Asked by Tiffany
I am really have a tough time trying to solve this problem. I think my first three steps are correct but I am not sure. Could someone please help me? I got lost somewhere on one of these steps. I thonk it was step 3, 4, 5. Thank you.
The two numbers chosen for my solution will be 3 and 6.
Solving the system of equations by the Addition/Subtraction method
Step 1 – Write both equations in the form of ax+ by= c
Equation 1: 4x-y = 3
Equation 2: x+y = 6
Step 2 –Multiply one or both equations by numbers so that the absolute values of the either of the coefficients of the x terms or the y terms are alike, I will multiply my equation by -4.
x + y = 6
-4(x + y) = -4(6)
-4x -4y = -24
Step 3 – Eliminate one of the variables by adding the equations if the signs of the coefficients of the variable are different. Subtract the equations if the signs of the coefficients of the variable are the same.
(4x – y = 3) + (-4x -4y = -24)
-3y = -12 --> y = 3
Step 4 – Plug back into equation 1 to solve for x:
4x – y = 3
4x – (3) = 6
2x = 12 --> x = 6
Step 5
CHECK using equation 2:
x+y = 6+ 3 = 9
So the solution is (6
The two numbers chosen for my solution will be 3 and 6.
Solving the system of equations by the Addition/Subtraction method
Step 1 – Write both equations in the form of ax+ by= c
Equation 1: 4x-y = 3
Equation 2: x+y = 6
Step 2 –Multiply one or both equations by numbers so that the absolute values of the either of the coefficients of the x terms or the y terms are alike, I will multiply my equation by -4.
x + y = 6
-4(x + y) = -4(6)
-4x -4y = -24
Step 3 – Eliminate one of the variables by adding the equations if the signs of the coefficients of the variable are different. Subtract the equations if the signs of the coefficients of the variable are the same.
(4x – y = 3) + (-4x -4y = -24)
-3y = -12 --> y = 3
Step 4 – Plug back into equation 1 to solve for x:
4x – y = 3
4x – (3) = 6
2x = 12 --> x = 6
Step 5
CHECK using equation 2:
x+y = 6+ 3 = 9
So the solution is (6
Answers
Answered by
Reiny
This looks like a lot of
"Much Ado About Nothing"
If your equations are
4x-y=3 and
x+y = 6 , why not just add them as they are?
5x=9
x=9/5 or 1.8
sub into x+y=6
you can get
y = 4.2
your solution of x=6, y=3 work in your second equation, but not in the first.
So your solution is incorrect.
The error was when you added your equations
4x-y=3
-4x-4y=-24
------------
-5y = -21
y = -21/-5 = 4.2
etc.
"Much Ado About Nothing"
If your equations are
4x-y=3 and
x+y = 6 , why not just add them as they are?
5x=9
x=9/5 or 1.8
sub into x+y=6
you can get
y = 4.2
your solution of x=6, y=3 work in your second equation, but not in the first.
So your solution is incorrect.
The error was when you added your equations
4x-y=3
-4x-4y=-24
------------
-5y = -21
y = -21/-5 = 4.2
etc.
Answered by
renos
x=9/5
y=21/5
solve one equation for x and plug the answer to the other equation and solve it
y=21/5
solve one equation for x and plug the answer to the other equation and solve it
Answered by
Г / Geh (G’s Russian brother)
Btw if you need help with Intersections, use Desmos calculator! It gives you answers for that stuff,
Desmos/graphing
Desmos/graphing
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