which of the following points is a solution to the linear inequality y>1/9x-2/9

Question

which of the following points is a solution to the linear inequality y>1/9x-2/9

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7 answers
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Answer 1

Bot GPT 3.5 answered

To determine which of the following points is a solution to the linear inequality y > (1/9)x - (2/9), we need to substitute the x and y values of each point into the inequality and check whether the inequality holds true.

Since the points were not provided in the question, we cannot determine which points satisfy the inequality without the given options. Please provide the options or the points for a specific analysis.

Answer 2

:( answered

(0, -4/9)

(0, -1/9)

(0, -1/3)

(0, -2/9)

Answer 3

Bot GPT 3.5 answered

To determine which of the given points is a solution to the linear inequality y > (1/9)x - (2/9), we need to substitute the x and y values of each point into the inequality and check if it holds true.

1. For the point (0, -4/9):
y > (1/9)x - (2/9)
-4/9 > (1/9)(0) - (2/9)
-4/9 > -2/9

The inequality -4/9 > -2/9 is true, so the point (0, -4/9) is a solution to the inequality.

2. For the point (0, -1/9):
y > (1/9)x - (2/9)
-1/9 > (1/9)(0) - (2/9)
-1/9 > -2/9

The inequality -1/9 > -2/9 is true, so the point (0, -1/9) is a solution to the inequality.

3. For the point (0, -1/3):
y > (1/9)x - (2/9)
-1/3 > (1/9)(0) - (2/9)
-1/3 > -2/9

The inequality -1/3 > -2/9 is true, so the point (0, -1/3) is a solution to the inequality.

4. For the point (0, -2/9):
y > (1/9)x - (2/9)
-2/9 > (1/9)(0) - (2/9)
-2/9 > -2/9

The inequality -2/9 > -2/9 is not true, so the point (0, -2/9) is not a solution to the inequality.

Therefore, the points (0, -4/9), (0, -1/9), and (0, -1/3) are solutions to the linear inequality y > (1/9)x - (2/9).

Answer 4

:( answered

i can only have one answer, which one should i choose?

Answer 5

Bot GPT 3.5 answered

Since you can only choose one answer, you should choose any of the points that are solutions to the inequality. In this case, you can choose either (0, -4/9), (0, -1/9), or (0, -1/3) as the solution.

Answer 6

:( answered

are you sure?

Answer 7

Bot GPT 3.5 answered

Apologies for the confusion caused earlier. Since the inequality is y > (1/9)x - (2/9), we need to determine which of the given points satisfies this strict inequality.

When we substitute the x and y values of each point into the inequality, we get the following:

1. For the point (0, -4/9):
-4/9 > (1/9)(0) - (2/9)
-4/9 > -2/9

The inequality -4/9 > -2/9 is true, so the point (0, -4/9) is a solution to the strict inequality.

2. For the point (0, -1/9):
-1/9 > (1/9)(0) - (2/9)
-1/9 > -2/9

The inequality -1/9 > -2/9 is true, so the point (0, -1/9) is also a solution to the strict inequality.

3. For the point (0, -1/3):
-1/3 > (1/9)(0) - (2/9)
-1/3 > -2/9

The inequality -1/3 > -2/9 is also true, so the point (0, -1/3) satisfies the strict inequality.

Based on the given points, any of (0, -4/9), (0, -1/9), or (0, -1/3) can be chosen as a solution to the strict inequality y > (1/9)x - (2/9). Therefore, you can select any of these points as your answer.