Which of the following properties is enough to conclude that two triangles are similar?
Two triangles have corresponding angles that have equal measures. Will a series of similarity transformations exist that will map one triangle to the other?
If all of the corresponding angles in two triangles have equal measures, are the two triangles similar?
Given that bisects , , , and the area of , determine the area of approximated to the nearest two decimal places.
The perimeter of the one of two similar triangles is 31.5 cm, and the side lengths of the other are 9 cm, 2 cm, and 10 cm. Find the length of the longest side of the first triangle rounded to two decimal places.