Consider the polar graph r=1-sin theta and r= sin theta, shown below. Please help with B, D, and E 5. Consider the polar graphs r = 1-sin 0 and r = sin 0, shown below. a. Find the polar coordinates (r, 2) for all points of intersection on the figure. Hint: Not all points can be found algebraically. For b.-d., set up an integral that represents the area of the indicated region. b. The region inside of the circle, but...
what is the integral for the common area between the circles r = √3sin(theta) and r = cos(theta) ?
convert the rectangular coordinate to polar coordinates with r>0 and 0<theta<2pi (9sqrt3,-9) (r, theta)=?
Show how [sin((x+0.5)theta) - sin((x-0.5)theta)] / [2sin(theta/2)] = cos(x theta) Please show all steps clearly. Please do not overlook the theta in two places in the numerator.
convert to rectangular equation r=8sin theta
convert to rectangular form: r=3sin(theta)
def plusThetaeigenket(theta): return np.array([np.cos(theta/2),np.sin(theta/2)]) print("|+theta> = ",plusThetaeigenket,"\n") def minusThetaeigenket(theta): return np.array([-np.sin(theta/2),np.cos(theta/2)]) print("|-theta> = ",minusThetaeigenket,"\n") Can you please help to solve where this python code went wrong for display the correct eigen ket value for theta? Thank you |<+y|-y>l^2 = 0.9999999999999996 ||<+y|-x>l^2 = 0.4999999999999998 -4 print("*Exercise 30.5\n"), -5 #function defination for plus and minus theta eigenkets -6 def plusThetaeigenket(theta): +7 return np.array([np.cos(theta/2), np.sin(theta/2)]), -8 print("[+theta> = ",plusThetaeigenket,"\n"), *Exercise 30.5 -9 +theta> = <function plus Thetaeigenket at Ox00000160BCO9CD08> o def minus Thetaeigenket(theta):...
the robot arm shown below has the following radial and angular positions: theta=6t, r=0.2 + theta/2 meters. the mass at the end of the robot arm is 20 kg, and the arm rotates in the vertical plate. the robot arm is at rest in the horizontal position (theta= 0). the length of the robot arm (L) is 2 meters. the maximum allowable normal force on the rod is 600N. Find the position of the mass at the end of the...
Find cos theta if sec theta is 5 divided by 4
find an equation for the plane tangent to the cone r(r,theta)=(rcostheta)i+(rsintheta)j+rk, r greaterthanorequalto 0, 0 lessthanorequalto theta lessthanorequalto 2pi, at the point P0(-1,sqrt(3),2) corresponding to (r,theta)=(2, 2pi/3). then find a cartesian equation for the surface and sketch the surface and tangent plane together.