Given a triangle with angle A - 39.8 and side length a 38.7 and side length...
Given a triangle with angle A = 93 degrees and sides a = 33 and b = 16. Find side c. c= Using the Law of Sines to solve the triangle if a = 13°,B= 23°, a = 20. Round to two decimal places. As in the text, (a, a), (B, b) and ( c) are angle-side opposite pairs. If no such triangle exists, enter DNE in each answer box. Preview degrees b= Preview Preview Due in 1 hours, 36...
Solve the following triangle using either the Law of Sines or the Law of Cosines. A=9° a=8 b=15 Select the correct choice below and, if necessary, fill in the answer boxes to complete your choice. (Round to two decimal places as needed.) O A. There is only one possible solution for the triangle. The measurements for the remaining angles B and C and side c are as follows BA O B. There are two possible solutions for the triangle The...
8. Solve for the missing length and the other two angles in the triangle below. 15.0 64 A7.4 C Part I: Use the law of cosines to find the missing third side. (2 points) Part ll: Use either the law of cosines or the law of sines to find the measure of angle C. 2 points) Part IlI: Use any method you like to find the measure of angle B. (1 point)
Given a triangle where side a - 82.3, side b - 45.9 and side c = 59.3, find angle A. Assume degrees and round to the tenths place.
Two sides and an angle (SSA) of a triangle are given. Determine whether the given measurements produce one triangle, two triangles, or no triangle at all Solve each triangle that results. a=15, c=18, A=53° Select the correct choice below and, if necessary, to in the answer boxes to complete your choice (Round side lengths to the nearest tenth and angle measurements to the nearest degree as needed.) A. There is only one possible solution for the triangle The measurements for the remaining side b...
Given triangle ABC shown, find the length of side a. Round to the nearest ronth. Hint: This is not a right triangle. You'll need to use the Law of Sines or Law of Cosines to solve for the missing side. 13 53 15 C
Solve the following triangle using either the Law of Sines or the Law of Cosines. A= 15°, a= 10, b=12 Solve the following triangle using either the Law of Sines or the Law of Cosines. A= 15°, a = 10, b = 12 o O B. There are two possible solutions for the triangle The triangle with the smaller angle B has B, 161.91 C, ~ The triangle with the larger angle B has B, - C2- C o OC....
Write a program to compute the area of a triangle using side-angle-side method and reports the area of that triangle (rounded to 2 decimal places). Side-angle-side formula: ???? = 1/ 2 ?? sin(?), where a and b are two sides of the triangle, and C is the included angle. Your program must meet the following criteria to receive full marks: • Randomly generate two values between 5 and 10 (inclusive) for two sides a and b of the triangle, respectively....
10 points Save QUESTION 7 You are given a right triangle with angle A being the 90 degree angle-just like in lecture. If angle C is 42 degrees 9 minutes and side a is 401.73 feet, what is the length of side c? Give your answer to two decimal places. The units are feet- don't list those.
Q6 4 pts) In each of the following, two sides and an angle of a triangle are given. Assume a 'pposite side a, ß is opposite side b, and y is opposite side c. Determine whether the giv nformation results in two triangles, one triangle, or no triangle at all. Clearly show how he Law of Sines to answer the question. You don't need to solve the triangles. a) b= 14,c = 23, B = 82° b) a = 4.5,c=7,a...