SavedGuidedFind parametric equations describing the circle of radius 6 centered at (2, 3), drawn counterclockwise.Would yox=2+6 cos(t), y=3+6 sin(t), for 0888%2348Y]

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Answered: Find parametric equations describing…

Algebra and Trigonometry (MindTap Course List)

4th Edition

ISBN:9781305071742

Author:James Stewart, Lothar Redlin, Saleem Watson

Publisher:James Stewart, Lothar Redlin, Saleem Watson

Chapter8: Polar Coordinates And Parametric Equations

Section8.CT: Chapter Test

Problem 8CT

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4) Period of y = sin 3x + + + X
identify if true or false
A swimmer on a floating air mattress will follow the rise and fall of the waves in lake. When the person is on the top of the wave her feet are 0.5m above the average surface height of the lake. When she is in a trough her feet dig 0.5m into the water (-0.5m). The peaks of the waves are separated by two seconds. Create an equation of the sinusoidal function that models this movement assuming that she starts at the average surface height of the lake and heads upwards.
csc((\pi )/(2)-\theta ) =
Xp x E/3 2. (ax" +b) xp 2. 1. (cosx-sinx)?
A Ferris wheel is 3 feet off the ground. It has a diameter of 50 feet and rotates every 24 seconds. Four seconds into the ride you would be at the top of the wheel. Assume that y varies sinusoidally with time. a) Find the equation of the Ferris wheel as it rotates y = COS (x - b) What is the height at the top of the Ferris wheel? feet c) At what time will you be at the bottom of the ride? seconds d) What time will you reach the top of the wheel for the second time? seconds 土
costheta+sintheta=1 Find solutions of 0<theta<360degrees
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The trajectory of a projectile launched from the origin at an initial speed of u at an angle of 0 degrees to the horizontal is given by the parametric equations x = v cos(0)t y=- 1 I 9t² where g is acceleration due to gravity, typically 32 feet per second per second or 9.8 meters per second per second. +vsin (0)t Find parametric equations for the trajectory of a golf ball with an initial speed of 80 feet per second at an angle of 60° to the horizontal. Enter either exact value coefficients (in radians!!!) or correct to at least three decimal places. Y 80 cos 60 7 ) 180 t sin (60 180) . How many seconds will the ball be -16² +80 sin 60- the air before it hits the ground? seconds How far will it travel horizontally in total? feet
The following represents the graph of the function: OS(x) = cos x- cos x+- 2 2 X. TU2 3 T/ 2 (points) Based on the graph of this function do the following: a. Use your understanding of how to identify the parameters of the sinusoidal function y = asin(hx +c) + d or y = acos(hx +c)+d_to write the equation of a simpler function p(x) that describes the graph. Explain your choices. b. Check the answer you obtained in (a) by graphing the new function p(x). Obtain a printout of the graph. Explain how you used your graphing calculator to verify that your answer is сопеct. c. Verify algebraically that the two equations are equivalent.
Solve this equation (using radians).
y=cos^-1 (-1/2) "Solve for Y in radians"

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Find parametric equations describing the circle of radius 6 centered at (2, 3), drawn counterclockwise. O x=2+6 cos(t), y= 3+ 6 sin(), for 0StS2. O x=2+6 cos(t), y = 3 +6 sin(t), for 0SIS 2n. O x=3+6 cos(t), y 2+6 sin(1), for 0StS2. x=3+6 cos(1), y 2+6 sin(t), for 0SIS 2n.