Option 1 is correct.
Sketch the triangle. ZA = 25°, B = 105°, a = 410 105° 410 410 105°...
-P-SPOR, esata 0/50 Submissions used Sketch the triangle. ZA-50°B 78, c-280 Solve the triangle using the Law of Sines. (Round side lengths to the nearest integer.)
<A> solve the triangle with the given parts. (law of sines) 27 A=10.3, C=143.7; c=48.3 Find B, b, a 227 a = 30,4 , b = 28.9, C = 31.6 Find A, B, C (Law of cosines) 30,4=a A = 31.6. ..
I . Given triangle ABC with A = 32° , B = 105°, and b = 25 inches, find the length of side a. Round to the nearest tenth. 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. If you're not sure which, draw the triangle and see whether you have ASAAAS (Law of Sines) or SAS/SSS (Law of Cosines).
Question 9 < > Find a if b = 123 yd, c= 116 yd and Za = 31'. yd; a = Assume Za is opposite side a, ZB is opposite side b, and Zy is opposite side c. Check Answer Question 2 < > 0/1 pt 100 $ 99 Deta 5 If cos(0) and 0 is in quadrant IV, then find exact values for each of these: 7 (a) tan(0)cot(0) -8 not a valid fraction. syntax incomplete. (b) csc(O)tan(0) =...
a= Using the Law of Sines to solve the triangle if ZA = 40°, ZC = 66°, b = 24: ZB is Preview degrees; Preview Preview Round to two decimal places if needed. Assume LA is opposite side a, ZB is opposite side b, and ZC is opposite side c. Points possible: 1 This is attempt 1 of 1 ca 1- Submit MacBook Air 80 F3 ODO OOO FS # $ 2 3 4 % 5 6 & 7 W...
Solve the oblique triangle using the Law of Sines and/or the Law of Cosines. Find all side lengths rounded to the nearest whole and all angles rounded to the nearest whole. C= 29 mZA = 105° mZB 15° Angles Sides A= a= B= b= JIL C= C=
WileyPLUS Question 13 < > с a b Note: Triangle may not be drawn to scale. Suppose b = 55 and c = 73. Find an exact value (report answer as a fraction). You will need to determine the length of the missing side first sin(B) = cos(B) tan(B) sec(B) csc(B) cot(B)
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...
-105 5 10 he graph of a piecewise function. f(x), is depicted above. Find its equation: f(x) = 3 < x <= for x >
Use a double angle formula to find the exact value of cos 117 use Law of Cosine or Law of Sines to find the missing parts of the triangle: a. A = 25°, b = 12, c = 20 b. A = 30°, B = 100°, and c = 25 Find all of the trigonometric functions form the tant = and O< t < 7.