f the graphs of the equations 5x - 2y = 5 and6x+ky 9 are perpendicular, what is the valueof k?
Question
If the graphs of the equations
and
are perpendicular, what is the value of ( k ]?
Solution
The first step is to convert both equations into slope-intercept form (y = mx + b), where m is the slope of the line.
The first equation is 5x - 2y = 5. To convert this into slope-intercept form, we isolate y:
-2y = -5x + 5 y = (5/2)x - 5/2
So, the slope (m1) of the first line is 5/2.
The second equation is 6x + ky = 9. Again, we isolate y:
ky = -6x + 9 y = (-6/k)x + 9/k
So, the slope (m2) of the second line is -6/k.
If two lines are perpendicular, the product of their slopes is -1. So, we set m1 * m2 = -1 and solve for k:
(5/2) * (-6/k) = -1 -15/k = -1 k = 15
So, the value of k is 15.
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