How do you graph $y<3x-3/4$ on the coordinate plane?

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Answer 1 · 2018-03-19T12:15:45

See a solution process below:

First, solve for two points as an equation instead of an inequality to find the boundary line for the inequality.

For: $x = 0$

$y = (3 * 0) - 3/4$

2y = 0 - 3/4#

$y = -3/4$ or $(0, -3/4)$

For: $x = 1$

$y = (3 * 1) - 3/4$

$y = 3 - 3/4$

$y = (4/4 * 3) - 3/4$

$y = 12/4 - 3/4$

$y = 9/4$ or $(1, 9/4)$

We can now graph the two points on the coordinate plane and draw a line through the points to mark the boundary of the inequality.

graph{(x^2+(y+(3/4))^2-0.035)((x-1)^2+(y-(9/4))^2-0.035)(y-3x+(3/4))=0 [-10, 10, -5, 5]}

Now, we can shade the right side of the line to represent the inequality.

The boundary line will be changed to a dashed line because the inequality operator does not contain an "or equal to" clause.

graph{(y-3x+(3/4)) < 0 [-10, 10, -5, 5]}

How do you graph y<3x-3/4y<3x-3/4 on the coordinate plane?