x + 6 = y
2x - y = 4
From the first equation, we can express x in terms of y:
x = y - 6
Now, let’s substitute this value of x into the second equation:
2(y - 6) - y = 4
2y - 12 - y = 4
y - 12 = 4
y = 16
So, the value of y that satisfies both equations is 16.
Step-by-step explanation:
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To find the value of y that satisfies both equations, we can solve the system of equations by substitution or elimination.
Using substitution:
We have the equations:
1) x + 6 = y
2) 2x - y = 4
From equation 1, we can isolate x and express it in terms of y:
Substitute this expression for x in equation 2:
Simplify the equation:
y = 4 + 12
Therefore, the value of y that satisfies both equations is y = 16.
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Answers & Comments
x + 6 = y
2x - y = 4
From the first equation, we can express x in terms of y:
x + 6 = y
x = y - 6
Now, let’s substitute this value of x into the second equation:
2x - y = 4
2(y - 6) - y = 4
2y - 12 - y = 4
y - 12 = 4
y = 16
So, the value of y that satisfies both equations is 16.
Verified answer
Step-by-step explanation:
[tex]\huge{❥}{\mathtt{{\purple{\boxed{\tt{\pink{\red{A}\pink{n}\orange{s}\green{w}\blue{e}\purple{r᭄}}}}}}}}❥[/tex]
To find the value of y that satisfies both equations, we can solve the system of equations by substitution or elimination.
Using substitution:
We have the equations:
1) x + 6 = y
2) 2x - y = 4
From equation 1, we can isolate x and express it in terms of y:
x = y - 6
Substitute this expression for x in equation 2:
2(y - 6) - y = 4
Simplify the equation:
2y - 12 - y = 4
y - 12 = 4
y = 4 + 12
y = 16
Therefore, the value of y that satisfies both equations is y = 16.