Show that an open disk D in the plane ℝ2 is path connected.

Let X be path-connected and let b∈X . Show that every path in X is homotopic...

Let X be path-connected and let b∈X . Show that every path in X is homotopic with endpoints fixed to a path passing through b

A looped wire (Wire C) in the xy-plane is connected to a battery and an open...

A looped wire (Wire C) in the xy-plane is connected to a battery and an open switch. A few centimeters above (in the +z direction) the looped wire is closed loop of wire (Wire D) parallel to wire C. The switch is closed for a few seconds and then opened back up. Sketch the induced current in Wire D. (When looking at Wire D from above, assume that counterclockwise is +current flow.)

Show by counterexample that a connected component of a topological space is not necessarily open.

Show by counterexample that a connected component of a topological space is not necessarily open.

Exercise 1.9.52. Give an example of a path connected space which is not locally path connected

Exercise 1.9.52. Give an example of a path connected space which is not locally path connected

7. Transformations. (1) Find a Mo ̈bius transformation that maps the open half-disk S = {z...

7. Transformations. (1) Find a Mo ̈bius transformation that maps the open half-disk S = {z : |z| < 1, Im z > 0} to a quadrant. (2) Find a 1 − 1 conformal mapping of the quadrant to the upper half-plane. (3) Find a M ̈obius transformation mapping the upper half-plane to the unit disk D = {z : |z| < 1}. (4) Compose these to give a 1 − 1 conformal map of the half-disk to the unit...

Prove that Every disk is connected,

Prove that Every disk is connected,

(3) Let D denote the disk in the xy-plane bounded by the circle with equation y2...

(3) Let D denote the disk in the xy-plane bounded by the circle with equation y2 = x(6−x). Let S be the part of the paraboloid z = x2 +y2 + 1 that lies above the disk D. (a) Set up (do not evaluate) iterated integrals in rectangular coordinates for the following. (i) The surface area of S. (ii) The volume below S and above D. (b) Write both of the integrals of part (a) as iterated integrals in cylindrical...

A dipole p is oriented normal to an infinite plane and at a distance d from...

A dipole p is oriented normal to an infinite plane and at a distance d from it. The plane is connected to ground (that is to say zero potential). Show that the force exerted on the plane by the dipole is: 3p^2/(32(pi)(epsilon_{0})*d^4’

A solid disk of mass 15kg and diameter 60cm is spinning counterclockwise in the plane of...

A solid disk of mass 15kg and diameter 60cm is spinning counterclockwise in the plane of the page. The initial angular velocity of the disk is 24rad/s. If after 20 seconds the angular velocity is found to be 12 rad/s, the average torque exerted on the disk during that time has been a) 0.405 m•N out of the page b) 0.405 m•N into the page c) 0.604 m•N to the right d) 0.810m•N out of the page e) 0.810 m•N...

Find the Möbius transformation that falls on the right half plane of the disk "| ?...

Find the Möbius transformation that falls on the right half plane of the disk "| ? | <1" with the image "? = 0" for the point "? = −?".