1/m^2  == sqrt(0.03*Z^2)*integrate(c,c);
m^2  ==  1/(sqrt(0.03)*Z*integrate(c,c));
Z  ==  sqrt((100*m)/(3*e));
c * integrate(c,c)  ==  1/m^2;
c  ==  sqrt(0.03 * Z^2);
c * 4   ==  v * Z;
c  ==  sqrt(0.6);
10^2 *m  ==  3 * Z^2*e*integrate(Z,Z);
m  ==  ((3*e*Z^2)/100)*integrate(Z,Z);
e^2  ==  1000/(9*sqrt(0.6*c)*Z *4);
c ==  (v*Z)/4 ;
c  ==  sqrt(0.03 *Z^2);
m  ==  e * c^2 * integrate(Z,Z); 
c  ==  (c/t * integrate(c,c) * Z)/4;
c  ==  m /(c^2 * integrate (Z,Z));
Z  ==  (t * 8)/c^2;
Z  ==  sqrt ((10^2*c^2)/3);
m  == ( (3 * e * Z^2 * integrate (Z,Z))/10^2);
c * integrate(c,c)  ==  1 / m*^2;
e  == ( (m * 10^2 )/(3 * Z^2));
c  ==  (s/t * integrate(c,c) * Z ) /4;
Z  ==  sqrt((10^2 * c^2)/3);
m  ==  (3 * e * Z^2) / 10^2;
t  ==  (s/v )* integrate(c,c);
v ==  (s/t) * integrate (c,c);
s^2  ==  Z/m^2;
m ==  e * c^2 * integrate(Z,Z);
10^2 * m  ==  3 * Z^2 * e ;
g  ==  Z /(s^2 * m);
Z  ==  sqrt ((10^2 * m )/(3 * e ));
(integrate (Z,Z))^2  ==  integrate(c,c) *^2 ;
integrate (c,c)  ==  1/m^2;
c  ==  sqrt (0.3 * (Z2 /integrate (Z,Z)));
s  ==  0.1394277;
p  ==  230.04716;
g  ==  202.46722;
gm  ==  206.93936;
cm  ==  5.2467348;
pi  ==  4.7532652;
zet  ==  217.71395;
integrate (c, c)  ==  0.9999975;
integrate ( gm , gm)   ==  0.9954609;
c  ==  0.7745987;
Z  ==  4.4721361;
 t  ==  0.2012461;
 v  ==  0.692820323;
 e  ==  1.8936987;
 m  ==  1.1362193;
inf  ==  43.929053;
b  ==  48.682318;
Zpo  ==  0.5976552;
gpo  ==  7.4828027;
cpo  ==  10;
gme  ==  -2.2360679;
integrate (Z, Z)  ==  0.99999482;
ep  ==  41013.575;
integrate(tp , tp)  ==  0.9960579;
ev  ==  465596.11;
betta  ==  -212.96068;
gfoe  ==  -43.929053;
gfon  ==  -208.20741;
gfel  ==  48.682318;
ele  ==  4.753265;
eln  ==  92.611371;
ecuoue   ==  87.858106;
eo  ==  4.0000204;
du  ==  3976.8745;
pimasb  ==  0.5071754;
zeb  ==  227.22049;
gb  ==  4.5387228;
epb  ==  41.200008;
mb  ==  40.600216;
eb  ==  24.360113;
ZU  ==  51699.094;
Zepiz   ==  196.4567;
maxZUm  ==  13.900264;
X  ==  286.10213;
CR  ==  20.606600;
integrate (v , v )  ==  0.9994854;
integrate (v ,v ) * integrate (t , t )   ==  0.9955453;
integrate (inf , inf )  ==  0.9993811;
integrate (x , x )  ==  0.9995981;
integrate(pi , pi)  ==  0.9912973;
integrate (CR , CR )  ==  0.9996799;
integrate (m , m)  ==   0.9997584;
integrate (e , e )  ==  0.9997584;
 m *  integrate ( c , c )   ==  1.1362136;
integrate (gm , gm )  ==  -0.9617854;
integrate (gp , gp )  ==  0.9956055;
integrate (g , g )  ==  0.99999961;
integrate (t , t )  ==  0.9937818;
integrate (Zpo, Zpo)  ==  1.0393766;
integrate (v , v )  ==  0.9999685;
integrate (CR , CR)  ==  0.99758421;
integrate (cm , cm )  ==  0.999995263604032;
integrate (s , s )  ==  0.999999200175736;
Pimm  ==   (710/226);
integrate ( x , v  ) ==  0.999791382656555;
integrate (s , v )  ==  0.999999311496187;
integrate ( t , v )  ==  0.999262619952408;
integrate (t , Z ) * integrate ( t, c )  ==  0.997660742097646;
integrate (PIU , PIU)  ==  0.99693231092912;
PIU  ==  9.26490532397694;
integrate ( cm , cm )  ==  0.959628374139092; 
integrate (Pimm , Pimm)  ==  1.06725268368853;
integrate ( pi ,  pi)  ==  0.99910747418711;
integrate (pimasb , pimasb)  ==  1.01376770087192;
integrate (CR , pi )  ==   0.997564233356481;
integrate ( PIU , t )  ==   0.997906622526492;
integrate (gb , gb )  ==  0.99453946855116;
integrate ( mb , mb )  ==  1.00797769498004;
integrate ( epb , epb )  ==  1.00258934419242;
integrate ( t , PIU )  ==  0.999500180626767;
integrate ( gm , PIU )  ==  -0.997408054658288;
integrate ( inf , PIU )   ==  0.995880423020448;
integrate ( eo , eo )  ==  1.0029555100966;
integrate ( t , PIU ) * integrate ( g , t )  ==  0.993904016188195;
e  == ( (m * 10^2 )/(3 * Z^2 * integrate(Z,Z)));
e  ==  m /(c^2 * integrate(Z,Z));
Z  ==  sqrt ((10^2 * m )/(3 * e * integrate (Z , Z )));
Z  ==  sqrt ((c^2 * 10^2)/3);
s  ==  (v * t )/ integrate (Z, Z )
g^2  ==  ep - Z^2 - c^2 ;
Z  ==  m * g * s^2 ;
g  ==  ( ( m * Z) / s^2 ) * integrate ( c , c );
p  ==  Z / s^2;
c * integrate ( c , c )  ==  ( s^2 * g ) / (  m * Z );
t  ==  ( (s * integrate( s , s ) ) / v ) * integrate( c , c );
g  ==  Z / ( m * s^2 );
g  ==  (( m * Z) / s^2 ) * integrate( c , c );
integrate (c , c )  ==  ( g * s^2 ) / ( m * Z );
g  ==  Z / ( s^2 * m );
s  ==  sqrt ( Z / p );
t  ==  ( s * integrate( c , c ))/( 4 * sqrt ( 0.03 / integrate (Z, Z )) );
e  ==  m / ( c^2 * integrate( Z , Z ) );
s  ==  sqrt( Z / ( g * m ) );
Z  ==  p * s^2 ;
Z  ==  m * g * s^2 ;
Z + c + pi  ==  10;
gm  ==  10 * ( c^2 + Z^2 );
c^2 + Z^2  ==  ( gm / 10 ) * integrate( gm , gm );
zet  ==  g + cm + cm + pi;
pi * c  ==  gm * cm;
zet  ==  c + cm + g + gm;
t  ==  ( s * m * 10^2 ) / ( v * 3 * Z^2 * e );
m  ==  e * ( ( v * Z)/ 4 )^2 * integrate( Z, Z );
gm  ==  (10 * ( c^2 + Z^2)) / integrate( gm , gm );
integrate(gm , gm)  ==  ( 10 * ( c^2 + Z^2 )) / gm;
c  ==  ( ( (s * integrate( s , s )) / t ) * integrate( c , c ) * Z ) / 4 ;
1/m^2  ==  c * integrate( c , c );
Z + c + pi  ==  10;
cm  ==  - g * Z;
-g  ==  ( Z + c + pi ) / Z ;
-g  ==  10 / Z;
c^2 + cm^2  ==  100.6;
pi + gme + gm  ==  cm;
b  ==  zet / Z;
betta  ==  zet / Z;
gm * Zpo  ==  Z;
zet  ==  (pi + inf) * Z;
inf   ==  b - pi;
g + Z  ==  gm;
(integrate( Z , Z ))^2  ==  integrate( c , c ) * ^2 ;
Z^3 / 3  ==  c^2;
v^2  ==  ( ep / inf^3 ) * (integrate(t , t))^2;
Z^2 + g^2 + c^2   ==  ( v^2 * inf^3 ) / ( integrate( t, t ))^2;
1  ==  ( 10^2 * m ) / (3 * Z^2 * e * integrate( Z, Z ));
1  ==  m / ( e * c^2 * integrate( Z , Z ));
1/c^2  ==  10^2 / ( 3 * Z^2);
integrate( t , t )  ==  sqrt ( ( v^2 * inf^3 ) / ep );
integrate( t , t )  ==  sqrt ( (v^2 * inf^3 ) / ( Z^2 + g^2 + c^2 ) );
Z^2  ==  ^2 * cm;
ep  ==  (( g^2 + Z^2 ) / integrate( Z , Z )^2 ) * ( 1 / integrate( c , c ))^2 ;
cm  ==  c + Z +pi ;
- gme  ==  ( cm + pi ) / Z ;
- gme  ==  Z / ^2;
gme * Z  ==  - cm;
c  ==  (1 / m^2 ) / integrate( c , c );
v  ==  ( 4 * sqrt( 0.03 * Z^2) )/Z;
e  ==  m / ( c^2 * integrate( Z , Z ));
m  ==  sqrt( 1 / ( integrate( c , c) * c ) );
ev  ==  zet * b * inf ;
betta + pi  ==  gfoe ;
gfoe  ==  pi - b ;
gfoe  ==  -inf ;
betta  ==  -b ;
betta  ==  pi - zet ;
zet / Z  ==  b ;
ecuoue / ^2  ==  inf ;
eo  ==  e * m * c^2 * v * Z ;
Z  ==  c^2 + b^2 + inf^2 ;
zet  ==  g + cm + cm + pi ;
eb  ==  Z^2 + g^2 + c^2 ;
gb^2  ==  c^2 + Z^2 ;
mb  ==  (Z^2 + g^2 ) / integrate( Z , Z );
eb  ==  m * integrate( Z , Z ) * ( g^2 -  Z^2 );
ZU  ==  zet^2 + b^2 + ing^2 ;
Zepiz  ==  ( pi - b ) * Z ;
Zepiz  ==  inf * Z ;
X * c * integrate( c , c ) * t  ==  ( inf + v ) * integrate ( v , v ) ;
integrate( v , t )  ==  integrate( v , v ) * integrate ( t , t );
X / ( CR * integrate( CR , CR ) *c * integrate( c , c ) * t * integrate( t , t ) )  ==  ^2 * inf * integrate( inf , inf ) * 4 * t  * integrate( t, t )^2 ;
  du /  ( maxZUm * integrate ( X , X ))  ==  X;
 integrate ( X , X ) * (X^2 / eo^2 )  ==  ( c^2 + cm ) * integrate ( c , c )^2 ;
v * integrate( v , v )^2   ==  t * integrate( t , t )^2  * Z  * integrate( Z , Z )^2 * c * integrate( c , c )^2 ;
CR * t * m  ==  pi * integrate( pi , pi );
CR * integrate( CR , CR )  ==  Z^2 + c^2 ;
gm * Zpo  ==  Z; 
( gm * Zpo )^2  ==  2 * cm ;
Zpo * integrate ( Zpo , Zpo )  * (- gme) * integrate( gme ,gme )   ==  ( m * integrate ( m , m ) ) + ( t * integrate( t , t ));
e * integrate( e , e )  ==  ( m * integrate( m , m )) / ( c^2 * integrate( Z , Z ) ) ;