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2 November, 15:16

Create an equivalent system of these equations and test your solution

x + y = 1

x 3y = 9

+1
Answers (2)
  1. 2 November, 16:10
    0
    An equvilent equation

    remember you can do anything to an equation as long asyou do it to both sides

    assuming yo have

    x+y=1 and

    x-3y=9

    mulitply both by 2

    2x+2y=2

    2x-6y=18

    those are equvilent

    ok, solve initial

    x+y=1

    x-3y=9

    multiply first equation by - 1 and add to 2nd equation

    -x-y=-1

    x-3y=9 +

    0x-4y=8

    -4y=8

    divide both sides by - 4

    y=-2

    sub back

    x+y=1

    x-2=1

    add 2

    x=3

    x=3

    y=-2

    (3,-2)

    if we test it in other one

    2x+2y=2

    2 (3) + 2 (-2) = 2

    6-4=2

    2=2

    yep

    2x-6y=18

    2 (3) - 6 (-2) = 18

    6+12=18

    18=18

    yep

    solution is (3,-2)
  2. 2 November, 18:26
    0
    Equivalent system is the same set of eqns n has the same solution

    so for x + y = 1 and x + 3y = 9

    an equivalent system can be created by multiplying everything by 3

    3x + 3y = 3 and 3x + 9y = 27

    solving by substracting one from the other

    9y - 3y = 27 - 3

    6y = 24

    y = 4

    x = 1 - y = 1 - 4

    = - 3

    substituting (-3,4) back into

    x + y = 1 and x + 3y = 9

    -3 + 4 = 1 and - 3 + 3*4 = 9

    so the solutions are good
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