5.
since cot(x) < 0 in QII, 2θ is in QI
so, we have a 5-12-13 triangle in QI.
8.
we have a 3-4-5 triangle, so sina = 3/5
13.
again, a 5-12-13 in QII, so y>0 and x<0
14.
review sum-to-product formulas:
sin u + sin v = 2 sin(½(u+v)) cos(½(u−v))
21. review product-to-sum formulas:
sin A sin B = ½ cos(A−B) − ½ cos(A+B)
If you get stuck, or want to check your answers come on back.
If stuck, where do you run aground? Remember to draw the triangles where involved, paying attention to quadrants.
5. If cot 2�θ = 5/12 with 0 ≤ 2θ ≤ π , find cosθ, sinθ, and tanθ
8. Find the exact value of sin2a if cosa = 4/5(a in Quadrant I)
13. Find the exact value of tan2� if sinB = 5/13 (B in quadrant II)
14.� Solve sin 2x + sin x = 0 for 0 ≤� x �≤ 2�π.
21. Write 2sin37°sin26° as a sum (or difference).
1 answer
2 answers