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P64300 In AABC, LA = 30°, b = 12 cm, and area AABC = 6 cm2. Find the lenght of c. a) b) 2 cm 3 cm c) d) 36 cm 24 cm LO) Which of the following is the graph of y = 3sin (2x) ? " A
1. (12pts) Solve the triangle AABC. a. Given A = 45°,b= V8, and c = 2 b. Given a = 10, A = 30°, and b = 24
33. Name the smallest angle of AABC. The diagram is not to scale 10 A. B. C. D. LA LB LC Two angles are the same size and smaller than the third.
3. Solve AABC, where C = 28.3", b = 5.71 feet, and a = 4.21 feet. Round each answer to the nearest tenth. Bonuoho dostot, Vibe A son bitmes sogni moldogs 4. Find the area of AABC in problem #3 using any formula.
PR DUO DUO TILTO, TUTULU Solve AABC subject to the given conditions if possible. Round the lengths of the sides and measures of the angles (in degrees) to 1 decimal place if necessary. Round intermediate steps to at least four decimal places. a = 26.4, c = 24.8, B = 67.7° Part 1 The triangle with these conditions does exist Part 2 out of 2 NEXT CHECK
#1. Use the law of sines to solve ASA or AAS triangles (Knewton 10.1) In AABC, we are told that b = 13, 2B = 54°, and 20 – 43º. Solve for a and c. B 50 13 a 15.95 and c = 15.42 a 10.60 and 15.42 13 a 10.60 and c 10.96 15.95 and c 10.96
T3 finite element is defined over AABC (in physical coordiinates). The vertices of this triangle have the following coordinates: A(-3, -5), B(2,-1), and C(-6, 4). f(x,y)ds SABC where f(x, y) 2x2-5y2 3xyx-y Solve Problem 3 using 3 point integration rule.
T3 finite element is defined over AABC (in physical coordiinates). The vertices of this triangle have the following coordinates: A(-3, -5), B(2,-1), and C(-6, 4).
f(x,y)ds SABC where f(x, y) 2x2-5y2 3xyx-y
Solve Problem 3 using 3 point integration rule.
SWI. U 7. Consider the right triangle AABC with the right angle 2C = 90° and sides c = 10 cm, a = 8 cm, b = 6 cm. If angle LA is opposite to side a, find sin A,cos A, tan A, cot A, sec A, CSC A.
Please solve this problem completely.
(1) Length of graphs a) Let a path C be given by the graph of y - g(x), a b, with a piecewise C function g : [a,b] → R. Show that the path integral of a continuous function f : R2 → R over the path C is b) Let g: a bR be a piecewise Cl function. The length of the graph of g on (t, g(t)). Show that [a,b] is defined as...
GEOMETRY Exam 9-Continued Student Number Student's Name 17. The vertices of AABC are A(-1, 1), B(0, 3), and C(3,4). Graph the image of AABC after a composition of the following transformations in the order they are listed. B A. Translation: (x. y)(x-3,y- 3) Reflection: in the line y x Is the composition a glide reflection? Yes No Yes Is the image the same if the order of the transformations is switched? (reflection, then glide) No 18. The vertices of AABC...