Ask Question
21 November, 10:18

Find the solution to the system of equations given below using elimination by addition.

15x + 15y = 60

5x - 5y = 40

+1
Answers (1)
  1. 21 November, 13:26
    0
    15x + 15y = 60

    5x - 5y = 40

    To use elimination by addition, you need to get variables in one equation the same but negative in the other equation. For example, to use addition elimination to match the first equation, the second equation has to be - 15x or - 15y.

    Luckily, the second equation is easily manipulated to get to - 15y.

    To go from - 5y to - 15y you just need to multiply by 3, so we multiply the whole second equation by 3:

    3 (5x - 5y = 40)

    15x - 15y = 120

    Now we can add the two equations to "eliminate" the y's

    15x + 15 y = 60

    + 15x - 15y = 120

    30x + 0y = 180

    now solve for x:

    30x = 180

    divide both sides by 30

    x = 6

    Now that we solved for x, we can plug it back into the original equations to get y:

    15 (6) + 15y = 60

    90 + 15y = 60

    15y = - 30

    y = - 2

    5 (6) - 5y = 40

    30 - 5y = 40

    -5y = 10

    y = - 2

    x = 6 and y = - 2
Know the Answer?
Not Sure About the Answer?
Get an answer to your question ✅ “Find the solution to the system of equations given below using elimination by addition. 15x + 15y = 60 5x - 5y = 40 ...” in 📙 Mathematics if there is no answer or all answers are wrong, use a search bar and try to find the answer among similar questions.
Search for Other Answers