The solution to the system is all pairs (x, y) that satisfy the equation Y = 8x - 2. The system does not have a unique solution, but rather a set of infinitely many solutions represented by the equation of the line Y = 8x - 2.
To solve the system of linear equations:
Equation 1: Y = 8x - 2
Equation 2: y - 8x = -2
We can use the substitution or elimination method. Let's use the substitution method:
Substitute the expression for Y from the first equation into the second equation:
(8x - 2) - 8x = -2
Simplify the equation:
-2 = -2
This equation is true. It means that the system of equations has infinitely many solutions. In other words, any value of x and y that satisfies the first equation will also satisfy the second equation.
The question probable may be:
Solve these 2 system of linear equations Y=8x-2;y-8x=-2