(1 point) Consider a triangle ABC for which ZA 120°, a - 34, b - 18. If such a triangle can not exist, then write NONE in each answer box. If there could be more than one such triangle, then enter dimensions for the one with the smallest value for side c. Finally, if there is a unique triangle ABC, then enter its dimensions. degrees; LC is degrees;
Solve triangle ABC. (Round the length to three decimal places and the angles to one decimal place.) C = 27.0739 ZA = 22.5723 ZB = 37.4276 12 19 120° A B
Solve the triangle ABC, if the triangle exists. B = 35°18' a = 38.3 b = 30.8 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 A and C and side c are as follows. mZA= mZC= The length of side ca (Simplify your answer. Round to the nearest (Round to the nearest tenth as degree as needed....
Question 10.... Solve the triangle ABC, where ZA = 45°, a 7 2, and b 7. 45
Refer to triangle ABC, which is not necessarily a right triangle. Find two triangles for which A = 55°, a = 6.5 ft, and b = 7.9 ft. (Round your answers for the angles B, C, B', and c' to the nearest whole number. Round your answers for the sides c and c' to one decimal place.) First triangle (assume B S 90°): в в o C = ft Second triangle (assume B' > 90°): B' = O C' ft
Find the area of the triangle. Round your answer to one decimal place. C = 103° 15' a = 18, b = 25
The Question: 1 pt 18 of 23 (16 completo) Find the unknown angles in triangle ABC for each triangle that exists. b=9.3 R A-32.7" - 12.1 Select the correct chokoe below andnecessary, fill in the answer boxes to complete your choice. (Round to the nearest tenth as needed.) OA There is only one possible solution for the triangle. The monsurements for the remaining angles are B- OB. There are two possible solutions for the triangle. The measurements for when Bis...
(1 point) a A С Finish solving the triangle: ZA= a = 25 76 ZB= b= 15 ZCE degrees • Enter your answer as a decimal value. • You must be accurate to at least 3 decimal places. • Note that for these problems, we are using degrees to measure angles. Make sure your calculator is set to degrees instead of radians.
4. In triangle ABC we are given the following: a = 16 cm, b = 20 cm, ZC = 70°. (i) Use the law of cosines to calculate the value of c to the nearest hundredth of a unit of length. (ii) Use the law of sines to calculate the measure of ZA to the nearest degree. (iii) Find the measure of ZB. (iv) Determine whether the given data produce one triangle, two triangles, or no triangle at all. (v)...
(1 point) Consider the triangle below (not drawn to scale). с b a A B Let a = 9, b = 9 and 2C = 100". Find the length of side c and measure of the angles, CA and B (in degrees). Give your answer to at least 3 decimal places. C= ZA ZB=