Given the polar curve: r = cos(theta) - sin(theta) Find dy/dx

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 .

given the polar curve r = 2(1+cos theta) find the Cartesian coordinates (x,y) of the point...

given the polar curve r = 2(1+cos theta) find the Cartesian coordinates (x,y) of the point of the curve when theta = pi/2 and find the slope of the tangent line to this polar curve at theta = pi/2

Consider the polar curve r = 2 cos theta. Determine the slope of the tangent line...

Consider the polar curve r = 2 cos theta. Determine the slope of the tangent line at theta = pi/4.

y = (6 +cos(x))^x Use Logarithmic Differentiation to find dy/dx dy/dx = Type sin(x) for sin(x)sin(x)...

y = (6 +cos(x))^x Use Logarithmic Differentiation to find dy/dx dy/dx = Type sin(x) for sin(x)sin(x) , cos(x) for cos(x)cos(x), and so on. Use x^2 to square x, x^3 to cube x, and so on. Use ( sin(x) )^2 to square sin(x). Use ln( ) for the natural logarithm.

Find the area inside of r=1+cos theta, but outside of r=1+sin theta

Find the area inside of r=1+cos theta, but outside of r=1+sin theta

If R(theta)=[(cos, -sin) (sin, cos)] 1) show that R(theta) is a linear transformation from R2->R2 2)Show...

If R(theta)=[(cos, -sin) (sin, cos)] 1) show that R(theta) is a linear transformation from R2->R2 2)Show that R(theta) of R(alpha) = R(theta + alpha) 3) Find R(45degrees) [(x), (y)], interpret it geometrically

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

Evaluate C (y + 6 sin(x)) dx + (z2 + 2 cos(y)) dy + x3 dz...

Evaluate C (y + 6 sin(x)) dx + (z2 + 2 cos(y)) dy + x3 dz where C is the curve r(t) = sin(t), cos(t), sin(2t) , 0 ≤ t ≤ 2π. (Hint: Observe that C lies on the surface z = 2xy.) C F · dr =

Find the length of the polar curve r = e^-theta, o lesser or equal to theta...

Find the length of the polar curve r = e^-theta, o lesser or equal to theta lesser or equal to 3pi. Please write as large and neatly as possible. Thank you.

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.