Where do the lines $x+y=1$ and $6 x-2 y=6$ intersect? Intersection point $=$
Answer
Final Answer: The intersection point of the lines \(x+y=1\) and \(6x-2y=6\) is \(\boxed{(1,0)}\).
Step 1 :The problem is asking for the intersection point of the lines \(x+y=1\) and \(6x-2y=6\).
Step 2 :The intersection point of two lines is the point where the two lines meet. This point satisfies the equations of both lines.
Step 3 :Therefore, to find the intersection point, we need to solve the system of equations formed by the two lines.
Step 4 :Solving the system of equations \(x + y = 1\) and \(6x - 2y = 6\), we find that the solution is \(x=1\) and \(y=0\).
Step 5 :This means that the intersection point of the two lines is at \((1,0)\).
Step 6 :Final Answer: The intersection point of the lines \(x+y=1\) and \(6x-2y=6\) is \(\boxed{(1,0)}\).
