SOLUTION: Given that cos θ = - 9/41 and that angle θ terminates in quadrant II, then what is the value of sin θ?

SOLUTION: Given that cos θ = - 9/41  and that angle θ terminates in quadrant II, then what is the value of sin θ?

Algebra.Com

Question 1075381: Given that cos θ = - 9/41 and that angle θ terminates in quadrant II, then what is the value of sin θ?
Answer by Alan3354(69443) (Show Source): You can put this solution on YOUR website!

Sine is + in Q2

RELATED QUESTIONS
θ is an angle in standard position that terminates in Quadrant II. If sinθ = ,... (answered by Edwin McCravy)

Find the values of the trigonometric functions of θ if csc θ = 13/9 and... (answered by Alan3354,ewatrrr)

What is the exact value of cos(2θ) if sinθ=12/13 and θ is in quadrant (answered by Fombitz)

find the value of √sinθ cosθ/secθ cscθ given that tanθ=3/4 (answered by Alan3354)

Find the value of √sinθ cosθ/secθ cscθ given that tanθ=3/4 (answered by Alan3354)

If cos θ = 3/5 and θ terminates in the first quadrant, find the exact value of... (answered by swincher4391,stanbon)

Suppose that sin θ = 5/13 and that θ is a Quadrant II angle. (a) Find the (answered by Alan3354)

Given that sin(θ) = −0.1234, and that θ is an angle in the fourth... (answered by stanbon)

Given cot θ = −3.9 with θ in Quadrant II, ﬁnd the value of sin... (answered by lwsshak3)