Solve the system of linear equations with substitution;
x+4y=14 Equation 1
3x+7y=22 Equation 2
Solve Equation 1 for x
x + 4y = 14 Isolate the variable by moving the second variable to the other side using the inverse operation which in this case is subtraction. So.....
x + 4y = 14
- 4y = -4y
x = 14 - 4y
Now insert your answer above into Equation 2.
3x + 7y = 22
3(14 -4y) + 7y = 22 Now distribute to eliminate parenthesis
42 - 12y + 7y = 22
42 - 5y = 22 Combine like terms and remember the 12 is
-42 -42 technically negative
-5y = -20 Isolate the variable which in this case we divide
-5y/-5 = -20/-5
y = 4
Going back to Equation 1. Insert the know variable to solve for x.
x+4y=14 Equation 1
x + 4(4) = 14
x + 16 = 14 Isolate the variable by subtracting 16 from both sides
- 16 -16
x = -2
The solution is an ordered pair (x,y) ........ (-2, 4).
Check your work by inserting the ordered pair into either of the equations.
x+4y=14 Equation 1
-2 + 4(4) = 14
-2 + 16 = 14
14 = 14
3x+7y=22 Equation 2
3(-2) + 7(4) = 22
-6 + 28 = 22
22 = 22