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3 May, 15:32

What is the solution of this linear system? x+y=13

1/2x+y=10

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Answers (1)
  1. 3 May, 15:44
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    The solution of the linear equation is: (6,7)

    Step-by-step explanation:

    This being that:

    x + y = 13

    1/2x + y = 10

    What you do in order to find the solution is either (2 ways):

    - Substitution

    - Elimination

    I'm sure that either way, you'll get the same thing. I used: Substitution.

    To do this choose either if you want to find [x] or [y] first, then substitute it in. I will choose to find [x] first.

    x + y = 13 - y x = 13 - y

    Now substitute it into:

    1/2x + y = 10

    1/2 (13 - y) + y = 10

    1/2 (13 - y) + y = 10

    Then to get rid of fraction, instead of dividing, you multiply with reciprocal1/2 · 2/1 (They cancel out) Leaving you with: (13 - y) 2 (y) = 2 (10) (Everything is multiplied, except for 13 - y, because it had parenthesis to protect it.) 13 - y + 2y = 2013 + y = 20 - 13 - 13 y = 7You now have your [y] for your coordinate. (x, 7), now time to find your [x]

    Now you substitute your [y] into your equation:

    1/2x + (7) = 10

    1/2x + 7 = 10 - 7 = - 71/2x = 3 (To get rid of fraction, multiply on both sides with reciprocal) 1/2 cancels out with 2/1x = 2 (3) x = 6You now have your [x] coordinate. This is your coordinate: (6,7)
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