The position of an object in circular motion is modeled by the given parametric equations. Describe...

(a) Find parametric equations that describe the circular path of the tip of a 15-inch second...

(a) Find parametric equations that describe the circular path of the tip of a 15-inch second hand of a clock that completes one revolution in 60 seconds. (Assume that (x,y) denotes the position of the object relative to the origin at the center of the circle) (b) Use the arc length formula to compute the distance traveled by the tip of the second hand during the first 24 seconds of its revolution.

Determine the parametric equations of the path of a particle that travels the circle: (x−1)^2+(y−2)^2=100 on...

Determine the parametric equations of the path of a particle that travels the circle: (x−1)^2+(y−2)^2=100 on a time interval of 0≤t≤2π: if the particle makes one full circle starting at the point (11,2)(11,2) traveling counterclockwise if the particle makes one full circle starting at the point (1,12)(1,12) traveling clockwise if the particle makes one half of a circle starting at the point (11,2)(11,2) traveling clockwise

A rock on a string undergoes uniform circular motion at a constant radius and with period...

A rock on a string undergoes uniform circular motion at a constant radius and with period T (i.e., it makes one complete revolution around the circle in time T). As a result, the magnitude of the centripetal acceleration of the object is a c. Suppose now the motion is changed so that the period is T/2 but the radius is the same. What will be the new magnitude of the centripetal acceleration ac/2 2ac 4ac

Calculate the volume of the rotational object formed by rotating the given curve with the parametric...

Calculate the volume of the rotational object formed by rotating the given curve with the parametric equations x = 1-sint, y = 1-cos t about the x-axis between the part between t = 0 and t = π / 2.

let r(t)=<cos(2t),sin(2t),3> describe the shape of the path of motion of the object. how far has...

let r(t)=<cos(2t),sin(2t),3> describe the shape of the path of motion of the object. how far has the object travelled between time T= 0 and time T = 2pi?

An object is moving in the plane according to the parametric equations x(t)=8sin(π t) y(t)=4cos(π t)...

An object is moving in the plane according to the parametric equations x(t)=8sin(π t) y(t)=4cos(π t) for 0 ≤ t ≤ 1 ,where time units are seconds and units on the coordinate axes are feet. The path traveled by the object is a portion of an ellipse in the first quadrant, as pictured. The location of the object at time t will be denoted by P(t)=(x(t),y(t)). A laser beam projects from the object in a direction perpendicular to the tangent...

The Moon orbits the Earth in an approximately circular path. The position of the Moon as...

The Moon orbits the Earth in an approximately circular path. The position of the Moon as a function of time is given by x(t) = r cos(ωt) y(t) = r sin(ωt), where r = 3.84 10^8 m and ω = 2.46 10^-6 radians/s. What is the average velocity of the Moon measured over the interval from t = 0 to t = 3.54 days? Find its magnitude, in m/s, and find its direction, given as an angle measured counterclockwise from...

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...

Consider two particles moving in the xyxy-plane according to parametric equations. At time tt, the position...

Consider two particles moving in the xyxy-plane according to parametric equations. At time tt, the position of particle A is given by x(t) = 2t-3, y(t) = t^2-3t-5x Let kk be some real number. At time tt, the position of particle B is given by x(t) = 4t+3, y(t) = 2t+k^2x Think about the curve traced out by the movement of particle A. Find the equation of the tangent line to the curve at t=4t=4. Give your answer in slope-intercept...

The curve given by the parametric equations of x = 1-sint, y = 1-cos t ,...

The curve given by the parametric equations of x = 1-sint, y = 1-cos t , Calculate the volume of the rotational object formed by rotating the x axis use of the parts between t = 0 and t = π / 2. Please solve this question carefully , clear and step by step.I will give you a feedback and thumb up if it is correct.