8.3 Kinematics of rotational motion

Introduction to applied math Page 1 / 4

Observe the kinematics of rotational motion.
Derive rotational kinematic equations.
Evaluate problem solving strategies for rotational kinematics.

Just by using our intuition, we can begin to see how rotational quantities like $θ$ , $ω$ , and $α$ are related to one another. For example, if a motorcycle wheel has a large angular acceleration for a fairly long time, it ends up spinning rapidly and rotates through many revolutions. In more technical terms, if the wheel’s angular acceleration $α$ is large for a long period of time $t$ , then the final angular velocity $ω$ and angle of rotation $θ$ are large. The wheel’s rotational motion is exactly analogous to the fact that the motorcycle’s large translational acceleration produces a large final velocity, and the distance traveled will also be large.

Kinematics is the description of motion. The kinematics of rotational motion describes the relationships among rotation angle, angular velocity, angular acceleration, and time. Let us start by finding an equation relating $ω$ , $α$ , and $t$ . To determine this equation, we recall a familiar kinematic equation for translational, or straight-line, motion:

v = v_{0} + at (constant a)

Note that in rotational motion $a = a_{t}$ , and we shall use the symbol $a$ for tangential or linear acceleration from now on. As in linear kinematics, we assume $a$ is constant, which means that angular acceleration $α$ is also a constant, because $a = rα$ . Now, let us substitute $v = rω$ and $a = rα$ into the linear equation above:

rω = {rω}_{0} + rαt .

The radius $r$ cancels in the equation, yielding

ω = ω_{0} + at (constant a),

where $ω_{0}$ is the initial angular velocity. This last equation is a kinematic relationship among $ω$ , $α$ , and $t$ —that is, it describes their relationship without reference to forces or masses that may affect rotation. It is also precisely analogous in form to its translational counterpart.

Making connections

Kinematics for rotational motion is completely analogous to translational kinematics, first presented in One-Dimensional Kinematics . Kinematics is concerned with the description of motion without regard to force or mass. We will find that translational kinematic quantities, such as displacement, velocity, and acceleration have direct analogs in rotational motion.

Starting with the four kinematic equations we developed in One-Dimensional Kinematics , we can derive the following four rotational kinematic equations (presented together with their translational counterparts):

Rotational kinematic equations
Rotational	Translational
$θ = \bar{ω} t$	$x = \bar{v} t$
$ω = ω_{0} + αt$	$v = v_{0} + at$	(constant $α$ , $a$ )
$θ = ω_{0} t + \frac{1}{2} {αt}^{2}$	$x = v_{0} t + \frac{1}{2} {at}^{2}$	(constant $α$ , $a$ )
$ω^{2} = {ω_{0}}^{2} + 2 αθ$	$v^{2} = {v_{0}}^{2} + 2 ax$	(constant $α$ , $a$ )

In these equations, the subscript 0 denotes initial values ( _{$θ_{0}$} , $x_{0}$ , and $t_{0}$ are initial values), and the average angular velocity $\bar{ω}$ and average velocity $\bar{v}$ are defined as follows:

\bar{ω} = \frac{ω_{0} + ω}{2} and \bar{v} = \frac{v_{0} + v}{2} .

The equations given above in [link] can be used to solve any rotational or translational kinematics problem in which $a$ and $α$ are constant.

Problem-solving strategy for rotational kinematics

Examine the situation to determine that rotational kinematics (rotational motion) is involved . Rotation must be involved, but without the need to consider forces or masses that affect the motion.
Identify exactly what needs to be determined in the problem (identify the unknowns) . A sketch of the situation is useful.
Make a list of what is given or can be inferred from the problem as stated (identify the knowns) .
Solve the appropriate equation or equations for the quantity to be determined (the unknown) . It can be useful to think in terms of a translational analog because by now you are familiar with such motion.
Substitute the known values along with their units into the appropriate equation, and obtain numerical solutions complete with units . Be sure to use units of radians for angles.
Check your answer to see if it is reasonable: Does your answer make sense ?

Questions & Answers

how does the planets on our solar system orbit

cheten Reply

how many Messier objects are there in space

satish Reply

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Richard Reply

what are astronomy

Issan Reply

Astronomy (from Ancient Greek ἀστρονομία (astronomía) 'science that studies the laws of the stars') is a natural science that studies celestial objects and phenomena. It uses mathematics, physics, and chemistry in order to explain their origin and evolution.

Rafael

vjuvu

Elgoog

what is big bang theory?

Rosemary

what type of activity astronomer do?

Rosemary

Richard

the big bang theory is a theory which states that all matter was compressed together in one place the matter got so unstable it exploded releasing All its contents in the form of hydrogen

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I want to be an astronomer. That's my dream

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Who named the the whole galaxy?

Shola Reply

solar Univers

GPOWER

what is space

Richard

what is the dark matter

Richard

what are the factors upon which the atmosphere is stratified

Nicholas Reply

is the big bang the sun

Folakemi Reply

Sokak

bigbang is the beginning of the universe

Sokak

but thats just a theory

Sokak

nothing will happen, don't worry brother.

Vansh

what does comet means

GANGAIN Reply

these are Rocky substances between mars and jupiter

GANGAIN

Comets are cosmic snowballs of frozen gases , rock and dust that orbit the sun. They are mostly found between the orbits of Venus and Mercury.

Aarya

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John

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John

r u there

John

hey can anyone guide me abt international astronomy olympiad

sahil

how can we learn right and true ?

Govinda Reply

why the moon is always appear in an elliptical shape

Gatjuol Reply

Because when astroid hit the Earth then a piece of elliptical shape of the earth was separated which is now called moon.

Hemen

what's see level?

lidiya Reply

Did you mean eye sight or sea level

Minal

oh sorry it's sea level

lidiya

according to the theory of astronomers why the moon is always appear in an elliptical orbit?

Gatjuol

hi !!! I am new in astronomy.... I have so many questions in mind .... all of scientists of the word they just give opinion only. but they never think true or false ... i respect all of them... I believes whole universe depending on true ...থিউরি

Govinda

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Jackson

Elyana

we're all stars and galaxies a part of sun. how can science prove thx with respect old ancient times picture or books..or anything with respect to present time .but we r a part of that universe

w astronomy and cosmology!

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another theory of universe except big ban

Albash Reply

how was universe born

Asmit Reply

there many theory to born universe but what is the reality of big bang theory to born universe

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what is the exact value of π?

Nagalakshmi

by big bang

universal

there are many theories regarding this it's on you believe any theory that you think is true ex. eternal inflation theory, oscillation model theory, multiple universe theory the big bang theory etc.

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Michele

from where on earth could u observe all the stars during the during the course of an year

Karuna Reply

I think it couldn't possible on earth

Nagalakshmi

in this time i don't Know

Michele

is that so. the question was in the end of this chapter

Karuna

in theory, you could see them all from the equator (though over the course of a year, not at pne time). stars are measured in "declination", which is how far N or S of the equator (90* to -90*). Polaris is the North star, and is ALMOST 90* (+89*). So it would just barely creep over the horizon.

Christopher

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Source: OpenStax, Introduction to applied math and physics. OpenStax CNX. Oct 04, 2012 Download for free at http://cnx.org/content/col11426/1.3

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