Question
Solve the system of two equations using substitution. y=2+3x 4x−3y=−16 (1 point) Responses (−2, 4) left parenthesis negative 2 comma 4 right parenthesis (−2, −4) left parenthesis negative 2 comma negative 4 right parenthesis (2, 8) left parenthesis 2 comma 8 right parenthesis (2, 10)
Answers
Answer
Solve the system of equations. 2x+6y=−18 x=5y−1 (1 point) Responses (4, 1) left parenthesis 4 comma 1 right parenthesis (−7.25, −1.25) left parenthesis negative 7.25 comma negative 1.25 right parenthesis (−6, −1) left parenthesis negative 6 comma negative 1 right parenthesis (5.25, 1.25)
Answer
Solve the system of equations. 3x+y=2 7x−4y=30 (1 point) Responses (−2, 8) left parenthesis negative 2 comma 8 right parenthesis (12, 12) left parenthesis start fraction 1 over 2 end fraction comma start fraction 1 over 2 end fraction right parenthesis (2, −4) left parenthesis 2 comma negative 4 right parenthesis (2, −2)
Answer
Solve the system of equations. −4x+6y=38 x−5y=−20(1 point) Responses (−35, −3) left parenthesis negative 35 comma negative 3 right parenthesis (35, −3) left parenthesis 35 comma negative 3 right parenthesis (5, 3) left parenthesis 5 comma 3 right parenthesis (−5, 3)
Answer
How many solution(s) does the system of equations have? −5x+y=−18 10x−2y=36 (1 point) Responses one one two two infinite infinite none
Answered by
GPT 3.5
To solve the system of equations using substitution, we start by solving one equation for one variable and then substitute this value into the second equation.
Given equations:
1) y = 2 + 3x
2) 4x - 3y = -16
Step 1: Solve equation (1) for y:
Rearrange equation (1) to isolate y:
y = 2 + 3x
Step 2: Substitute this value for y into equation (2):
4x - 3(2 + 3x) = -16
Distribute the -3:
4x - 6 - 9x = -16
Combine like terms:
-5x - 6 = -16
Step 3: Isolate x:
Add 6 to both sides:
-5x = -10
Divide both sides by -5:
x = 2
Step 4: Substitute this value for x into equation (1) to find y:
y = 2 + 3(2) = 2 + 6 = 8
Therefore, the solution to the system of equations is (2, 8).
Given equations:
1) y = 2 + 3x
2) 4x - 3y = -16
Step 1: Solve equation (1) for y:
Rearrange equation (1) to isolate y:
y = 2 + 3x
Step 2: Substitute this value for y into equation (2):
4x - 3(2 + 3x) = -16
Distribute the -3:
4x - 6 - 9x = -16
Combine like terms:
-5x - 6 = -16
Step 3: Isolate x:
Add 6 to both sides:
-5x = -10
Divide both sides by -5:
x = 2
Step 4: Substitute this value for x into equation (1) to find y:
y = 2 + 3(2) = 2 + 6 = 8
Therefore, the solution to the system of equations is (2, 8).
Answered by
GPT 3.5
To solve the system of equations, we can substitute the value of x from equation (2) into equation (1).
Given equations:
1) 2x + 6y = -18
2) x = 5y - 1
Step 1: Substitute the value of x from equation (2) into equation (1):
2(5y - 1) + 6y = -18
Distribute the 2:
10y - 2 + 6y = -18
Step 2: Combine like terms:
16y - 2 = -18
Step 3: Isolate y:
Add 2 to both sides:
16y = -16
Divide both sides by 16:
y = -1
Step 4: Substitute this value for y back into equation (2) to find x:
x = 5(-1) - 1
x = -5 - 1
x = -6
Therefore, the solution to the system of equations is (-6, -1).
Given equations:
1) 2x + 6y = -18
2) x = 5y - 1
Step 1: Substitute the value of x from equation (2) into equation (1):
2(5y - 1) + 6y = -18
Distribute the 2:
10y - 2 + 6y = -18
Step 2: Combine like terms:
16y - 2 = -18
Step 3: Isolate y:
Add 2 to both sides:
16y = -16
Divide both sides by 16:
y = -1
Step 4: Substitute this value for y back into equation (2) to find x:
x = 5(-1) - 1
x = -5 - 1
x = -6
Therefore, the solution to the system of equations is (-6, -1).
Answered by
GPT 3.5
To solve the system of equations, we can use the method of substitution.
Given equations:
1) 3x + y = 2
2) 7x - 4y = 30
Step 1: Solve equation (1) for y:
y = 2 - 3x
Step 2: Substitute this value for y into equation (2):
7x - 4(2 - 3x) = 30
Distribute the -4:
7x - 8 + 12x = 30
Combine like terms:
19x - 8 = 30
Step 3: Isolate x:
Add 8 to both sides:
19x = 38
Divide both sides by 19:
x = 2
Step 4: Substitute this value for x into equation (1) to find y:
3(2) + y = 2
6 + y = 2
y = -4
Therefore, the solution to the system of equations is (2, -4).
Given equations:
1) 3x + y = 2
2) 7x - 4y = 30
Step 1: Solve equation (1) for y:
y = 2 - 3x
Step 2: Substitute this value for y into equation (2):
7x - 4(2 - 3x) = 30
Distribute the -4:
7x - 8 + 12x = 30
Combine like terms:
19x - 8 = 30
Step 3: Isolate x:
Add 8 to both sides:
19x = 38
Divide both sides by 19:
x = 2
Step 4: Substitute this value for x into equation (1) to find y:
3(2) + y = 2
6 + y = 2
y = -4
Therefore, the solution to the system of equations is (2, -4).
Answered by
GPT 3.5
To solve the system of equations, we can use the method of substitution.
Given equations:
1) -4x + 6y = 38
2) x - 5y = -20
Step 1: Solve equation (2) for x:
x = -20 + 5y
Step 2: Substitute this value for x into equation (1):
-4(-20 + 5y) + 6y = 38
Distribute the -4:
80 - 20y + 6y = 38
Simplify:
80 - 14y = 38
Step 3: Isolate y:
Subtract 80 from both sides:
-14y = -42
Divide both sides by -14:
y = 3
Step 4: Substitute this value for y into equation (2) to find x:
x - 5(3) = -20
x - 15 = -20
x = -5
Therefore, the solution to the system of equations is (-5, 3).
Given equations:
1) -4x + 6y = 38
2) x - 5y = -20
Step 1: Solve equation (2) for x:
x = -20 + 5y
Step 2: Substitute this value for x into equation (1):
-4(-20 + 5y) + 6y = 38
Distribute the -4:
80 - 20y + 6y = 38
Simplify:
80 - 14y = 38
Step 3: Isolate y:
Subtract 80 from both sides:
-14y = -42
Divide both sides by -14:
y = 3
Step 4: Substitute this value for y into equation (2) to find x:
x - 5(3) = -20
x - 15 = -20
x = -5
Therefore, the solution to the system of equations is (-5, 3).
Answered by
GPT 3.5
To determine the number of solutions the system of equations has, we can analyze the slopes of the two equations.
Given equations:
1) -5x + y = -18
2) 10x - 2y = 36
Step 1: Rearrange equation (1) to slope-intercept form:
y = 5x - 18
Step 2: Rearrange equation (2) to slope-intercept form:
y = 5x - 18
Comparing the two equations, we can see that they have the same slope (5) and the same y-intercept (-18). This means the two lines are parallel and will never intersect.
Since the lines do not intersect, the system of equations has no solution.
Therefore, the system of equations has no solution.
Given equations:
1) -5x + y = -18
2) 10x - 2y = 36
Step 1: Rearrange equation (1) to slope-intercept form:
y = 5x - 18
Step 2: Rearrange equation (2) to slope-intercept form:
y = 5x - 18
Comparing the two equations, we can see that they have the same slope (5) and the same y-intercept (-18). This means the two lines are parallel and will never intersect.
Since the lines do not intersect, the system of equations has no solution.
Therefore, the system of equations has no solution.
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