Question

Horizontal lines e and f are cut by vertical lines a and b. At the intersection of lines a and e, the uppercase right angle is (x + 1) degrees. At the intersection of lines a and f, the bottom right angle is (x minus 3) degrees. At the intersection of lines b and e, the bottom left angle is y degrees. If a ∥ b and e ∥ f, what is the value of y? 87 88 91 92

Answer 1

To find the value of y, we need to use the properties of parallel lines and angles. Since a ∥ b and e ∥ f, we can use the properties of corresponding angles to find the value of y.

Step-by-step explanation:

To find the value of y, we need to use the properties of parallel lines and angles. Since a ∥ b and e ∥ f, we can use the properties of corresponding angles to find the value of y.

At the intersection of lines b and e, the bottom left angle is y degrees. Since line a is parallel to line b, the bottom left angle is also equal to the uppercase right angle on line a and line e, which is (x + 1) degrees.

Therefore, we can set up the equation y = (x + 1). Given that the uppercase right angle at the intersection of lines a and e is (x + 1) degrees, we need to find the value of x to determine the value of y.

Answer 2

Your real answer is 92

Step-by-step explanation:

Hope this helps