Final answer:
To find m/1, solve for x using the equations m/2 = (7x-11)° and m/4= (4x + 4)°, find the value of m/2, and then multiply it by 2 to get m/1.
Step-by-step explanation:
To find the value of m/1, we need to use the concept of angles formed by parallel lines and a transversal. We know that angle m/2 is equal to the angle formed by 7x-11 and angle m/4 is equal to the angle formed by 4x+4. Since alternate interior angles are congruent in parallel lines, we can set up an equation:
(7x-11)° = (4x+4)°
Solving this equation will give us the value of x, and then we can substitute it back into either of the given equations to find the value of m/2. Once we have the value of m/2, we can find the value of m/1 by multiplying it by 2:
m/1 = 2 * m/2
By substituting the value of m/2, we can find the final answer.
Learn more about Finding the value of m/1 using angles formed by parallel lines