Consider the following position function. Find (a) the velocity and the speed of the object and (b) the acceleration of the object r(t) = (3t 6,6t - 5,2 + 3t) for t greater than equal to 0. a. What is the velocity of the object? v(t) = What is the speed of the object? |v(t)| = b. What is the acceleration of the object? a(t) =

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AlonsoDehner AlonsoDehner · Answer 1 · 2020-02-28T08:37:35+01:00

Answer:

Step-by-step explanation:

Given that the position vector of a moving body at time t is

[tex]r(t) = (3t ^6,6t - 5,2 + 3t), t\geq 0[/tex]

Velocity is the derivative of acceleration

v(t) = [tex](18t^5, 6, 3)[/tex], t positive

Speed would be the magnitude of the velocity and will not have direction

Speed = [tex]\sqrt{324t^{10}+36+9 } \\=\sqrt{324t^{10}+45)[/tex]

Acceleration of the object

a(t) = derivative of velocity of vector

= [tex](90t^4, 0,0)[/tex]

i.e. acceleration would be in the direction of x axis alone.