Triangles ABC and DEF are similar triangles. Use this fact to solve the exercise. Round to...
9. [-/1 Points) DETAILS AUFEXC4 7.1R6.005.MI. MY NOT Triangles ABC and DEF are similar. Find the indicated distance. Round to the nearest tenth (Assume a - 13 in., C = 12 in., and d = 16 in.) Find side DE in d B D E
Section 1.2, problem 56 Triangles ABC and DEF are similar. Use properties of similar triangles to find the length of the missing side. a = 12 ft, c = 5 ft, d = 16 ft, f =? C6 ft ft cft 18 ft Section 2.1, problem 42 Find the value of x that makes the given functions equal. csc(6.C – 3), sec(2x + 5) CX= 2 C = 11 89 C2= Section 23. problem 36 In 2001, the tallest building...
NOTE: Please do not copy paste already existing answers. Q) Q) Prove the Converse to the Similar Triangles Theorem (Theorem 5.3.4) Theorem 5.3.4 (Converse to Similar Triangles Theorem). If△ABC and △DEF are two triangles such that AB/ DE = AC/ DF = BC/ EF, then △ABC ~ △DEF. Prove the following Angle-Side-Angle criterion for similarity: If AABC and ADEF are two triangles such that LCA B-LFDE, LABC-LDEF, and DE = r . AB, then AABCADEF with common ratio r Prove...
These two triangles are SIMILAR. Solve for x. x + 2 x = HINT Similar Triangles Triangle RST is similar to triangle EGF. Find the length of the shortest side of A EFG. 430 20.7 10 R_27° 110°/ 11.25 GF = Suppose you are standing such that a 49-foot tree is directly between you and the sun. If you are standing 150 feet away from the tree and the tree casts a 175-foot shadow, how tall could you be and...
Find the area of the triangle. Round your answer to the nearest tenth. Find the area of the triangle. Round your answer to the nearest tenth. Use the Law of Sines to solve, if possible, the missing side or angle for the triangle or triangles in the ambiguous case Round your answer to the nearest tenth (if not possit, enter IMPOSSIBLE) Find angle A when a = 28, b = 6 , B = 22° .16.
Solve the right triangle ABC, where C = 90°. Give angles in degrees and minutes. a = 19.4 cm, c = 46.1 cm bcm (Round to the nearest tenth as needed.) A= D' (Round to the nearest minute as needed.) (Round to the nearest minute as needed.) o 10 B =
3. You are given the triangles ABC with A=240,b=10 cm and c=15 cm. (a) Use the law of cosines to determine the unknown length a. Round off your answer to 1 decimal place. Write down the steps leading to your answer. (b) Determine the measure, in degrees, of angles B and C to the nearest degree. Write down the steps leading to your answers.
Solve the triangle ABC, if the triangle exists. A = 42.5° a = 8.1 m b= 10.5 m Select the correct choice below and fill in the answer boxes within the choice. O A. There are 2 possible solutions for the triangle. The measurements for the solution with the longer side care as follows. mZB= mZC= The length of side c= (Round to the nearest (Round to the nearest (Round to the nearest tenth as tenth as needed.) tenth as...
Solve the triangle ABC, if the triangle exists. A = 44.5° a = 8.6 m b= 10.5 m Select the correct choice below and fill in the answer boxes within the choice. O A. There is only 1 possible solution for the triangle. The measurements for the remaining angles B and C and side c are as follows. mZB= mZC= The length of side c= (Round to the nearest (Round to the nearest (Round to the nearest tenth as tenth...
Solve the triangle ABC, if the triangle exists. A = 44.5° a = 8.9 m b= 11 m Select the correct choice below and fill in the answer boxes within the choice. O A. There is only 1 possible solution for the triangle. The measurements for the remaining angles B and C and side care as follows. mZB= mZC= The length of side c= (Round to the nearest (Round to the nearest (Round to the nearest tenth as tenth as...