course Phy232 ~iױMÞassignment #003
......!!!!!!!!...................................
17:53:44 In your own words explain the meaning of the electric field.
......!!!!!!!!...................................
RESPONSE --> The electric field is the force per unit of charge exerted by a point charge. confidence assessment: 3
.................................................
......!!!!!!!!...................................
17:53:51 STUDENT RESPONSE AND INSTRUCTOR COMMENT: electric field is the concentration of the electrical force ** That's a pretty good way to put it. Very specifically electric field measures the magnitude and direction of the electrical force, per unit of charge, that would be experienced by a charge placed at a given point. **
......!!!!!!!!...................................
RESPONSE --> I could have specified that it is a vector quantity. self critique assessment: 2
.................................................
......!!!!!!!!...................................
17:56:11 Query Principles of Physics and General Physics problem 16.15 charges 6 microC on diagonal corners, -6 microC on other diagonal corners of 1 m square; force on each. What is the magnitude and direction of the force on the positive charge at the lower left-hand corner?
......!!!!!!!!...................................
RESPONSE --> confidence assessment:
.................................................
......!!!!!!!!...................................
17:56:13 ** The charges which lie 1 meter apart are unlike and therefore exert attractive forces; these forces are each .324 Newtons. This is calculated using Coulomb's Law: F = 9 * 10^9 N m^2/C^2 * ( 6 * 10^-6 C) * ( 6 * 10^-6 C) / ( 1 m)^2 = 324 * 10^-3 N = .324 N. Charges across a diagonal are like and separated by `sqrt(2) meters = 1.414 meters, approx, and exert repulsive forces of .162 Newtons. This repulsive force is calculated using Coulomb's Law: F = 9 * 10^9 N m^2/C^2 * ( 6 * 10^-6 C) * ( 6* 10^-6 C) / ( 1.414 m)^2 = 162 * 10^-3 N = .162 N. The charge at the lower left-hand corner therefore experiences a force of .324 Newtons to the right, a force of .324 Newtons straight upward and a force of .162 Newtons at 45 deg down and to the left (at angle 225 deg with respect to the standard positive x axis, which we take as directed toward the right). This latter force has components Fy = .162 N sin(225 deg) = -.115 N, approx, and Fx = .162 N cos(225 deg) = -.115 N. The total force in the x direction is therefore -.115 N + .324 N = .21 N, approx; the total force in the y direction is -.115 N + .324 N = .21 N, approx. Thus the net force has magnitude `sqrt( (.21 N)^2 + (.21 N)^2) = .29 N at an angle of tan^-1( .21 N / .21 N) = tan^-1(1) = 45 deg. The magnitude and direction of the force on the negative charge at the lower right-hand corner is obtained by a similar analysis, which would show that this charge experiences forces of .324 N to the left, .324 N straight up, and .162 N down and to the right. The net force is found by standard vector methods to be about .29 N up and to the left. **
......!!!!!!!!...................................
RESPONSE --> self critique assessment:
.................................................
......!!!!!!!!...................................
18:00:03 query university physics 21.68 (22.52 10th edition) 5 nC at the origin, -2 nC at (4 cm, 0). If 6 nC are placed at (4cm, 3cm), what are the components of the resulting force?
......!!!!!!!!...................................
RESPONSE --> The first thing to do is to convert the distances. 4 cm * 1 m/100 cm = 0.04 m and 3 cm * 1 m/100 cm = 0.03 m. The displacement vector r between q1 and q3 is found by using the displacement between q2 and q3 which is 0.03 m and the displacement between q1 and q2 is 0.04 m. Utilizing the Pythagorean theorem, we find that the displacement is `sqrt((0.03 m)^2 + (0.04 m)^2) = 0.05 m The force F13 is 9 * 10^9 N m^2 / C^2 * 5 * 10^-9 C * 6 * 10^-9 C / (0.05 m)^2 = 1.08 * 10^-4 N The x- and y- components of this force are: F13x = 1.08 * 10^-4 N * 0.04m/0.05m = 8.64 * 10^-5 N F13y = 1.08 * 10^-4 N * 0.03m/0.05m = 6.48 * 10^-5 N The force F23 is 9 * 10^9 Nm^2/C^2 * -2 * 10^-9C * 6 * 10^-9 C / (0.03 m)^2 = -1.2 * 10^4 N The x- and y- components of this force are: F23x = -1.2 * 10^-4 N * 0 m/0.03 m = 0N F23y = -1.2 * 10^-4 N * 0.03 m/0.03 m = -1.2 * 10^-4 N Adding up these components gives us: Fnetx = 8.64 * 10^-5 N + 0 N = 8.64 * 10^-5 N Fnety = 6.48 * 10^-5 N + -1.2 * 10^-4 N = -5.52 * 10^-5 N These combine to be sqrt((8.64 * 10^-5 N)^2 + (-5.52 * 10^-5 N)^2) = 1.03 * 10^-4 N and the direction is arctan (-5.52 * 10^-5 N/8.64 * 10^-5 N) = -32.6 degrees The angle should be in the fourth quadrant, so this is correct, or it could be measured from the positive x-axis as -32.6 degrees + 360 degrees = 327.4 degrees. confidence assessment: 3
.................................................
......!!!!!!!!...................................
18:00:09 ** The 5 nC charge lies at distance sqrt( 4^2 + 3^2) cm from the 6 nC charge, which is 3 cm from the charge at (4 cm ,0). The force exerted on the 6 nC charge by the two respective forces have magnitudes .00011 N and .00012 N respectively. The x and y components of the force exerted by the charge at the origin are in the proportions 4/5 and 3/5 to the total charge, giving respective components .000086 N and .000065 N. The force exerted by the charge at (4 cm, 0) is in the negative y direction. So the y component of the resultant are .000065 N - .00012 N = -.000055 N and its x component is .000086 N. **
......!!!!!!!!...................................
RESPONSE --> self critique assessment: 3
.................................................
......!!!!!!!!...................................
18:23:30 Query univ phy 21.76 (10th edition 22.60) quadrupole (q at (0,a), (0, -a), -2q at origin). For y > a what is the magnitude and direction of the electric field at (0, y)?
......!!!!!!!!...................................
RESPONSE --> I will be referring to the point charge at (0,a) as q1, the point charge at the origin as q2 and the point charge at (0, -a) as q3 and the respective electric fields at those points will follow that numbering convention. q1 = q3 = q, and q2 = -2q The distance between the a and y is y-a, so E1 = k * q / (y - a)^2. The distance between the origin and y is y, so E2 = k * -2q / y^2 The distance between the -a and y is (y - -a) = (y + a) so E3 = k * q / (y + a)^2 Because we are interested at the point y, the forces will all be in directions along the y-axis. Enet = E1 + E2 + E3, so Enet = kq / (y - a)^2 + -2kq / y^2 + kq(y + a)^2 The direction of the electric field at (0,y) is in the direction of the +y axis. This can be demonstrated by inserting values in for y and a. confidence assessment: 3
.................................................
......!!!!!!!!...................................
18:23:44 ** The magnitude of the field due to the charge at a point is k q / r^2. For a point at coordinate y on the y axis, for y > a, we have distances r = y-a, y+a and y. The charges at these distances are respectively q, q and -2q. So the field is k*q/(y - a)^2 + k*q/(y + a)^2 - 2k*q/y^2 = 2*k*q*(y^2 + a^2)/((y + a)^2*(y - a)^2) - 2*k*q/y^2 = 2*k*q* [(y^2 + a^2)* y^2 - (y+a)^2 ( y-a)^2) ] / ( y^2 (y + a)^2*(y - a)^2) = 2*k*q* [y^4 + a^2 y^2 - (y^2 - a^2)^2 ] / ( y^2 (y + a)^2*(y - a)^2) = 2*k*q* [y^4 + a^2 y^2 - y^4 + 2 y^2 a^2 - a^4 ] / ( y^2 (y + a)^2*(y - a)^2) = 2*k*q* [ 3 a^2 y^2 - a^4 ] / ( y^2 (y + a)^2*(y - a)^2) . For large y the denominator is close to y^6 and the a^4 in the numerator is insignifant compared to a^2 y^2 sothe expression becomes 6 k q a^2 / y^4, which is inversely proportional to y^4. **
......!!!!!!!!...................................
RESPONSE --> I had some problem with expanding this. I will study it closely. I read through the example with the dipole as the model and did the expansion of the binomials, but my work seemed much more complicated in comparison. self critique assessment: 2
.................................................
......!!!!!!!!...................................
20:35:32 query univ 22.102 annulus in yz plane inner radius R1 outer R2, charge density `sigma.What is a total electric charge on the annulus?
......!!!!!!!!...................................
RESPONSE --> The area of the annulus is given by: 2 * `pi(R2 ^2- R1^2) The charge per unit area is `sigma and so the total charge is 2 * `pi(R2^2 - R1^2) * `sigma confidence assessment: 3
.................................................
......!!!!!!!!...................................
20:43:12 ** The total charge on the annulus is the product Q = sigma * A = sigma * (pi R2^2 - pi R1^2). To find the field at distance x along the x axis, due to the charge in the annulus, we first find the field due to a thin ring of charge: The charge in a thin ring of radius r and ring thickness `dr is the product `dQ = 2 pi r `dr * sigma of ring area and area density. From any small segment of this ring the electric field at a point of the x axis would be directed at angle arctan( r / x ) with respect to the x axis. By either formal trigonometry or similar triangles we see that the component parallel to the x axis will be in the proportion x / sqrt(x^2 + r^2) to the magnitude of the field from this small segment. By symmetry only the xcomponent of the field will remain when we sum over the entire ring. So the field due to the ring will be in the same proportion to the expression k `dQ / (x^2 + r^2). Thus the field due to this thin ring will be magnitude of field due to thin ring: k `dQ / (x^2 + r^2) * x / sqrt (x^2 + r^2) = 2 pi k r `dr * x / (x^2 + r^2)^(3/2). Summing over all such thin rings, which run from r = R1 to r = R2, we obtain the integral magnitude of field = integral ( 2 pi k r x /(x^2 + r^2)^(3/2) with respect to r, from R1 to R2). Evaluating the integral we find that magnitude of field = 2* pi k *x* | 1 /sqrt(x^2 + r1^2) - 1 / sqrt(x^2 + r2^2) | The direction of the field is along the x axis. If the point is close to the origin then x is close to 0 and x / sqrt(x^2 + r^2) is approximately equal to x / r, for any r much larger than x. This is because the derivative of x / sqrt(x^2 + r^2) with respect to x is r^2 / (x^2+r^2)^(3/2), which for x = 0 is just 1/r, having no x dependence. So at small displacement `dx from the origin the field strength will just be some constant multiple of `dx. **
......!!!!!!!!...................................
RESPONSE --> I initially had this typed up and did not submit it because I knew it was incomplete because I was having a bit of trouble with the integral calculation. The distance between the point charge on the annulus and the point on the x-axis is going to be r^2 = (y^2 + x^2) `dE = k * `dQ / (y^2 + x^2) `dQ = 2 * `pi * y * `dy, (This was used because we will be integrating from R1 to R2.) So `dE = k * 2 * `pi * y * `dy / (y^2 + x^2) `dEx = dE * cos `theta = [k * 2 * `pi * y * `dy / (y^2 + x^2)] * x/`sqrt(x^2 + y^2)] `dEx = k * 2 * `pi * y * `dy * x / (x^2 + y^2)^(3/2) This needs to be integrated from R1 to R2. I assumed that this would need to be calculated using the substitution method, but could not get it to work properly. self critique assessment: 2
.................................................