To show that the other two angle measurements in each triangle are equal, you can use parallel lines cut by a transversal. Which two pairs of line segments formed by triangle sides are parallel, and what is the transversal for each pair
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Two parallel lines are cut by a transversal and form a pair of alternate exterior angles. One angle measures (6x + 5)° and the other measures (7x – 4)°. Explain how to determine what those angles actually measure?
alternate exterior angles, when parallel lines are cut by a transversal, are congruent. Therefore, the angles are equal...so set them equal.6x + 5 = 7x - 4...now we solve for x6x - 7x = -4 - 5-x = -9x = 9one angle (6x + 5) = 6(9) + 5 = 54 + 5 = 59 degreesother angle (7x - 4) = 7(9) - 4 = 63 - 4 = 59 degreesas u can see, they are both congruent and they each measure 59 degrees
On the graph, two right triangles have the line as the hypotenuse. In this task, you will use these triangles to show that the slope between points E and A is the same as the slope between points A and C. Q1: Which angles of the triangles measure 90°? Q2: To show that the other two angle measurements in each triangle are equal, you can use parallel lines cut by a transversal. Which two pairs of line segments formed by triangle sides are parallel, and what is the transversal for each pair?
Answer:1.The 6th one2. The pairs can be
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