if cos theta=- 4/5 and in quadraunt 3,find the exact value of sin2theta

Given sin(theta) = 1/2 and cos(theta) = (sqrt(3))/2 Find the exact values of the four remaining...

Given sin(theta) = 1/2 and cos(theta) = (sqrt(3))/2 Find the exact values of the four remaining Trigonometric functions of theta using identities.

Convert cos(theta)=1/4 to radians Convert cos(theta)=1 to radians Convert cos(theta)=3/2 to radians

Convert cos(theta)=1/4 to radians Convert cos(theta)=1 to radians Convert cos(theta)=3/2 to radians

1. Find the arclength of r=cos^(3)(theta/3) 2. Find the area outside r=3 and inside r^2=18cos(2•theta) 3....

1. Find the arclength of r=cos^(3)(theta/3) 2. Find the area outside r=3 and inside r^2=18cos(2•theta) 3. Find the slope of the tangent line to r=2sin(4•theta) at theta=pi/4

1. Use the given conditions to find the exact value of the expression. sin(α) = -5/3,...

1. Use the given conditions to find the exact value of the expression. sin(α) = -5/3, tan(α) > 0, sin(α - 5π/3) 2. Use the given conditions to find the exact value of the expression. cos α = 24/25, sin α < 0, cos(α + π/6) 3. Use the given conditions to find the exact value of the expression. cot x = √3, cos x < 0, tan(x + π/6) 4. If α and β are acute angles such that...

Consider the polar curve r =1 + 2 cos(theta). Find dy dx at theta = 3...

Consider the polar curve r =1 + 2 cos(theta). Find dy dx at theta = 3 .

Find the exact values of sin 2θ, cos 2θ, and tan 2θ for the given value...

Find the exact values of sin 2θ, cos 2θ, and tan 2θ for the given value of θ. cot θ = 4 3 ;    180° < θ < 270°

Find the area of the region soecified. The region enclosed by the curve r= 5 +cos(theta)

Find the area of the region soecified. The region enclosed by the curve r= 5 +cos(theta)

Find the area of the region that is outside the cardioid r = 1 +cos (theta)...

Find the area of the region that is outside the cardioid r = 1 +cos (theta) and inside the circle r = 3 cos (theta), by integration in polar coordinates.

Solve the given equation 2 cos^2 theta+sin theta =1 cos theta cos 20 + sin theta...

Solve the given equation 2 cos^2 theta+sin theta =1 cos theta cos 20 + sin theta sin 20= 1/2

find the equation of the tangent lines at the point where the curve crosses itself: x=cos^3(theta)...

find the equation of the tangent lines at the point where the curve crosses itself: x=cos^3(theta) y=sin^3(theta) y=t^2