1) cosθ=0.8 , θ is in fourth quadrant
θ= cos^(-1)0.8=36.86989765 + 270=306.87
so , sin 2θ= sin2(306.87)= -0.96
answer : a
If cos theta = 0.8 and 270<theta<360, find the exact value of sin 2theta
a) -0.96
b) -0.6
c) 0.96
d) 0.28
Answer: b
2) If csc theta = -5/3, and theta has its terminal side in Quadrant III, find the exact value of tan 2theta
a)24/25
b) 7/25
c) 24/7
d) -7/25
Thanks
5 answers
2) csc Ø = -5/3, then sin Ø = -3/5 and is in III
the cos Ø = -4/5
so tan 2Ø = sin 2Ø/cos 2Ø
= 2sinØcosØ/(cos^2 Ø - sin^2 Ø)
=2(-3/5)(-4/5)/(16/25 - 9/25)
= 24/7
the cos Ø = -4/5
so tan 2Ø = sin 2Ø/cos 2Ø
= 2sinØcosØ/(cos^2 Ø - sin^2 Ø)
=2(-3/5)(-4/5)/(16/25 - 9/25)
= 24/7
1) cscθ = (-5/3) , θ is in third quadrant
1/sinθ = (-5/3) => sinθ= -3/5
θ= -36.8699
θ is in third quadrant
so θ = 36.8669+180 = 216.8669
tan2θ = tan2(216.8669) = 3.42724 = 24/7
answer : c
1/sinθ = (-5/3) => sinθ= -3/5
θ= -36.8699
θ is in third quadrant
so θ = 36.8669+180 = 216.8669
tan2θ = tan2(216.8669) = 3.42724 = 24/7
answer : c
When a trig question asks for "exact" value, a calculator is not to be used, and all work has to be shown with exact values.
24/7 is not equal to 3.42724
24/7 is not equal to 3.42724
thanks for note Reiny .