A circle, centered at the origin with a radius of 2 units, lies in the xy...

Evaluate ∫c(1−xy/2)dS where C is the upper half of the circle centered at the origin with...

Evaluate ∫c(1−xy/2)dS where C is the upper half of the circle centered at the origin with radius 1 with the clockwise rotation followed by the line segment from (1,0)to (3,0) which in turn is followed by the lower half of the circle centerd at the origin of radius 3 with clockwise rotation.

Find a vector parametrization of the circle of radius 5 in the xy-plane, centered at (−4,2),...

Find a vector parametrization of the circle of radius 5 in the xy-plane, centered at (−4,2), oriented counterclockwise. The point (1,2) should correspond to t=0. Use t as the parameter in your answer. find r⃗ (t)=

A particle in R^2 travels along a circle centered at (x, y) with radius r >...

A particle in R^2 travels along a circle centered at (x, y) with radius r > 0. Parametrize this circular path r(t) as a function of the parameter variable t. Please prove that at all t values, the tangent vector r'(t) is orthogonal to the vector r(t) - vector(x, y)

A particle moves on a circle of radius 5 cm, centered at the origin, in the...

A particle moves on a circle of radius 5 cm, centered at the origin, in the ??-plane (? and ? measured in cen- timeters). It starts at the point (10,0) and moves counter- clockwise, going once around the circle in 8 seconds. (a) Writeaparameterizationfortheparticle’smotion. (b) What is the particle’s speed? Give units.

The curve C1 is the circle in R 2 of radius 2 centered at the origin,...

The curve C1 is the circle in R 2 of radius 2 centered at the origin, directed counterclockwise; the curve C2 is the hexagon in R 2 with vertices (4, −4), (4, 4), (0, 6), (−4, 4), (−4, −4), (0, −6), directed counterclockwise; and F(x, y) = (y/(x^2 + y^2))i − (x/(x^2+y^2))j. (a) Evaluate R C1 F · dr. (b) Evaluate R C2 F · dr.

A circular loop of radius R1 lies in the x − y plane, centered on the...

A circular loop of radius R1 lies in the x − y plane, centered on the origin, and has a current i running through it clockwise when viewed from the positive z direction. A second loop with radius R2 sits above the first, centered on the positive z axis and parallel to the first. 1. If the second loop is centered at the point z = R1, what must the current be (direction and magnitude) in order for the net...

Problem 2. Let C be the circle of radius 100, centered at the origin and positively...

Problem 2. Let C be the circle of radius 100, centered at the origin and positively oriented. The goal of this problem is to compute Z C 1 z 2 − 3z + 2 dz. (i) Decompose 1 z 2−3z+2 into its partial fractions. (ii) Compute R C1 1 z−1 dz and R C2 1 z−2 dz, where C1 is the circle of radius 1/4, centered at 1 and positively oriented, and C2 is the circle of radius 1/4, centered...

particle in R2 travels along a circle centered at (h,k) with radius a > 0. Parametrize...

particle in R2 travels along a circle centered at (h,k) with radius a > 0. Parametrize this circular path r(t) as a function of the parameter variable t. Please prove that at all t values, the tangent vector r0(t) is orthogonal to the vector r(t)−<h,k>

Let (X,Y) be chosen uniformly from inside the circle of radius one centered at the origin....

Let (X,Y) be chosen uniformly from inside the circle of radius one centered at the origin. Let R denote the distance of the chosen point from the origin. Determine the density of R. From there, determine the density of the random variable R2 = X2 + Y2.

A cylinder of radius R and height 2R is centered at the origin of a coordinate...

A cylinder of radius R and height 2R is centered at the origin of a coordinate system. The axis of the cylinder lies on the z axis. The cylinder has a volume charge density given by p= p0(1-z/R)*(sin ^2(phi)). Compute the quadruple moment. (Please calculate all the components of Qij)