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DO STUFF BELOW THIS LINE PLEASE

(Just for the latex syntax)[edit]

${\vec {E}}={\begin{cases}{\frac {\mu _{0}Ni_{0}\omega \sin(\omega t)r}{2l}}{\hat {\tau }},&r<R\\{\frac {\mu _{0}Ni_{0}\omega R^{2}\sin(\omega t)}{2rl}}{\hat {\tau }},&r>R\end{cases}}$ where r is radial distance of pont in polar coordinates, ${\hat {\tau }}$ is unit tangential vector, R is radius of solenoid
${\vec {E}}=\pm {\begin{cases}{\frac {\mu _{0}Ni_{0}\omega \sin(\omega t)}{2l}}(x{\hat {j}}-y{\hat {i}}),&{\sqrt {x^{2}+y^{2}}}<R\\{\frac {\mu _{0}Ni_{0}\omega R^{2}\sin(\omega t)}{2l(x^{2}+y^{2})}}(x{\hat {j}}-y{\hat {i}}),&{\sqrt {x^{2}+y^{2}}}>R\end{cases}}$
$F_{0}{\hat {k}}$

Rewrite of Reduced Mass[edit]

Reduced mass is the "effective" inertial mass appearing in the two-body problem of Newtonian mechanics. This is a quantity with the unit of mass, which allows the two-body problem to be solved as if it were a one-body problem. Note however that the mass determining the gravitational force is not reduced. In the computation one mass can be replaced by the reduced mass, if this is compensated by replacing the other mass by the sum of both mass.

m_{\text{red}}=\mu ={\cfrac {1}{{\cfrac {1}{m_{1}}}+{\cfrac {1}{m_{2}}}}}={\cfrac {m_{1}m_{2}}{m_{1}+m_{2}}},\!\,

Uses[edit]

Given two bodies, one with mass $m_{1}\!\,$ and the other with mass $m_{2}\!\,$ , they will orbit the barycenter of the two bodies. The equivalent one-body problem, with the position of one body with respect to the other as the unknown, is that of a single body of mass $\mu$ where the force on this mass is given by the gravitational force between the two bodies. The reduced mass is always less than or equal to the mass of each body and is half of the harmonic mean of the two masses.

Derivation

This can be proven easily. Use Newton's second law, the force exerted by body 2 on body 1 is

F_{12}=m_{1}a_{1}.\!\,

The force exerted by body 1 on body 2 is

F_{21}=m_{2}a_{2}.\!\,

According to Newton's third law, for every action there is an equal and opposite reaction:

F_{12}=-F_{21}.\!\,

Therefore,

m_{1}a_{1}=-m_{2}a_{2}.\!\,

and

a_{2}=-{m_{1} \over m_{2}}a_{1}.\!\,

The relative acceleration between the two bodies is given by

a=a_{1}-a_{2}=\left({1+{m_{1} \over m_{2}}}\right)a_{1}={{m_{2}+m_{1}} \over {m_{1}m_{2}}}m_{1}a_{1}={F_{12} \over m_{\text{red}}}.

So we conclude that body 1 moves with respect to the position of body 2 as a body of mass equal to the reduced mass.

Alternatively, a Lagrangian description of the two-body problem gives a Lagrangian of

L={1 \over 2}m_{1}\mathbf {\dot {r}} _{1}^{2}+{1 \over 2}m_{2}\mathbf {\dot {r}} _{2}^{2}-V(\vert \mathbf {r} _{1}-\mathbf {r} _{2}\vert )\!\,

where $m_{i},\mathbf {r} _{i}$ are the mass and position vector of the $i$ ^th particle, respectively. The potential energy $V$ takes this functional dependence as it is only dependent on the absolute distance between the particles. If we define $\mathbf {r} \equiv \mathbf {r} _{1}-\mathbf {r} _{2}$ and let the centre of mass coincide with our origin in this reference frame, i.e. $m_{1}\mathbf {r} _{1}+m_{2}\mathbf {r} _{2}=0$ , then

\mathbf {r} _{1}={\frac {m_{2}\mathbf {r} }{m_{1}+m_{2}}},\mathbf {r} _{2}={\frac {-m_{1}\mathbf {r} }{m_{1}+m_{2}}}.

Then substituting above gives a new Lagrangian

L={1 \over 2}m_{\text{red}}\mathbf {\dot {r}} ^{2}-V(r),

where $m_{\text{red}}={\frac {m_{1}m_{2}}{m_{1}+m_{2}}}$ , the reduced mass. Thus we have reduced the two-body problem to that of one body.

The reduced mass is frequently denoted by the Greek letter $\mu \!\,$ ; note however that the standard gravitational parameter is also denoted by $\mu \!\,$ .

In the case of the gravitational potential energy $V(\vert \mathbf {r} _{1}-\mathbf {r} _{2}\vert )=-Gm_{1}m_{2}/\vert \mathbf {r} _{1}-\mathbf {r} _{2}\vert \!\,$ we find that the position of the first body with respect to the second is governed by the same differential equation as the position of a body with the reduced mass orbiting a body with a mass equal to the sum of the two masses, because

m_{1}m_{2}=(m_{1}+m_{2})m_{\text{red}}\!\,

"Reduced mass" may also refer more generally to an algebraic term of the form

x_{\text{red}}={1 \over {1 \over x_{1}}+{1 \over x_{2}}}={x_{1}x_{2} \over x_{1}+x_{2}}\!\,

that simplifies an equation of the form

\ {1 \over x_{\text{eq}}}=\sum _{i=1}^{n}{1 \over x_{i}}={1 \over x_{1}}+{1 \over x_{2}}+\cdots +{1 \over x_{n}}.\!\,

In such a two body problem, the moment of inertia of the system about the center of mass is given by:
$I=\mu r^{2}$
Where r is the distance between the two bodies.

Derivation

Let r₁ and r₂ be the distances of the two bodies from the center of mass.
Taking the center of mass as the origin, the equation for center of mass becomes:

r_{cm}=0={\frac {m_{1}r_{1}-m_{2}r_{2}}{m_{1}+r_{1}}}

From this, we get:

m_{1}r_{1}=m_{2}r_{2}

Now, moment of inertia about center of mass is:

I=m_{1}r_{1}^{2}+m_{2}r_{2}^{2}

As $m_{1}r_{1}=m_{2}r_{2}$ ,

I=m_{1}r_{1}^{2}+m_{1}r_{1}r_{2}=m_{1}r_{1}(r_{1}+r_{2})=m_{1}r_{1}r

But, as

r_{2}={\frac {m_{1}r_{1}}{m_{2}}}

, and

r=r_{1}+r_{2}

,

r=r_{1}\left(1+{\frac {m_{1}}{m_{2}}}\right)={\frac {r_{1}(m_{1}+m_{2})}{m_{2}}}

Or,

r_{1}={\frac {rm_{2}}{m_{1}+m_{2}}}

Substituting in the expression for I, we get:

I=m_{1}r_{1}r={\frac {m_{1}m_{2}r^{2}}{m_{1}+m_{2}}}=\mu r^{2}

The reduced mass is typically used as a relationship between two system elements in parallel, such as resistors; whether these be in the electrical, thermal, hydraulic, or mechanical domains. This relationship is determined by the physical properties of the elements as well as the continuity equation linking them.

Other uses[edit]

Reduced mass crops up in a multitude of two-body problems. In a collision with a coefficient of restitution e, the change in kinetic energy can be written as $\Delta K={\frac {1}{2}}\mu v_{rel}^{2}(e^{2}-1)$ , where v_rel is the relative velocity of the bnodies before colission.

External links[edit]

Reduced Mass on HyperPhysics

Todo[edit]

Restructure
Derive moment of inertia of two bodies = mu*r^2, where r is dist betwn two bodies
Add more "other uses"
It does not only pertain to two body problem, it crops up in all two-body interactions.
Images
Explain spring connection with halfmuvsquared formula.

Maxwell (Not to be published, just using WP's LaTeX)[edit]

Starting conditions: ${\vec {B}}=\beta t{\hat {k}},{\vec {J}}=0,\rho =0$

${\text{Maxwell's laws:}}{\begin{cases}\nabla \cdot {\vec {E}}=\rho /\epsilon _{0}&\dots (M_{1})\\\nabla \cdot {\vec {B}}=0&\dots (M_{2})\\\nabla \times {\vec {E}}=-\partial _{t}{\vec {B}}&\dots (M_{3})\\\nabla \times {\vec {B}}=\mu _{0}{\vec {J}}+\mu _{0}\epsilon _{0}\partial _{t}{\vec {E}}&\dots (M_{4})\end{cases}}$
Verifying our choice of B with $M_{2}$ ,
$LHS=\nabla \times {\vec {B}}=\nabla \times (\beta t{\hat {k}})=0=RHS$
Now, using $M_{4}$
$LHS=0,{\vec {J}}=0,$
$\Rightarrow 0=\mu _{0}0+\mu _{0}\epsilon _{0}\partial _{t}{\vec {E}}$
$\Rightarrow \partial _{t}E=0$
Therefore, E is independant of time.

Now, by $M_{3},\nabla \times {\vec {E}}=-\partial _{t}{\vec {B}}=-\partial _{t}(\beta t{\hat {k}})=-\beta {\hat {k}}$
Let ${\vec {E}}=E_{x}{\hat {i}}+E_{y}{\hat {j}}+E_{z}{\hat {k}}$
$\therefore {\begin{pmatrix}{\hat {i}}(\partial _{y}E_{z}-\partial _{z}E_{y})\\+{\hat {j}}(\partial _{x}E_{z}-\partial _{z}E_{x})\\+{\hat {k}}(\partial _{x}E_{y}-\partial _{y}E_{x})\end{pmatrix}}={\begin{pmatrix}{\hat {i}}(0)\\+{\hat {j}}(0)\\+{\hat {k}}(-\beta )\end{pmatrix}}\qquad \dots (1)$

Now, by symmetry of the original conditions, we can assume that:
$|E_{x}|=|E_{y}|$ at a point (x,y,z)
And also, $|\partial _{x}E_{y}|=|\partial _{y}E_{x}|$
$=\beta /2$ , by z-component of (1)

$\therefore E_{x}={\frac {\beta y}{2}}+f_{1}(x,z)+c_{1},$
$E_{x}={\frac {\beta x}{2}}+f_{2}(y,z)+c_{2}$
${\text{let }}E_{x}=f_{3}(x,y,z)+c_{3}$

By x and y components of (1),
$\partial _{y}f_{3}=\partial _{z}f_{2},\partial _{x}f_{3}=\partial _{z}f_{1}$
For simplicity, we can assume:

$f_{1}=ix+az$
$f_{2}=my+bz$
${\text{let }}f_{3}=ax+by+nz$
(Where l,m,n,a,b are constants)

$\therefore {\vec {E}}={\hat {i}}({\frac {\beta y}{2}}+lx+az+c_{1})$
$+{\hat {j}}({\frac {-\beta x}{2}}+my+bz+c_{2}$
$+{\hat {k}}(ax+by+nz+c_{3})$

Applying $(M_{1})$ to ${\vec {E}}$ ,
$l+m+n=0$

$\therefore {\text{when }}{\vec {B}}=\beta t{\hat {k}},{\vec {J}}=0,\rho =0,$
${\vec {E}}={\hat {i}}({\frac {\beta y}{2}}+lx+az+c_{1})$
$+{\hat {j}}({\frac {-\beta x}{2}}+my+bz+c_{2}$
$+{\hat {k}}(ax+by+nz+c_{3})$
This answer can be verified with the four Maxwell's Laws.