Answer:
2A + 3W = 12 ---(1)
6A - 5W = 8 ---(2)
We can solve this system using the method of elimination or substitution. Let's use the method of substitution:
From equation (1), we can express A in terms of W:
2A = 12 - 3W
A = (12 - 3W) / 2
Substitute this value of A in equation (2):
6((12 - 3W) / 2) - 5W = 8
Simplify the equation:
6(12 - 3W) - 10W = 16
72 - 18W - 10W = 16
72 - 28W = 16
-28W = 16 - 72
-28W = -56
W = (-56) / (-28)
W = 2
Now that we have the value of W, we can substitute it back into equation (1) to find the value of A:
2A + 3(2) = 12
2A + 6 = 12
2A = 12 - 6
2A = 6
A = 6 / 2
A = 3
Therefore, in the given system of equations, the value of A is 3.
Explanation:
2A + 3W = 12 ---(1)
6A - 5W = 8 ---(2)
We can solve this system using the method of elimination or substitution. Let's use the method of substitution:
From equation (1), we can express A in terms of W:
2A = 12 - 3W
A = (12 - 3W) / 2
Substitute this value of A in equation (2):
6((12 - 3W) / 2) - 5W = 8
Simplify the equation:
6(12 - 3W) - 10W = 16
72 - 18W - 10W = 16
72 - 28W = 16
-28W = 16 - 72
-28W = -56
W = (-56) / (-28)
W = 2
Now that we have the value of W, we can substitute it back into equation (1) to find the value of A:
2A + 3(2) = 12
2A + 6 = 12
2A = 12 - 6
2A = 6
A = 6 / 2
A = 3
Therefore, in the given system of equations, the value of A is 3.