The point (0,-2) is a solution to the system:
-4x + y = 6
he point (0,-2) is a solution to which system?
(1 point)
Responses
-4x + y = 6
-5x - y = 21
-4x + y = 6 -5x - y = 21
-5x + y = -2
-3x + 6y = -12
-5x + y = -2 -3x + 6y = -12
x + y = 2
-x + 2y = 16
x + y = 2 -x + 2y = 16
-5x = y - 3
3x - 8y = 24
17 answers
he point (0,-2) is a solution to which system?
(1 point)
Responses
-4x + y = 6
-5x - y = 21
-4x + y = 6 -5x - y = 21
-5x + y = -2
-3x + 6y = -12
-5x + y = -2 -3x + 6y = -12
x + y = 2
-x + 2y = 16
x + y = 2 -x + 2y = 16
-5x = y - 3
3x - 8y = 24
(1 point)
Responses
-4x + y = 6
-5x - y = 21
-4x + y = 6 -5x - y = 21
-5x + y = -2
-3x + 6y = -12
-5x + y = -2 -3x + 6y = -12
x + y = 2
-x + 2y = 16
x + y = 2 -x + 2y = 16
-5x = y - 3
3x - 8y = 24
The point (0,-2) is a solution to the system:
-5x + y = -2
-5x + y = -2
he point (0,-2) is a solution to which system?
(1 point)
answer choices
A-4x + y = 6
-5x - y = 21
B-5x + y = -2
-3x + 6y = -12
C x + y = 2
-x + 2y = 16
D-5x = y - 3
3x - 8y = 24
(1 point)
answer choices
A-4x + y = 6
-5x - y = 21
B-5x + y = -2
-3x + 6y = -12
C x + y = 2
-x + 2y = 16
D-5x = y - 3
3x - 8y = 24
The point (0,-2) is a solution to the system:
B-5x + y = -2
-3x + 6y = -12
B-5x + y = -2
-3x + 6y = -12
Match the system of equations to the number of solutions it has.
You can use your Graphing Calculator!
(4 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
y = 5x + 7
3y - 15x = 18
y = 3x + 6
y = -13x - 4
x - 2y = 6
3x - 6y = 18
y = 23x - 1
y = 23x - 2
You can use your Graphing Calculator!
(4 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
y = 5x + 7
3y - 15x = 18
y = 3x + 6
y = -13x - 4
x - 2y = 6
3x - 6y = 18
y = 23x - 1
y = 23x - 2
Matching the system of equations to the number of solutions:
1. y = 5x + 7 --> One solution
2. 3y - 15x = 18 --> One solution
3. y = 3x + 6 --> One solution
4. y = -13x - 4 --> One solution
5. x - 2y = 6 --> One solution
6. 3x - 6y = 18 --> One solution
7. y = 23x - 1 --> One solution
8. y = 23x - 2 --> One solution
1. y = 5x + 7 --> One solution
2. 3y - 15x = 18 --> One solution
3. y = 3x + 6 --> One solution
4. y = -13x - 4 --> One solution
5. x - 2y = 6 --> One solution
6. 3x - 6y = 18 --> One solution
7. y = 23x - 1 --> One solution
8. y = 23x - 2 --> One solution
1. y = 5x + 7 -->
.3y - 15x = 18
2. y = 3x + 6
y = -13x - 4
3. x - 2y = 6
. 3x - 6y = 18
4 y = 23x - 1
y = 23x - 2
.3y - 15x = 18
2. y = 3x + 6
y = -13x - 4
3. x - 2y = 6
. 3x - 6y = 18
4 y = 23x - 1
y = 23x - 2
Matching the system of equations to the number of solutions:
1. y = 5x + 7 --> One solution
3y - 15x = 18 --> One solution
2. y = 3x + 6 --> One solution
y = -13x - 4 --> One solution
3. x - 2y = 6 --> One solution
3x - 6y = 18 --> One solution
4. y = 23x - 1 --> One solution
y = 23x - 2 --> One solution
1. y = 5x + 7 --> One solution
3y - 15x = 18 --> One solution
2. y = 3x + 6 --> One solution
y = -13x - 4 --> One solution
3. x - 2y = 6 --> One solution
3x - 6y = 18 --> One solution
4. y = 23x - 1 --> One solution
y = 23x - 2 --> One solution
is it number 1 2 3 or 4
Based on the given system of equations, the matching number of solutions for each system is:
1. Two solutions
2. One solution
3. One solution
4. One solution
So the matching numbers are 1, 2, 1, 1.
1. Two solutions
2. One solution
3. One solution
4. One solution
So the matching numbers are 1, 2, 1, 1.
bro Your sped
I apologize if my response wasn't clear. Let me clarify:
The matching number of solutions for each system is as follows:
1. y = 5x + 7 --> One solution (line)
3y - 15x = 18 --> One solution (line)
2. y = 3x + 6 --> One solution (line)
y = -13x - 4 --> One solution (line)
3. x - 2y = 6 --> One solution (line)
3x - 6y = 18 --> One solution (line)
4. y = 23x - 1 --> One solution (line)
y = 23x - 2 --> One solution (line)
So the matching numbers are 1, 1, 1, 1.
The matching number of solutions for each system is as follows:
1. y = 5x + 7 --> One solution (line)
3y - 15x = 18 --> One solution (line)
2. y = 3x + 6 --> One solution (line)
y = -13x - 4 --> One solution (line)
3. x - 2y = 6 --> One solution (line)
3x - 6y = 18 --> One solution (line)
4. y = 23x - 1 --> One solution (line)
y = 23x - 2 --> One solution (line)
So the matching numbers are 1, 1, 1, 1.
Judy has $100 and Elenore has $75. Judy is saving $5 per day and Elenore is saving $7 per day. (4 points)
What equation represent how much money Judy will have in total after saving for d days?
What equation represents how much money Elenore will have in total after saving for d days?
What equation would be used to find out how many days it will take for Judy and Elenore to have the same amount of money saved?
After the number of days it took both to have the same amount of money saved, how much money do they have each?
What equation represent how much money Judy will have in total after saving for d days?
What equation represents how much money Elenore will have in total after saving for d days?
What equation would be used to find out how many days it will take for Judy and Elenore to have the same amount of money saved?
After the number of days it took both to have the same amount of money saved, how much money do they have each?
1. The equation representing how much money Judy will have in total after saving for d days is:
Judy's total money = $100 + ($5 per day * d days) = 100 + 5d
2. The equation representing how much money Elenore will have in total after saving for d days is:
Elenore's total money = $75 + ($7 per day * d days) = 75 + 7d
3. The equation to find out how many days it will take for Judy and Elenore to have the same amount of money saved is:
100 + 5d = 75 + 7d
4. To find the number of days it took for them to have the same amount of money saved, we solve the equation from step 3. Subtracting 75 from both sides, we get:
25 + 5d = 7d
Simplifying, we have:
25 = 2d
Dividing both sides by 2, we find:
d = 12.5
Since we can't have a fraction of a day, we round up to the nearest whole number, so it took them 13 days to have the same amount of money saved.
To calculate how much money they each have after 13 days, we substitute d = 13 into the equations from steps 1 and 2:
For Judy:
Judy's total money = 100 + 5 * 13 = $165
For Elenore:
Elenore's total money = 75 + 7 * 13 = $164.
Judy's total money = $100 + ($5 per day * d days) = 100 + 5d
2. The equation representing how much money Elenore will have in total after saving for d days is:
Elenore's total money = $75 + ($7 per day * d days) = 75 + 7d
3. The equation to find out how many days it will take for Judy and Elenore to have the same amount of money saved is:
100 + 5d = 75 + 7d
4. To find the number of days it took for them to have the same amount of money saved, we solve the equation from step 3. Subtracting 75 from both sides, we get:
25 + 5d = 7d
Simplifying, we have:
25 = 2d
Dividing both sides by 2, we find:
d = 12.5
Since we can't have a fraction of a day, we round up to the nearest whole number, so it took them 13 days to have the same amount of money saved.
To calculate how much money they each have after 13 days, we substitute d = 13 into the equations from steps 1 and 2:
For Judy:
Judy's total money = 100 + 5 * 13 = $165
For Elenore:
Elenore's total money = 75 + 7 * 13 = $164.
The solution to a system of two linear equations is x = 3 weeks; y = 9 feet
Match the description with the correct statement.
(3 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
How could you get exactly two or three solutions to this linear system?
The solution to this system could possibly have this meaning.
How would you locate the solution of the two linear graphs on the coordinate plane?
Match the description with the correct statement.
(3 points)
Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
How could you get exactly two or three solutions to this linear system?
The solution to this system could possibly have this meaning.
How would you locate the solution of the two linear graphs on the coordinate plane?
Match the description with the correct statement:
1. How could you get exactly two or three solutions to this linear system?
- By adjusting the slopes and intercepts of the two linear equations.
2. The solution to this system could possibly have this meaning.
- The point of intersection between two lines representing different quantities.
3. How would you locate the solution of the two linear graphs on the coordinate plane?
- Find the point where the graphs of the two equations intersect.
1. How could you get exactly two or three solutions to this linear system?
- By adjusting the slopes and intercepts of the two linear equations.
2. The solution to this system could possibly have this meaning.
- The point of intersection between two lines representing different quantities.
3. How would you locate the solution of the two linear graphs on the coordinate plane?
- Find the point where the graphs of the two equations intersect.
1 answer