Ask Question
26 May, 23:09

Solve using linear combination. 8x+14y=4 - 6x-7y+-10

+3
Answers (1)
  1. 27 May, 02:17
    0
    It's best to write the two equations as a vertical column:

    8x+14y=4

    -6x-7y = - 10

    Note that if we multiply the 2nd equation by 2, we get - 12x - 14y = - 20. The reason for wanting this version of the 2nd equation is that its - 14y cancels the + 14y in the first equation:

    -12x - 14y = - 20

    8x+14y=4

    Combine these equations, column by column. We get - 4x = - 16, which results in x = 4. Now find y by subbing 4 for x in either given equation. If we use the first equation, we get 8 (4) + 14y = 4, or 32 + 14y = 4, or 14y = - 28. Then y = - 2.

    The solution to this system of linear equations is thus (4,-2).

    Check this result by substitution of these coordinates into - 6 (4) - 7y = - 20:

    -24 - 7 (-2) = - 10. Is this true or not?

    -24 + 14 = - 10 is true. Thus, (4,-2) is the desired solution.
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Solve using linear combination. 8x+14y=4 - 6x-7y+-10 ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers