The velocity function of a particle moving along a horizontal line is given by yt) = t? – 8t + 15, where t2 0 is in seconds. The particle is units to the left of the origin at the second instant when it changes direction. (a) Determine the time interval(s) on which the particle is both moving to the right and slowing down. (b) Find the position function of the particle.

The velocity function of a particle moving along a horizontal line is given by yt) = t? – 8t + 15, where t2 0 is in seconds. The particle is units to the left of the origin at the second instant when it changes direction. (a) Determine the time interval(s) on which the particle is both moving to the right and slowing down. (b) Find the position function of the particle.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter2: Equations And Inequalities

Section2.7: More On Inequalities

Problem 44E

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Question

Please show a complete solution for each.

The velocity function of a particle moving along a horizontal line is given by vt) = t? – 8t + 15,
where t 2 0 is in seconds. The particle is units to the left of the origin at the second instant
when it changes direction.
(a) Determine the time interval(s) on which the particle is both moving to the right and slowing
down.
(b) Find the position function of the particle.

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