Ask Question
22 April, 07:37

For what value of k will the graph of 2x + ky = 6 be perpendicular to the graph of 6x - 4y = 12?

+4
Answers (2)
  1. 22 April, 10:47
    0
    The problem wants to calculate the possible value of K that the first equation should be perpendicular to the second equation. First you must transform the both equation in to y slope intercept form or y = mx+b. By means of that you can identify its slope. The slope of the second equation is 6/4 so the first equation slope must be equal to the reciprocal of its slope and should be 3/2. So the value of K = 3.
  2. 22 April, 11:36
    0
    Perpendicular is when the slopes multiply to negative 1

    remember

    the slope of the line in form

    ax+by=c is - a/b

    find slopes

    2x+ky=6

    slope is - 2/k

    6x-4y=12

    slope is - 6/-4=3/2

    so

    -2/k times 3/2=-1

    solve for k

    -6 / (2k) = - 1

    times both sides by 2k

    -6=-2k

    divide by - 1

    3=k

    k has to be 3
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “For what value of k will the graph of 2x + ky = 6 be perpendicular to the graph of 6x - 4y = 12? ...” 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