2)Find the slope of the tangent line to the curve r = sin (O) + cos...

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.

Find a unit tangent vector to the curve r = 3 cos 3t i + 3...

Find a unit tangent vector to the curve r = 3 cos 3t i + 3 sin 2t j at t = π/6 .

Find the slope of the tangent line to the curve r = sinO + cosO at...

Find the slope of the tangent line to the curve r = sinO + cosO at O ​​= pi / 4 (O means zeta)

6.) Let ~r(t) =< 3 cos t, -2 sin t > for 0 < t <...

6.) Let ~r(t) =< 3 cos t, -2 sin t > for 0 < t < pi. a) Sketch the curve. Make sure to pay attention to the parameter domain, and indicate the orientation of the curve on your graph. b) Compute vector tangent to the curve for t = pi/4, and sketch this vector on the graph.

Find the equation of the tangent line to the curve r = 2 sin ⁡ θ...

Find the equation of the tangent line to the curve r = 2 sin ⁡ θ + cos ⁡ θ at the point ( x 0 , y 0 ) = ( − 1 , 3 )

Find all theta from (-pi,pi) for which the tangent line of r=tan(theta/2) is horizontal. I have...

Find all theta from (-pi,pi) for which the tangent line of r=tan(theta/2) is horizontal. I have gotten to 1/2sec^2(theta/2)*sin(theta)+tan(theta/2)*cos(theta)=0 How do I solve for 0?

Given r(t) = (et cos(t) )i + (et sin(t) )j + 2k. Find (i) unit tangent...

Given r(t) = (et cos(t) )i + (et sin(t) )j + 2k. Find (i) unit tangent vector T. (ii) principal unit normal vector N.

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

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

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

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