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use the info. given below to find sin(a-b) cos a= 5/13, with a in quadrant IV cos b= -5/13, with b in quadrant III O TRIGONOMETRIC IDENTITIES AND EQUATIONS Sum and difference identities: Problem type 3 Use the information given below to find sin(a - b). COS 7 5 with a in quadrant IV 13 5 with B in quadrant III 13 cos B 1 Give the exact answer, not a decimal approximation. sin (a - b) = 0 8...
Given cos a = 12 13 with a in quadrant II, and sin B 8 17 with Bin quadrant | Find the exact value of tan (a-). ОА. 3 20 o B. 21 220 3 OC. 20 171 220 O D. Click to select your answer.
You are given that cos(A)=12/13, with A in Quadrant I, and cos(B)=5/13, with B in Quadrant I. Find cos(A−B). Give your answer as a fraction.
you are given that sin(a)=-7/25 with a in quadrant iii and cos(B)=4/5 4 with X in Quadrant III, and cos(B) = with B in Quadrant Find sin(A + B). Give You are given that sin(A) your answer as a fraction 25
If sin(x) = 4/5 and cos(y) = 5/13 with both x and y terminating in quadrant 1 find the exact value of cos(x-y) I know that the denominator will be 65
13. If sin(0) = 4 and 0 terminates in Quadrant III, find cos(0) and tan(). Expand the following expression using the properties of logarithms. Assume all va variables are positive. In(7)
Suppose sin(a) = and cos(B) = 12 where a is in Quadrant I and B is in Quadrant II. a. Find tan(a). Give an exact answer. 13 b. Find tan(B). Give an exact answer. c. Find tan(a - b). Give an exact answer.
use the info given below to find cos(a+b) tan a= 3/4, with a in quadrant III sin b= 15/17, with b in quadrant II = O TRIGONOMETRIC IDENTITIES AND EQUATIONS Sum and difference identities: Problem type 3 Use the information given below to find cos(a+b). 3 tana= with a in quadrant III 4' 15 with B in quadrant II 17 sin B = Give the exact answer, not a decimal approximation. cos (a + B) = 0 금 X 5...
secured#lockdown sqrt(2)}/4 Question 3 3. Given sin(A) = - in Quadrant III and cos(B) = { in Quadrant IV, find sin(A + B). Leave your answer in simplified form. Include reference triangles. on 4 2x) - cos(6x)sin(4x) = 0 on the interval [0, 21)
Evaluate the expression under the given conditions. cos(20); sin(O) = -, o in Quadrant III