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Mass is an intrinsic property of physical bodies that exist in 3-dimensional space. Mass is the measurement of the amount of matter a physical body possesses and is an underlying fundamental concept that governs several physical behaviors through concepts such as [[Gravitational Force|gravity]], [[Inertia|inertia]], and [[Rest Mass Energy|rest energy]].
Mass is an intrinsic property of physical bodies that exist in 3-dimensional space. Mass is the measurement of the amount of matter a physical body possesses and is an underlying fundamental concept that governs several physical behaviors through concepts such as [[Gravitational Force|gravity]], [[Inertia|inertia]], and [[Rest Mass Energy|rest energy]].


The SI units for mass are kilograms (kg), a base unit in the [[SI Units|International System of Units]]. Additional SI units utilized for mass are the tonne (1000 kg) and the amu (1.660539040×10−27 kg). In everyday life, units of force such as the pound might also be used to indicate mass because the weight of an object near the surface of the earth is directly proportional to its mass.
The SI units for mass are kilograms (kg), a base unit in the [[SI Units|International System of Units]]. Additional SI units utilized for mass are the tonne (1000 kg) and the amu (1.660539040×10−27 kg). In everyday life, units of force such as the pound might also be used to indicate mass because the weight of an object near the surface of the earth is directly proportional to its mass.


==Defining Mass==
==Defining Mass==
There are many properties which depend on mass, and, accordingly, many ways to measure and define mass.<sup>[[#References|1]]</sup><!-- <ref name="Rindler2">{{cite book |author=W. Rindler |date=2006 |title=Relativity: Special, General, And Cosmological |url=https://books.google.com/?id=MuuaG5HXOGEC&pg=PA16 |pages=16–18 |publisher=[[Oxford University Press]] |isbn=0-19-856731-6}}</ref> --> Below are some of these properties and their corresponding definitions. The different definitions of mass should agree with each other numerically for any given object.
There are many properties which depend on mass, and, accordingly, many ways to measure and define mass.<sup>[[#References|1]]</sup><!-- <ref name="Rindler2">{{cite book |author=W. Rindler |date=2006 |title=Relativity: Special, General, And Cosmological |url=https://books.google.com/?id=MuuaG5HXOGEC&pg=PA16 |pages=16–18 |publisher=[[Oxford University Press]] |isbn=0-19-856731-6}}</ref> --> Below are some of these properties and their corresponding definitions. The mass of any given object should be the same regardless of the definition of mass used.


===Inertial Mass===
===Inertial Mass===
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<i>Main page: [[Gravitational Force]]</i>
<i>Main page: [[Gravitational Force]]</i>


The strength of an object's gravitational interactions with other objects depends on its mass. The strength of the gravitational force between two bodies with masses <math>m_1</math> and <math>m_2</math> is given by
The strength of an object's gravitational interactions with other objects depends on its mass. The strength of the gravitational force <math>\mathbf{F}_{grav}</math> between two bodies with masses <math>m_1</math> and <math>m_2</math> is given by


::<math>|\vec{\mathbf{F}}_{grav}|= G \frac{m_1 m_2}{r^2}</math>
::<math>|\mathbf{F}_{grav}|= G \frac{m_1 m_2}{r^2}</math>


where <math>|\vec{\mathbf{F}}_{grav}|</math> is the magnitude of the gravitational force acting on each body, <math>G</math> is the universal gravitational constant (<math>6.6740831 \times 10^{-11} {\rm \ N \ m^{2} \ kg^{-2} }</math>), and <math>r</math> is the distance between the bodies.
where <math>G</math> is the universal gravitational constant (<math>6.6740831 \times 10^{-11} {\rm \ N \ m^{2} \ kg^{-2} }</math>) and <math>r</math> is the distance between the bodies.


The equation above shows that the magnitude of the force is proportional to the mass of each body. The mass of an object can therefore be defined by how strongly its gravitational interactions with other objects are. Mass defined this way is called "gravitational mass."
The equation above shows that the magnitude of the force is proportional to the mass of each body. The mass of an object can therefore be defined by how strongly its gravitational interactions with other objects are. Mass defined this way is called "gravitational mass."
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====Active Gravitational Mass====
====Active Gravitational Mass====
Active gravitational mass is the measure of a body's ability to exert gravitational force on other bodies, which is synonymous with its ability to generate a gravitational field. The gravitational field <math>\mathbf{g}</math> generated by a body of mass <math>m_1</math> is given by


::<math>\mathbf{g}=\frac{\mathbf{F}}{m}=-\frac{{\rm d}^2\mathbf{r}}{{\rm d}t^2}=-Gm\frac{\mathbf{\hat{r}}}{|\mathbf{r}|^2},</math>
Active gravitational mass is the measure of a body's ability to exert gravitational force on other bodies, which is synonymous with its ability to generate a gravitational field. The strength of the gravitational field <math>\mathbf{g}</math> generated by a body of mass <math>m_1</math> at a distance <math>r</math> away is given by


When other bodies of mass are involved, active gravitational mass may be defined as the [[Gravitational Force|gravitational force]] that other bodies experience at corresponding distances.  For surfaces, active gravitational mass may be more formally defined as the measure of a body's [[Gravitational flux|gravitational flux]].  Qualitatively speaking, this just means active gravitational mass determines how strong a body's gravitational field is.  A body's active gravitational mass can be demonstrated by allowing a second, smaller test body to free-fall and then measuring the [[Velocity#Acceleration|acceleration]] that the second body experiences.  In classical mechanics, this can formally be shown as
::<math>|\mathbf{g}|=\frac{Gm_1}{r^2}</math>


:where
where <math>G</math> is the universal gravitational constant (<math>6.6740831 \times 10^{-11} {\rm \ N \ m^{2} \ kg^{-2} }</math>).
::'''g''' is the gravitational acceleration caused by active gravitational mass's resulting gravitational field
 
::'''F''' is the gravitational force on a test body
The strength of a body's gravitational field can be measured either at an arbitrary specific distance or by the flux the field has through a closed surface that encloses the body (which does not depend on the surface's size or shape). Either way, the strength of the body's gravitational field is directly proportional to its mass, so it can be used to measure and define mass. This definition of mass is often used to describe objects that generate significant gravitational fields, such as planets, stars, and galaxies.
::'''m''' is the mass of a test body
::'''r''' is the direction vector from the body being measured to the test body
::'''t''' is time
::'''G''' is the universal gravitational constant (<math>6.6740831 \times 10^{-11} {\rm \ N \ m^{2} \ kg^{-2} }</math>)


====Passive Gravitational Mass====
====Passive Gravitational Mass====
Passive gravitational mass is the measure of how affected an body is by a gravitational field.  When the sole force acting on a physical body is a result of its interaction with a gravitational field, passive gravitational mass of a body can be calculated by the formula
::<math>\mathbf{F} = ma</math>.
:Algebraically solving for '''m''' gives:
::<math>m = \frac{\mathbf{F}}{a}</math>
:where
::* ''F'' is the body's weight in the given
::* ''m'' is the body's passive gravitational mass
::* ''a'' is the free-fall acceleration of the body.


====Combining the Gravitational Masses====
Passive gravitational mass is the measure of the force a body experiences in the presence of another body. In other words, it is a measure of how affected an body is by a gravitational field. The strength of the gravitational force <math>\mathbf{F}</math> experienced by a body with mass <math>m_2</math> in the presence of a gravitational field of magnitude <math>g</math> is given by
The differentiation between active and passive gravitational masses can be bridged by combining the two equations derived above and [[Newton's Third Law of Motion]], which results in the general gravitational force equation
 
::<math>|\vec{\mathbf{F}}_{grav}|= G \frac{m_1 m_2}{r^2}</math>,
::<math>|\mathbf{F}| = m_2g</math>.
:or in vector form
 
::<math>\vec{\mathbf{F}}_{grav}= -G \frac{m_1 m_2}{r^2} \mathbf{\hat{r}}</math>.
Because the force experienced by the object is proportional to its mass, it can be used to measure and define mass. This definition of mass is often used to describe objects that exist in the gravitational fields of other objects but are too small to generate significant gravitational fields of their own. In fact, whenever you weigh an object to determine its mass, you are finding its passive gravitational mass because you are finding the force it experiences as a result of the gravitational field of the earth.


===Rest Energy of Mass===
===Rest Energy of Mass===
'Main article: [[Rest Mass Energy]]''
 
The mass-energy equivalence states that there exists an intrinsic energy quantity equivalent for any quantity of mass, even when the body of mass has no other form of energy (no [[Kinetic Energy|kinetic]], [[Potential Energy|potential]], elastic, chemical, thermal, or otherwise) and vice versa. This was made famous by Albert Einstein's equation
<i>Main page: [[Rest Mass Energy]]</i>
 
The mass-energy equivalence states that there exists an intrinsic energy quantity equivalent for any quantity of mass and vice versa. That is, all objects have some amount of energy just by virtue of being comprised of matter, even if they have no additional energy of any kind (no [[Kinetic Energy|kinetic]], [[Potential Energy|potential]], elastic, chemical, thermal, or other energy). This energy is called rest mass energy. The following famous equation written by [[Albert Einstein]] gives the amount of rest mass energy <math>E_{rest}</math> an object of mass <math>m</math> possesses:
 
::<math>E_{rest} = mc^2</math>
::<math>E_{rest} = mc^2</math>
:where
::<math>E_{rest}</math> is the rest energy of a body of mass
::''m'' is the mass of the body
::''c'' is the speed of light (approximately <math>3.00 \times 10^{8} {\rm \ m/s}</math> in a vacuum)


This phenomenon can be observed in many processes, including nuclear fusion (the Sun) and the gravitational bending of light.
:where <math>c</math> is the speed of light (approximately <math>3.00 \times 10^{8} {\rm \ m/s}</math> in a vacuum).
 
Because the amount of rest mass energy an object possesses is directly proportional to its mass, it can be used to measure and define mass.


===Deformation of Spacetime===
===Deformation of Spacetime===
''See also: [[Einstein's Theory of Special Relativity]]''
[[ Image:SpacetimeCurvature.jpg | thumb | right | 200px | A 3-D visualization of the planet Earth deforming spacetime. Credit to NASA for the image. ]]
The deformation of spacetime is a relativistic phenomenon that is the result of the existence of mass.[[#References|2]]  The manifestation of the deformation of spacetime can be seen with gravitational time dilation.  For example, given two hypothetical, isolated bodies of mass '''Small''' and '''Large''' where the masses <math>M_{Small} << M_{Large}</math>, an observer near '''Small''' will observe the passage of time much slower relative to an observer near '''Large'''.  In popular culture, Christopher Nolan's science fiction film ''Interstellar'' depicted this phenomenon when astronauts Joe Cooper, Amelia Brand, and Dr. Doyle approach the supermassive black hole Gargantua, while scientist Dr. Romilly remains further from the black hole's spacetime deformation.  As a result, in the movie, for every hour the characters Cooper, Brand, and Doyle remain close to the black hole's huge mass and deformation of spacetime, Romilly observes the passage of 23 years of time.


===Atomic Mass===
<i>Main page: [[Einstein's Theory of Special Relativity]]</i>
Atomic mass is the measure of mass for an atom, adding up all of the masses of the protons, neutrons, and electrons in the atom. It is measured in atomic mass units (amu), symbolized by u. 1 amu is equal to the approximate mass of a single neutron or proton, which is 1.660539040×10−27 kg. For example, a carbon-12 atom, comprised of 6 neutrons and 6 protons, has an atomic mass of 12 amu.


====Relative Atomic Mass and Standard Atomic Weight====
The deformation of spacetime is a relativistic phenomenon that is the result of the existence of mass<sup>[[#References|2]]</sup>.
Atomic mass is different from relative atomic mass. Relative atomic mass is the average mass of all isotopes of an element found in a particular sample. It is very useful when dealing with atomic particles not under standard conditions.  


Standard atomic weight is a weighted average of the masses of the isotopes found on Earth. These are the numbers commonly seen on periodic tables, that are used in many calculations.
Gravitational time dilation is one way the deformation of spacetime can be observed. According to the idea of gravitational time dilation, time passes more slowly near massive objects. In popular culture, Christopher Nolan's science fiction film ''Interstellar'' depicted this phenomenon when astronauts Joe Cooper, Amelia Brand, and Dr. Doyle approach the supermassive black hole Gargantua, while scientist Dr. Romilly remains further from the black hole's spacetime deformation.  As a result, in the movie, for every hour the characters Cooper, Brand, and Doyle remain close to the black hole's huge mass and deformation of spacetime, Romilly observes the passage of 23 years of time.
 
Because the effects of spacetime deformation are proportional to the mass of the body causing it, they can be used to measure and define mass.


==Differentiating between Mass and Weight==
==Differentiating between Mass and Weight==
In everyday usage, the terms "mass" and "weight" are often interchanged incorrectly.  For example, one may state that he or she weighs 100 kg, even though a kilogram is a unit of mass, not weight.  Because the majority of humans exist on Earth, where the gravitational field is essentially constant, mass and weight are proportional, so the distinction can be overlooked.  However, inconsistencies occur when the gravitational fields are difference.  For instance, the mass of a person on both Earth and the Moon will be the same, whereas the weight of a person on Earth and the Moon will be different.  This is because weight is actually a measurement of force (typically [[Gravitational Force|gravitational]]) exerted on a body of mass.  The equation <math>\mathbf{F} = ma</math> reappears again to describe weight, where '''F''' is an object's weight, ''m'' is the object's mass, and ''a'' is the body's free-fall [[Velocity#Acceleration|acceleration]].


===Weight===
<i>Main page: [[Weight]]</i>
Weight is a measurement of force. On earth, the following equation is used to determine weight.


<math>W = mg</math>
In everyday usage, the terms "mass" and "weight" are often interchanged incorrectly.  For example, one may state that he or she weighs 80 kg, even though the kilogram is a unit of mass, not weight. However, mass and weight have different definitions: while mass is a measure of the amount of matter within an object, weight is the magnitude of the gravitational force acting on it. Near the surface of the earth, the magnitude of the earth's gravitational field is nearly constant, so the weight of an object is proportional to its mass (meaning every weight corresponds to a specific mass and vice versa). Because we humans and our common everyday objects exist on the surface of the earth, the distinction between mass and weight can be overlooked in everyday life. However, it becomes important to differentiate between the two properties when objects in differing gravitational fields are compared. For example, an object on the surface of the moon would weigh less than an object of the same mass on the surface of the earth.


In this equation, g is the acceleration on earth, approximately 9.8 m/s^2. This equation is used a lot when analyzing projectile motion and forces on earth. However, when dealing with physics problems that happen in space where there is no gravity, the force of weight is not included in calculations.
==Calculating Center of Mass==


==Calculating Center of Mass==
<i>Main page: [[Center of Mass]]</i>


The center of mass is useful when considering the motion of a collection of objects rather than just one.
The center of mass of a system is a point in space that represents the average position of all of the matter in that system. The center of mass of a system is a useful quantity for several reasons, such as for [[Point Particle Systems|modeling systems as point particles]] or for determining the axis of rotation of a free-floating body.
[[File:Center of Mass.png|thumb|Center of Mass formula]]


==Connectedness==
==Atomic Mass==
How is this topic connected to something that you are interested in?
Although mass is not directly related in something I am interested in, I appreciate the importance of the idea of mass. It is an essential component to consider in almost every physics problem or calculation conducted. Understanding it and understanding how it plays a role in different situations can help one understand what exactly is going on in a certain situation better. For example, we can see that mass does not affect acceleration of a falling object.


F=mg
The atomic mass of an atom is its mass, which is the sum of the masses of its constituent protons, nucleons, and electrons. It is typically measured in atomic mass units (amu). 1 amu is defined as 1/12 the weight of a carbon-12 atom, which is 1.660539040×10−27 kg. The mass each proton and neutron (together referred to as "nucleons") is about 1 amu, while the mass of each electron is negligible and therefore considered 0 amu. The atomic mass of an atom depends on which element it is (elements with larger atomic numbers generally have larger atomic masses) and which isotope of that element is (different isotopes have different numbers of neutrons, affecting mass but not chemical properties).


F=ma
===Average Atomic Mass===


mg=ma
The average atomic mass of an element is the average atomic mass of its different isotopes weighted by the relative abundance of those isotopes on earth. These are the atomic mass values that appear on periodic tables. They are often used to convert samples of an element between moles and mass because isotope ratios in a typical sample of most elements reflect their relative abundances on earth. This means that in a natural sample of an element, one can treat every atom as though it has the average atomic mass of that element for the sake of converting between moles and mass.


g=a
==Connectedness==


If you imagine an object with a mass of 2M and an object with a mass of M falling, and imagine the first object as two objects stuck next to each other of mass M, then you can see more clearly how they would fall with the same acceleration.  
In addition to being a value of interest in and of itself, properties such as [[Linear Momentum]], [[Total Angular Momentum|Angular Momentum]], [[The Moments of Inertia|Moments of Inertia]], [[Gravitational Force]], and [[Kinetic Energy]] depend on the masses of objects.


While this idea is not directly connected to my major, understanding a problem down to its most basic components (like the function of mass in a physics problem) is certainly connected to industrial engineering. Doing so is essential to doing something like root cause analysis, where you need to understand how every detail of every component works to be able to diagnose where exactly the cause of some problem lies.  Whether mass is constant, not constant, whether one is looking at mass in components, total mass, or even if one must look at the center of mass, understanding its importance at the theoretical level, not just mathematical or algebraical in an equation, can significantly help solve a problem.
The use of mass in calculations has a wide range of industrial applications including measuring the quantity of a substance, determining the energy necessary to move an object, and calculating the inertia of moving machines such as vehicles to determine adequate braking force.
Mass transfer operations are an especially interesting industrial application of the idea of mass. This is used extensively in companies that rely heavily on chemical engineering. Mass transfer is basically about transporting different masses in different forms as various parts of a process. The goal is to do so in the most efficient way possible, which can mean something from getting rid of as much toxic waste as possible to conserving as much liquid as possible and minimizing evaporation.


==History==
==History==


===Origin of Mass===
A basic understanding of the idea of mass was commonplace well before the common era, as evidenced by the use of scales to measure quantities of substances such as grain. The invention and use of the scale required knowledge that the weight of a sample of a substance is directly proportional to the amount of that substance<sup>[[#References|7]]</sup>. The active gravitational properties of mass were investigated in the 17th century by Galileo Galilei, Robert Hooke, and Isaac Newton, who discovered that the gravitational force between two objects was inversely proportional to the square of the distance between them. Around the same time, Ernst Mach and Newton discovered the direct relationship between mass and inertia. The role of mass in relativity was discovered by Albert Einstein in the early 20th century. In 1964, Peter Higgs and his lab proposed that a particle called the Higgs boson endows particles with mass through a quantum interaction, an idea that was supported by observational results generated by the Large Hadron Collider in 2013<sup>[[#References|8]]</sup>.
A question in many people's minds is "where did mass first come from?" The Higgs Boson is the most accepted explanation as of today. This is a particle that is said to be responsible for giving other particles mass. These particles make up a field that slow other particles down enough to allow them to stick together.
 
===Pre-Newtonian Concepts===
The idea about the "amount" of something and its relationship to weight predates recorded history.  Humans, at some early prehistoric time, recognized the weight of a group of objects and its direct proportionality to the number of objects in the group. The most direct and widely supported evidence of this is the discovery of [https://en.wikipedia.org/wiki/Weighing_scale weighing scales] in early civilization trade. However, there exists no evidence that any of these civilizations recognized the [[#Mass versus Weight|distinction between mass and weight]], since the effects of [https://en.wikipedia.org/wiki/Gravity_of_Earth Earth's gravity] near the surface ensures that the weight and mass of an object are directly proportional.


== See also ==
== See also ==
* [[Kinds of Matter]]
* [[Gravitational Force]]
* [[Gravitational Force]]
* [[Inertia]]
* [[Inertia]]
* [[Rest Mass Energy]]
* [[Rest Mass Energy]]
* [[Einstein's Theory of Special Relativity]]
* [[Sir Isaac Newton]]
* [[Sir Isaac Newton]]
* [[Einstein's Theory of Special Relativity]]
* [[Albert Einstein]]


==References==
==References==
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# "Mass and Weight." Mass, Weight, Density. N.p., n.d. Web. 27 Nov. 2016.
# "Mass and Weight." Mass, Weight, Density. N.p., n.d. Web. 27 Nov. 2016.
# "The Motion of the Center of Mass." 183_notes:center_of_mass [Projects & Practices in Physics]. (2015, September 27). Retrieved April 09, 2017, from http://p3server.pa.msu.edu/coursewiki/doku.php?id=183_notes%3Acenter_of_mass
# "The Motion of the Center of Mass." 183_notes:center_of_mass [Projects & Practices in Physics]. (2015, September 27). Retrieved April 09, 2017, from http://p3server.pa.msu.edu/coursewiki/doku.php?id=183_notes%3Acenter_of_mass
# https://en.wikipedia.org/wiki/Mass#Pre-Newtonian_concepts
# https://en.wikipedia.org/wiki/Higgs_mechanism




[[Category:Properties of Matter]]
[[Category:Properties of Matter]]

Latest revision as of 12:12, 6 August 2019

Mass is an intrinsic property of physical bodies that exist in 3-dimensional space. Mass is the measurement of the amount of matter a physical body possesses and is an underlying fundamental concept that governs several physical behaviors through concepts such as gravity, inertia, and rest energy.

The SI units for mass are kilograms (kg), a base unit in the International System of Units. Additional SI units utilized for mass are the tonne (1000 kg) and the amu (1.660539040×10−27 kg). In everyday life, units of force such as the pound might also be used to indicate mass because the weight of an object near the surface of the earth is directly proportional to its mass.

Defining Mass

There are many properties which depend on mass, and, accordingly, many ways to measure and define mass.1 Below are some of these properties and their corresponding definitions. The mass of any given object should be the same regardless of the definition of mass used.

Inertial Mass

Main page: Inertia

The resistance of an object to changes in its motion (its inertia is directly proportional to its mass; that is, the acceleration an object undergoes as a result of a net force acting on it is inversely proportional to its mass. In other words, more massive objects will undergo smaller accelerations than less massive objects acted on by an equal force. The mass of an object can therefore be defined by how difficult it is to accelerate. Mass defined this way is called "inertial mass."

Gravitational Mass

Main page: Gravitational Force

The strength of an object's gravitational interactions with other objects depends on its mass. The strength of the gravitational force [math]\displaystyle{ \mathbf{F}_{grav} }[/math] between two bodies with masses [math]\displaystyle{ m_1 }[/math] and [math]\displaystyle{ m_2 }[/math] is given by

[math]\displaystyle{ |\mathbf{F}_{grav}|= G \frac{m_1 m_2}{r^2} }[/math]

where [math]\displaystyle{ G }[/math] is the universal gravitational constant ([math]\displaystyle{ 6.6740831 \times 10^{-11} {\rm \ N \ m^{2} \ kg^{-2} } }[/math]) and [math]\displaystyle{ r }[/math] is the distance between the bodies.

The equation above shows that the magnitude of the force is proportional to the mass of each body. The mass of an object can therefore be defined by how strongly its gravitational interactions with other objects are. Mass defined this way is called "gravitational mass."

Gravitational mass can be further divided into "active" and "passive" gravitational mass. Active gravitational mass is mass defined by the ability of an object to exert force on other objects (or generate a gravitational field), while passive gravitational mass is mass defined by the ability of an object to experience force as a result of other objects.

Active Gravitational Mass

Active gravitational mass is the measure of a body's ability to exert gravitational force on other bodies, which is synonymous with its ability to generate a gravitational field. The strength of the gravitational field [math]\displaystyle{ \mathbf{g} }[/math] generated by a body of mass [math]\displaystyle{ m_1 }[/math] at a distance [math]\displaystyle{ r }[/math] away is given by

[math]\displaystyle{ |\mathbf{g}|=\frac{Gm_1}{r^2} }[/math]

where [math]\displaystyle{ G }[/math] is the universal gravitational constant ([math]\displaystyle{ 6.6740831 \times 10^{-11} {\rm \ N \ m^{2} \ kg^{-2} } }[/math]).

The strength of a body's gravitational field can be measured either at an arbitrary specific distance or by the flux the field has through a closed surface that encloses the body (which does not depend on the surface's size or shape). Either way, the strength of the body's gravitational field is directly proportional to its mass, so it can be used to measure and define mass. This definition of mass is often used to describe objects that generate significant gravitational fields, such as planets, stars, and galaxies.

Passive Gravitational Mass

Passive gravitational mass is the measure of the force a body experiences in the presence of another body. In other words, it is a measure of how affected an body is by a gravitational field. The strength of the gravitational force [math]\displaystyle{ \mathbf{F} }[/math] experienced by a body with mass [math]\displaystyle{ m_2 }[/math] in the presence of a gravitational field of magnitude [math]\displaystyle{ g }[/math] is given by

[math]\displaystyle{ |\mathbf{F}| = m_2g }[/math].

Because the force experienced by the object is proportional to its mass, it can be used to measure and define mass. This definition of mass is often used to describe objects that exist in the gravitational fields of other objects but are too small to generate significant gravitational fields of their own. In fact, whenever you weigh an object to determine its mass, you are finding its passive gravitational mass because you are finding the force it experiences as a result of the gravitational field of the earth.

Rest Energy of Mass

Main page: Rest Mass Energy

The mass-energy equivalence states that there exists an intrinsic energy quantity equivalent for any quantity of mass and vice versa. That is, all objects have some amount of energy just by virtue of being comprised of matter, even if they have no additional energy of any kind (no kinetic, potential, elastic, chemical, thermal, or other energy). This energy is called rest mass energy. The following famous equation written by Albert Einstein gives the amount of rest mass energy [math]\displaystyle{ E_{rest} }[/math] an object of mass [math]\displaystyle{ m }[/math] possesses:

[math]\displaystyle{ E_{rest} = mc^2 }[/math]
where [math]\displaystyle{ c }[/math] is the speed of light (approximately [math]\displaystyle{ 3.00 \times 10^{8} {\rm \ m/s} }[/math] in a vacuum).

Because the amount of rest mass energy an object possesses is directly proportional to its mass, it can be used to measure and define mass.

Deformation of Spacetime

Main page: Einstein's Theory of Special Relativity

The deformation of spacetime is a relativistic phenomenon that is the result of the existence of mass2.

Gravitational time dilation is one way the deformation of spacetime can be observed. According to the idea of gravitational time dilation, time passes more slowly near massive objects. In popular culture, Christopher Nolan's science fiction film Interstellar depicted this phenomenon when astronauts Joe Cooper, Amelia Brand, and Dr. Doyle approach the supermassive black hole Gargantua, while scientist Dr. Romilly remains further from the black hole's spacetime deformation. As a result, in the movie, for every hour the characters Cooper, Brand, and Doyle remain close to the black hole's huge mass and deformation of spacetime, Romilly observes the passage of 23 years of time.

Because the effects of spacetime deformation are proportional to the mass of the body causing it, they can be used to measure and define mass.

Differentiating between Mass and Weight

Main page: Weight

In everyday usage, the terms "mass" and "weight" are often interchanged incorrectly. For example, one may state that he or she weighs 80 kg, even though the kilogram is a unit of mass, not weight. However, mass and weight have different definitions: while mass is a measure of the amount of matter within an object, weight is the magnitude of the gravitational force acting on it. Near the surface of the earth, the magnitude of the earth's gravitational field is nearly constant, so the weight of an object is proportional to its mass (meaning every weight corresponds to a specific mass and vice versa). Because we humans and our common everyday objects exist on the surface of the earth, the distinction between mass and weight can be overlooked in everyday life. However, it becomes important to differentiate between the two properties when objects in differing gravitational fields are compared. For example, an object on the surface of the moon would weigh less than an object of the same mass on the surface of the earth.

Calculating Center of Mass

Main page: Center of Mass

The center of mass of a system is a point in space that represents the average position of all of the matter in that system. The center of mass of a system is a useful quantity for several reasons, such as for modeling systems as point particles or for determining the axis of rotation of a free-floating body.

Atomic Mass

The atomic mass of an atom is its mass, which is the sum of the masses of its constituent protons, nucleons, and electrons. It is typically measured in atomic mass units (amu). 1 amu is defined as 1/12 the weight of a carbon-12 atom, which is 1.660539040×10−27 kg. The mass each proton and neutron (together referred to as "nucleons") is about 1 amu, while the mass of each electron is negligible and therefore considered 0 amu. The atomic mass of an atom depends on which element it is (elements with larger atomic numbers generally have larger atomic masses) and which isotope of that element is (different isotopes have different numbers of neutrons, affecting mass but not chemical properties).

Average Atomic Mass

The average atomic mass of an element is the average atomic mass of its different isotopes weighted by the relative abundance of those isotopes on earth. These are the atomic mass values that appear on periodic tables. They are often used to convert samples of an element between moles and mass because isotope ratios in a typical sample of most elements reflect their relative abundances on earth. This means that in a natural sample of an element, one can treat every atom as though it has the average atomic mass of that element for the sake of converting between moles and mass.

Connectedness

In addition to being a value of interest in and of itself, properties such as Linear Momentum, Angular Momentum, Moments of Inertia, Gravitational Force, and Kinetic Energy depend on the masses of objects.

The use of mass in calculations has a wide range of industrial applications including measuring the quantity of a substance, determining the energy necessary to move an object, and calculating the inertia of moving machines such as vehicles to determine adequate braking force.

History

A basic understanding of the idea of mass was commonplace well before the common era, as evidenced by the use of scales to measure quantities of substances such as grain. The invention and use of the scale required knowledge that the weight of a sample of a substance is directly proportional to the amount of that substance7. The active gravitational properties of mass were investigated in the 17th century by Galileo Galilei, Robert Hooke, and Isaac Newton, who discovered that the gravitational force between two objects was inversely proportional to the square of the distance between them. Around the same time, Ernst Mach and Newton discovered the direct relationship between mass and inertia. The role of mass in relativity was discovered by Albert Einstein in the early 20th century. In 1964, Peter Higgs and his lab proposed that a particle called the Higgs boson endows particles with mass through a quantum interaction, an idea that was supported by observational results generated by the Large Hadron Collider in 20138.

See also

References

  1. W. Rindler (2006). Relativity: Special, General, And Cosmological. Oxford University Press. pp. 16–18. ISBN 0-19-856731-6.
  2. A. Einstein, "Relativity : the Special and General Theory by Albert Einstein." Project Gutenberg. <https://www.gutenberg.org/etext/5001.>
  3. Emery, Katrina Y. "Mass vs Weight." NASA. NASA, n.d. Web. 27 Nov. 2016.
  4. Helmenstein, Anne Marie. "3 Ways To Calculate Atomic Mass." About.com Education. N.p., 02 Dec. 2015. Web. 27 Nov. 2016.
  5. "Mass and Weight." Mass, Weight, Density. N.p., n.d. Web. 27 Nov. 2016.
  6. "The Motion of the Center of Mass." 183_notes:center_of_mass [Projects & Practices in Physics]. (2015, September 27). Retrieved April 09, 2017, from http://p3server.pa.msu.edu/coursewiki/doku.php?id=183_notes%3Acenter_of_mass
  7. https://en.wikipedia.org/wiki/Mass#Pre-Newtonian_concepts
  8. https://en.wikipedia.org/wiki/Higgs_mechanism