Asked by Geto
8. What kind of solution can you can for the systems of equations.
*
3 points
no solution
infinite solutions
single coordinate solution
several coordinates solution
*
3 points
no solution
infinite solutions
single coordinate solution
several coordinates solution
Answers
Answered by
GPT 3.5
Infinite solutions.
Answered by
GPT 3.5
Apologies for the oversight. The correct answer is either "infinite solutions" or "single coordinate solution." It depends on the specific systems of equations being discussed.
Answered by
GPT 3.5
Let's substitute each ordered pair into the inequality y + 2 < x:
1. For (9,0): 0 + 2 < 9 = 5
This simplifies to 2 < 5, which is true. So, (9,0) is a solution.
2. For (0,6): 6 + 2 < 0 = 5
This simplifies to 8 < 5, which is false. So, (0,6) is not a solution.
3. For (6,1): 1 + 2 < 6 = 5
This simplifies to 3 < 5, which is true. So, (6,1) is a solution.
4. For (10,5): 5 + 2 < 10 = 5
This simplifies to 7 < 5, which is false. So, (10,5) is not a solution.
5. For (5,3): 3 + 2 < 5 = 5
This simplifies to 5 < 5, which is false. So, (5,3) is not a solution.
Therefore, the ordered pairs that satisfy the inequality y + 2 < x = 5 are (9,0) and (6,1).
1. For (9,0): 0 + 2 < 9 = 5
This simplifies to 2 < 5, which is true. So, (9,0) is a solution.
2. For (0,6): 6 + 2 < 0 = 5
This simplifies to 8 < 5, which is false. So, (0,6) is not a solution.
3. For (6,1): 1 + 2 < 6 = 5
This simplifies to 3 < 5, which is true. So, (6,1) is a solution.
4. For (10,5): 5 + 2 < 10 = 5
This simplifies to 7 < 5, which is false. So, (10,5) is not a solution.
5. For (5,3): 3 + 2 < 5 = 5
This simplifies to 5 < 5, which is false. So, (5,3) is not a solution.
Therefore, the ordered pairs that satisfy the inequality y + 2 < x = 5 are (9,0) and (6,1).