AA Criterion for Similar Triangles, Part 1 You will use the GeoGebra geometry tool to investigate how many pairs of corresponding angles in two triangles are enough to prove that the two triangles are similar. Open GeoGebra, and complete each step below. If you need help, follow these instructions for using GeoGebra. Part A Create a random triangle, ΔABC. Measure and record its angles.This is part A of this question: Angle∠ABC∠ACB∠CABMeasure eachNow Part B: Part BNow you will attempt to copy your original triangle using one of its angles:Draw a line segment, , of any length anywhere on the coordinate plane, but not on top of ∆ABC.Choose one of the angles on ∆ABC. From point D, create an angle of the same size as the angle you chose. Then draw a ray from D through the angle. You should now have an angle that is congruent to the angle you chose on ∆ABC.Create a point anywhere outside the mouth, or opening, of the angle you created. The point will initially be named F by the tool, but you should rename it point G. Now draw a ray from E through G such that it intersects the first ray. Your creation should be a closed shape resembling a triangle.Label the point of intersection of the two rays F, and draw ∆DEF by creating a polygon through points D, E, and F.Click on point G, and move it around. By moving point G, you can change and , while keeping fixed.Take a screenshot of your results for one position of G, save it, and insert the image in the space below.Ok, now Part CIn GeoGebra, label the measures of the three angles on ∆DEF. Then move point G around the coordinate plane to produce triangles with different sets of angles. Record at least five sets of angles as you move G.Part DBy moving point G, how many triangles is it possible to draw, keeping the measure of just one angle constant (in this case, m∠FDE)? In how many instances are all three angle measures of ∆DEF equal to those of the original triangle, ∆ABC?part E Part ETo decide whether two triangles are similar, is it enough to know that one pair of corresponding angle measures is equal? Use your observations and your understanding of similarity transformations to explain your answer.