9a. Find a set of parametric equations for a circle with a radius of 3 centered...

a) Find the parametric equations for the circle centered at (1,0) of radius 2 generated clockwise...

a) Find the parametric equations for the circle centered at (1,0) of radius 2 generated clockwise starting from (1+21/2 , 21/2). <---( one plus square root 2, square root 2) b) When given x(t) = tcost, y(t) = sint, 0 <_ t. Find dy/dx as a function of t. c) When given the parametric equations x(t) = eatsin2*(pi)*t, y(t) = eatcos2*(pi)*t where a is a real number. Find the arc length as a function of a for 0 <_ t...

Using MatLab 2. Given the parametric equations x = t^3 - 3t, y = t^2-3: (a)...

Using MatLab 2. Given the parametric equations x = t^3 - 3t, y = t^2-3: (a) Find the points where the tangent line is horizontal or vertical (indicate which in a text line) (b) Plot the curve parametrized by these equations to confirm. (c) Note that the curve crosses itself at the origin. Find the equation of both tangent lines. (d) Find the length of the loop in the graph and the area enclosed by the loop. 3. Use what...

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.

find (a) a set of parametric equations and (b) if possible, a set of symmetric equations...

find (a) a set of parametric equations and (b) if possible, a set of symmetric equations of the line passing through the point and parallel to the specified vector or line. (Write the direction numbers as integers.) Point (-2, 0, 3) Parallel to v = 2i + 4j - 2k

Instruction: Determine the region area in the first quadrant of the circle of radius 3 and...

Instruction: Determine the region area in the first quadrant of the circle of radius 3 and center at the origin using: I. A double integral in rectangular coordinates and evaluate, then. II. A double integral in polar coordinates and evaluate. III. Comment on both processes and establish your conclusions.

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.

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...

Find the average value of f(x, y) = 1/x over the circle in R2 of radius...

Find the average value of f(x, y) = 1/x over the circle in R2 of radius 1 centered at (1,0). (Hint: use polar coordinates; remember you already know a formula for the area of a circle).

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)=

1) Show that the formulas below represent the equation of a circle. x = h +...

1) Show that the formulas below represent the equation of a circle. x = h + r cos θ y = k + r sin θ 2) Use the equations in the preceding problem to find a set of parametric equations for a circle whose radius is r = 4 and whose center is (-1,-2). 3)  Plot each of the following points on the polar plane. A(2, π/4), B(1, 3π/2), C(4, π)