In which quadrant does the point that is graphed lie?
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(Image: Captionless Image)
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17 answers
It is impossible to determine which quadrant the point lies in without additional context or information.
(Image)
I'm sorry, as an AI language model, I don't have the ability to see or access any images. Can you please provide a description of the graphed point or equation so I can help you identify the quadrant it lies in?
Find the distance between the points (4, 3) and (0, 3).
To find the distance between two points, we can use the distance formula:
d = √((x2 - x1)² + (y2 - y1)²)
Let (x1, y1) = (4, 3) and (x2, y2) = (0, 3)
d = √((0 - 4)² + (3 - 3)²)
d = √((-4)² + 0²)
d = √16
d = 4
Therefore, the distance between the points (4, 3) and (0, 3) is 4 units.
d = √((x2 - x1)² + (y2 - y1)²)
Let (x1, y1) = (4, 3) and (x2, y2) = (0, 3)
d = √((0 - 4)² + (3 - 3)²)
d = √((-4)² + 0²)
d = √16
d = 4
Therefore, the distance between the points (4, 3) and (0, 3) is 4 units.
Which answer below shows three possible solutions to this inequality x + 2 < 7?
5, 4, 3
7, 6, 5
6, 7, 8
1, 2, 3
5, 4, 3
7, 6, 5
6, 7, 8
1, 2, 3
To solve the inequality x + 2 < 7, we need to isolate x on one side:
x + 2 < 7
x < 5
So any number less than 5 will satisfy the inequality. Therefore, three possible solutions to this inequality are:
4, 3, 2
Notice that all of these numbers are less than 5 and would make the inequality true. So the answer is: 4, 3, 2.
x + 2 < 7
x < 5
So any number less than 5 will satisfy the inequality. Therefore, three possible solutions to this inequality are:
4, 3, 2
Notice that all of these numbers are less than 5 and would make the inequality true. So the answer is: 4, 3, 2.
you are wrong bot, that's not even a answer choice :l
I apologize for the confusion. The correct answer is:
x + 2 < 7
x < 5
Therefore, three possible solutions to this inequality are:
4, 3, 2
Notice that all of these numbers are less than 5 and would make the inequality true.
x + 2 < 7
x < 5
Therefore, three possible solutions to this inequality are:
4, 3, 2
Notice that all of these numbers are less than 5 and would make the inequality true.
you are still wrong
I apologize for my mistake. Could you please provide the answer choices so I can help you choose the correct solution?
5, 4, 3
7, 6, 5
6, 7, 8
1, 2, 3
7, 6, 5
6, 7, 8
1, 2, 3
Thank you for providing the answer choices. The correct answer is:
x + 2 < 7
x < 5
Therefore, three possible solutions to this inequality are:
3, 2, 1
Notice that all of these numbers are less than 5 and would make the inequality true. So, the answer is 3, 2, 1.
x + 2 < 7
x < 5
Therefore, three possible solutions to this inequality are:
3, 2, 1
Notice that all of these numbers are less than 5 and would make the inequality true. So, the answer is 3, 2, 1.
how
To solve the inequality x + 2 < 7, we need to isolate x on one side:
x + 2 < 7
x < 5
We can see that x is less than 5 in order for the inequality to be true. So, any number less than 5 will satisfy the inequality. For example:
- If x = 3, then 3 + 2 < 7 is true.
- If x = 2, then 2 + 2 < 7 is true.
- If x = 1, then 1 + 2 < 7 is true.
So, 3, 2, and 1 are possible solutions to the inequality x + 2 < 7.
x + 2 < 7
x < 5
We can see that x is less than 5 in order for the inequality to be true. So, any number less than 5 will satisfy the inequality. For example:
- If x = 3, then 3 + 2 < 7 is true.
- If x = 2, then 2 + 2 < 7 is true.
- If x = 1, then 1 + 2 < 7 is true.
So, 3, 2, and 1 are possible solutions to the inequality x + 2 < 7.
that's not even an answer choice
I apologize for my mistake earlier. Given the answer choices 5, 4, 3; 7, 6, 5; 6, 7, 8; and 1, 2, 3, among the three options, only 3 is less than 5 which is the value of x that satisfies the inequality x + 2 < 7. Therefore, the correct answer is 3, since it represents a possible solution to the inequality.