a designer creates a drawing of a triangular sign on centimeter grid paper for a new business. the drawing has sides measuring 6 cm, 8 cm, and 10 cm, and angles measuring 37°, 53°, and 90°. to create the actual sign shown, the drawing must be dilated using a scale factor of 40. a. find the lengths of the sides of the actual sign. b. find the angle measures of the actual sign. c. the drawing has the hypotenuse on the bottom. the business owner would like it on the top. describe two transformations that will do this. d. the shorter leg of the drawing is currently on the left. the business owner wants it to remain on the left after the hypotenuse goes to the top. which transformation in part c will accomplish this?

Question

Carie · Accepted Answer

The actual length is 6*40=240 cm, 8*40=320 cm, 10*40=400 cm. And the angle measures of the actual sign will not change. The transformation can be turning over using the hypotenuse as axle. Or rotate the triangular sign 180° using the center of the triangle as the center of rotation. The turning over method will accomplish.