s = 0.1394277; p = 230.04716; g = 202.46722; gm = 206.93936; cm = 5.2467348; pi = 4.7532652; zet = 217.71395; inttrap ( 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; inttrap (Z, Z) = 0.99999482; ep = 41013.575; inttrap(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; inttrap (v , v ) = 0.9994854; inttrap (v ,v ) * inttrap (t , t ) = 0.9955453; inttrap (inf , inf ) = 0.9993811; inttrap (X , X ) = 0.9995981; inttrap(pi , pi) = 0.9912973; inttrap (CR , CR ) = 0.9996799; inttrap (m , m) = 0.9997584; inttrap (e , e ) = 0.9997584; inttrap( c , c ) = 0.9999975; m * inttrap ( c , c ) = 1.1362136; inttrap (gme , gme ) = -0.9617854; inttrap (gpo , gpo ) = 0.9956055; inttrap (g , g ) = 0.99999961; inttrap (t , t ) = 0.9937818; inttrap (Zpo, Zpo) = 1.0393766; inttrap (v , v ) = 0.9999685; inttrap (CR , CR) = 0.99758421; inttrap (cm , cm ) = 0.999995263604032; inttrap (s , s ) = 0.999999200175736; Pimm = (710/226); inttrap ( X , v ) = 0.999791382656555; inttrap (s , v ) = 0.999999311496187; inttrap ( t , v ) = 0.999262619952408; inttrap (t , Z ) * inttrap ( t, c ) = 0.997660742097646; inttrap (PIU , PIU) = 0.99693231092912; PIU = 9.26490532397694; inttrap ( cm , cm ) = 0.959628374139092; inttrap (Pimm , Pimm) = 1.06725268368853; inttrap ( pi , pi) = 0.99910747418711; inttrap (pimasb , pimasb) = 1.01376770087192; inttrap (CR , pi ) = 0.997564233356481; inttrap ( PIU , t ) = 0.997906622526492; inttrap (gb , gb ) = 0.99453946855116; inttrap ( mb , mb ) = 1.00797769498004; inttrap ( epb , epb ) = 1.00258934419242; inttrap ( t , PIU ) = 0.999500180626767; inttrap ( gm , PIU ) = -0.997408054658288; inttrap ( inf , PIU ) = 0.995880423020448; inttrap ( eo , eo ) = 1.0029555100966; inttrap ( t , PIU ) * inttrap ( g , t ) = 0.993904016188195; 1/m^2 == sqrt(0.03*Z^2)*inttrap(c,c) m^2 == 1/(sqrt(0.03)*Z*inttrap(c,c)) Z == sqrt((100*m)/(3*e)) c * inttrap(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*inttrap(Z,Z) m == ((3*e*Z^2)/100)*inttrap(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 * inttrap(Z,Z) c == (c/t * inttrap(c,c) * Z)/4 c == m /(c^2 * inttrap (Z,Z)) Z == (t * 8)/c^2 Z == sqrt ((10^2*c^2)/3) m == ( (3 * e * Z^2 * inttrap (Z,Z))/10^2) c * inttrap(c,c) == 1 / m^2 e == ( (m * 10^2 )/(3 * Z^2)) c == (s/t * inttrap(c,c) * Z ) /4 Z == sqrt((10^2 * c^2)/3) m == (3 * e * Z^2) / 10^2 t == (s/v )* inttrap(c,c) v == (s/t) * inttrap (c,c) s^2 == Z/m^2 m == e * c^2 * inttrap(Z,Z) 10^2 * m == 3 * Z^2 * e g == Z /(s^2 * m) Z == sqrt ((10^2 * m )/(3 * e )) (inttrap (Z,Z))^2 == inttrap(c,c)^2 inttrap (c,c) == 1/m^2 c == sqrt (0.3 * (Z2 /inttrap (Z,Z))) e == ( (m * 10^2 )/(3 * Z^2 * inttrap(Z,Z))) e == m /(c^2 * inttrap(Z,Z)) Z == sqrt ((10^2 * m )/(3 * e * inttrap (Z , Z ))) Z == sqrt ((c^2 * 10^2)/3) s == (v * t )/ inttrap (Z, Z ) g^2 == ep - Z^2 - c^2 Z == m * g * s^2 g == ( ( m * Z) / s^2 ) * inttrap ( c , c ) p == Z / s^2 c * inttrap ( c , c ) == ( s^2 * g ) / ( m * Z ) t == ( (s * inttrap( s , s ) ) / v ) * inttrap( c , c ) g == Z / ( m * s^2 ) g == (( m * Z) / s^2 ) * inttrap( c , c ) inttrap (c , c ) == ( g * s^2 ) / ( m * Z ) g == Z / ( s^2 * m ) s == sqrt ( Z / p ) t == ( s * inttrap( c , c ))/( 4 * sqrt ( 0.03 / inttrap (Z, Z )) ) e == m / ( c^2 * inttrap( 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 ) * inttrap( 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 * inttrap( Z, Z ) gm == (10 * ( c^2 + Z^2)) / inttrap( gm , gm ) inttrap(gm , gm) == ( 10 * ( c^2 + Z^2 )) / gm c == ( ( (s * inttrap( s , s )) / t ) * inttrap( c , c ) * Z ) / 4 1/m^2 == c * inttrap( 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 (inttrap( Z , Z ))^2 == inttrap( c , c )^2 Z^3 / 3 == c^2 v^2 == ( ep / inf^3 ) * (inttrap(t , t))^2 Z^2 + g^2 + c^2 == ( v^2 * inf^3 ) / ( inttrap( t, t ))^2 1 == ( 10^2 * m ) / (3 * Z^2 * e * inttrap( Z, Z )) 1 == m / ( e * c^2 * inttrap( Z , Z )) 1/c^2 == 10^2 / ( 3 * Z^2) inttrap( t , t ) == sqrt ( ( v^2 * inf^3 ) / ep ) inttrap( t , t ) == sqrt ( (v^2 * inf^3 ) / ( Z^2 + g^2 + c^2 ) ) Z^2 == 2 * cm ep == (( g^2 + Z^2 ) / inttrap( Z , Z )^2 ) * ( 1 / inttrap( c , c ))^2 cm == c + Z +pi - gme == ( cm + pi ) / Z - gme == Z / 2 gme * Z == - cm c == (1 / m^2 ) / inttrap( c , c ) v == ( 4 * sqrt( 0.03 * Z^2) )/Z e == m / ( c^2 * inttrap( Z , Z )) m == sqrt( 1 / ( inttrap( 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 ) / inttrap( Z , Z ) eb == m * inttrap( Z , Z ) * ( g^2 - Z^2 ) ZU == zet^2 + b^2 + ing^2 Zepiz == ( pi - b ) * Z Zepiz == inf * Z X * c * inttrap( c , c ) * t == ( inf + v ) * inttrap ( v , v ) inttrap( v , t ) == inttrap( v , v ) * inttrap ( t , t ) X / ( CR * inttrap( CR , CR ) *c * inttrap( c , c ) * t * inttrap( t , t ) ) == 2 * inf * inttrap( inf , inf ) * 4 * t * inttrap( t, t )^2 du / ( maxZUm * inttrap ( X , X )) == X inttrap ( X , X ) * (X^2 / eo^2 ) == ( c^2 + cm ) * inttrap ( c , c )^2 v * inttrap( v , v )^2 == t * inttrap( t , t )^2 * Z * inttrap( Z , Z )^2 * c * inttrap( c , c )^2 CR * t * m == pi * inttrap( pi , pi ) CR * inttrap( CR , CR ) == Z^2 + c^2 gm * Zpo == Z ( gm * Zpo )^2 == 2 * cm Zpo * inttrap ( Zpo , Zpo ) * (- gme) * inttrap( gme ,gme ) == ( m * inttrap ( m , m ) ) + ( t * inttrap( t , t )) e * inttrap( e , e ) == ( m * inttrap( m , m )) / ( c^2 * inttrap( Z , Z ) ) inttrap(e , e ) == inttrap(m , m ) e * inttrap(e , e ) == 1.8932412 m * inttrap( m , m ) == e * inttrap( e , e ) * c^2 * inttrap( c , c )^2 * inttrap( Z , Z ) inttrap( m , m ) * m == 1.1359391 m == e * c^2 * inttrap( Z , Z ) c^2 * inttrap( c , c )^2 == 0.6000001 inttrap( c , c ) = 0.9999974 c * inttrap( c , c ) * m * inttrap( m , m ) * e * inttrap( e , e ) * Z * inttrap( Z , Z ) == gm * inttrap( gm , gm ) c * inttrap( c , c ) * (-gme * inttrap( gme , gme ) ) * Z * inttrap( Z , Z ) == gm * inttrap( gm , gm ) inttrap( gm , gm ) == 0.995605558476351 inttrap( v , v ) == 0.999485410056765 c^2 * inttrap( c , c )^2 * Z * inttrap( Z , Z ) * m^2 * inttrap( m , m ) * t * inttrap( t , t ) == v * inttrap( v , v ) t * inttrap( t , t ) == 0.1999947 v * inttrap( v , v ) == t * inttrap( t , t ) * Z * inttrap( Z , Z ) * c * inttrap( c , c ) gm * Zpo == Z ( inttrap( inf , inf ) * 2 * inf * 4 * t * inttrap( t , t )^2 ) + ( Z^2 * inttrap( Z , Z )^2 ) == ( X , inttrap( X , X ) ) / ( CR * inttrap( CR , CR ) * c * inttrap ( c , c) * t * inttrap( t , t ) ) X * c * inttrap( c , c ) * t == ( inf + v ) * inttrap( v , v ) Z^2 + c^2 == eb /2 Z == ( t * 4 * c ) / ( inttrap( c , c ) * s * inttrap( s , s )) c == sqrt((3 * Z^2) / 10^2) c == Z / (sqrt( 10^2 / 3 )) s * inttrap( s , s ) == ( t * 4 * sqrt( 0.03 )) / inttrap( c , c ) v == 4 * sqrt(0.03) 1 == m^2 * c * inttrap( c , c ) t == ((s * inttrap( s , s ))/v )* inttrap(c,c) s * inttrap( s , s ) == (( t * 4 * m^2 ) / ( sqrt( 10^2 / 3))) * c t == ( sqrt( 10^2 / 3 ) * c * inttrap( Z , Z ) * s ) / ( 4 * c ) 1 == ( sqrt( 10^2 / 3 ) * c ) / Z c == ( Z * inttrap( Z , Z ) * s ) / ( 4 * t )