Question
1. Review the graphs of a system of two linear equations in two variables: x − 5y = 7 and 3x − 2y = −4. Find the solution to both equations. Note the answer isn't (3, 2) or (3, -2) or a fraction.
The intersection point is (____), (____).
The intersection point is (____), (____).
Answers
Answer
1. Review the graphs of a system of two linear equations in two variables: x − 5y = 7 and 3x − 2y = −4. Find the solution to both equations. Note the answer isn't (3, 2) or (3, -2) or a fraction.
On a graph there's 3x - 2y = -4 and x - 5y = 3.
The intersection point is (____), (____).
I'm telling you all the information please tell me the correct answer.
On a graph there's 3x - 2y = -4 and x - 5y = 3.
The intersection point is (____), (____).
I'm telling you all the information please tell me the correct answer.
Answer
THAT IS WRONG
Answer
THE ANSWER IS NOT A FRACTION AND THE ANSWER IS NOT (3, 2) or (3, -2)
Answer
I'm just gonna leave it blank
Answer
It's okay I got 4/5 sorry for being angry bye
Answered by
GPT 3.5
(3, -2)
Answered by
GPT 3.5
Based on the equations x - 5y = 7 and 3x - 2y = -4, the correct intersection point is (3, -2).
Answered by
GPT 3.5
I apologize for the mistake in my previous responses. Let's reevaluate the system of equations x - 5y = 7 and 3x - 2y = -4.
To find the solution, we can solve these equations simultaneously by either substitution or elimination. Let's use the elimination method.
Given:
x - 5y = 7 (Equation 1)
3x - 2y = -4 (Equation 2)
Multiplying Equation 1 by 3, we get:
3x - 15y = 21
Subtracting Equation 2 from the modified Equation 1:
(3x - 15y) - (3x - 2y) = 21 - (-4)
-13y = 25
y = -25/13
Now, substitute y = -25/13 into Equation 1:
x - 5(-25/13) = 7
x + 125/13 = 7
x = 7 - 125/13
x = 91/13 - 125/13
x = -34/13
Therefore, the solution to the system of equations x - 5y = 7 and 3x - 2y = -4 is (-34/13, -25/13).
To find the solution, we can solve these equations simultaneously by either substitution or elimination. Let's use the elimination method.
Given:
x - 5y = 7 (Equation 1)
3x - 2y = -4 (Equation 2)
Multiplying Equation 1 by 3, we get:
3x - 15y = 21
Subtracting Equation 2 from the modified Equation 1:
(3x - 15y) - (3x - 2y) = 21 - (-4)
-13y = 25
y = -25/13
Now, substitute y = -25/13 into Equation 1:
x - 5(-25/13) = 7
x + 125/13 = 7
x = 7 - 125/13
x = 91/13 - 125/13
x = -34/13
Therefore, the solution to the system of equations x - 5y = 7 and 3x - 2y = -4 is (-34/13, -25/13).
Answered by
GPT 3.5
Given the system of equations:
1. x - 5y = 7
2. 3x - 2y = -4
Let's solve this system of equations:
From equation 1, we can express x in terms of y:
x = 7 + 5y
Now, substitute x in terms of y into equation 2:
3(7 + 5y) - 2y = -4
21 + 15y - 2y = -4
13y = -25
y = -25/13
Now, substitute y = -25/13 back into x = 7 + 5y:
x = 7 + 5(-25/13)
x = 7 - 125/13
x = (91 - 125)/13
x = -34/13
Therefore, the solution to the system of equations is x = -34/13 and y = -25/13. The correct point of intersection is (-34/13, -25/13).
1. x - 5y = 7
2. 3x - 2y = -4
Let's solve this system of equations:
From equation 1, we can express x in terms of y:
x = 7 + 5y
Now, substitute x in terms of y into equation 2:
3(7 + 5y) - 2y = -4
21 + 15y - 2y = -4
13y = -25
y = -25/13
Now, substitute y = -25/13 back into x = 7 + 5y:
x = 7 + 5(-25/13)
x = 7 - 125/13
x = (91 - 125)/13
x = -34/13
Therefore, the solution to the system of equations is x = -34/13 and y = -25/13. The correct point of intersection is (-34/13, -25/13).
Answered by
GPT 3.5
I apologize for any confusion caused. If you have any further questions or need assistance in the future, please feel free to ask. Thank you for your patience.
Answered by
GPT 3.5
That's okay, I understand. If you ever need help in the future, feel free to reach out. Thank you for letting me assist you, and have a great day! Goodbye!
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