2. Repeat the problem about the collision points discussed in recitation but this time describe what happens if the path ofthe second particle is given instead byx₂ = 3 + costY₂ = 1 + sin t0 ≤ t ≤ 2πX Suppose that the position of one particle at time t is given byx₁ = 3 sinty₁ = 2 costAnd the position of a second particle is given by0 ≤t≤ 2π (path 2)Y2a) Graph the paths of both particles (you can use your calculator for this). How many points of intersection are there?b) Are any of these points of intersection collision points? I.e. are the particles ever in the same place at the same time? Iffind the collision pointsSO,x2= -3 + cost: 1 + sin t0 ≤t≤ 2π (path 1)-x

The position of first particle is given by, x1=3sint, y1=2cost, 0≤t≤2π. the position of second…

2. Repeat the problem about the collision points discussed in recitation but this time describe what happens if the path of the second particle is given instead by x₂ = 3 + cost y2 = 1 + sin t 0≤t≤ 2π X

2. Repeat the problem about the collision points discussed in recitation but this time describe what happens if the path of the second particle is given instead by x₂ = 3 + cost y2 = 1 + sin t 0≤t≤ 2π X

Mathematics For Machine Technology

8th Edition

ISBN:9781337798310

Author:Peterson, John.

Publisher:Peterson, John.

Chapter87: An Introduction To G- And M-codes For Cnc Programming

Section: Chapter Questions

Problem 24A

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Question

2. Repeat the problem about the collision points discussed in recitation but this time describe what happens if the path of
the second particle is given instead by
x₂ = 3 + cost
Y₂ = 1 + sin t
0 ≤ t ≤ 2π
X

Suppose that the position of one particle at time t is given by
x₁ = 3 sint
y₁ = 2 cost
And the position of a second particle is given by
0 ≤t≤ 2π (path 2)
Y2
a) Graph the paths of both particles (you can use your calculator for this). How many points of intersection are there?
b) Are any of these points of intersection collision points? I.e. are the particles ever in the same place at the same time? If
find the collision points
SO,
x2
= -3 + cost
: 1 + sin t
0 ≤t≤ 2π (path 1)
-
x

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