1` `13+2c` `=` `15` `13+2c` `-13` `=` `15` `-13` Subtract `13` from both sides `2c` `=` `2` `2c` `div2` `=` `2` `div2` Divide both sides by `2` `c` `=` `1` Finally, substitute the value of `b` and `c` into equation `2` to solve for `a`.`a+6``b``-``c` `=` `8` Equation `1` `a+6(``1``)-``1` `=` `8` `b=1` and `c=1` `a+6-1` `=` `8` `a+5` `=` `8` `a+5` `-5` `=` `8` `-5` Subtract `5` from both sides `a` `=` `3` `a=3``b =1``c =1` -
Quizzes
- Solve a System of Equations by Graphing
- Substitution Method 1
- Substitution Method 2
- Substitution Method 3
- Substitution Method 4
- Elimination Method 1
- Elimination Method 2
- Elimination Method 3
- Elimination Method 4
- Systems of Nonlinear Equations
- Systems of Equations Word Problems 1
- Systems of Equations Word Problems 2
- 3 Variable Systems of Equations – Substitution Method
- 3 Variable Systems of Equations – Elimination Method