1 Answer

Wunderdojo · Answer 1 · 2020-11-18T11:21:58+0000

Answer:

Option B k > 0

Explanation:

we know that

Observing the graph

The slope of the line is positive

The y-intercept is negative

we have

$3y-2x=k(5x-4)+6\\ \\3y=5kx-4k+6+2x\\ \\3y=[5k+2]x+(6-4k)\\ \\y=(1)/(3)[5k+2]x+(2-(4)/(3)k)$

The slope of the line is equal to

m=(1)/(3)[5k+2]

Remember that the slope must be positive

so

$5k+2> 0\\ \\k > -(2)/(5)$

The value of k is greater than -2/5

Analyze the y-intercept

$(2-(4)/(3)k) < 0\\ \\ 2 < (4)/(3)k\\ \\1.5 < k\\ \\k > 1.5$

1.5 is greater than zero

so

the solution for k is the interval ------> (1.5,∞)

therefore

must be true

k > 0

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