Equivalency of Momentum and Kinetic Energy and Pythagorean Conservation of Mass and Energy

Transcription

1 Intenational Jounal of Applied Physis and Matheatis, Vol., No. 4, July quivaleny of Moentu and Kineti negy and Pythagoean Consevation of Mass and negy Mohsen Lutey Abstat Aepted equations in the ehanis esults that the piniple of linea addition is not opatible by addition of stati enegy and ineti enegy suppose onsevation of ass and enegy is Pythagoean onsevation and too beause of oentu onsevation it is poved that oentu and ineti enegy ae equivalene and equivaleny of oentu and ineti enegy esults Pythagoean onsevation of enegy. In fat the oentu onsevation does esult that the oentu and ineti enegy ae equivalene. Too unpoved de Boglie wave equation is poved by equivaleny of oentu and ineti enegy and this egula pape is inluded too to the fat that instein enegy is iaginay. Index Tes Kineti enegy, pythagoean onsevation of ass, equivaleny of oentu I. INTRODUCTION In the lassi ysis ineti enegy is deteined by the invaiant sentene below that, ( / ) v / () And in the elativity it is defined by the equation that, () In fat soe easons ause aepting that ineti enegy is linea diffeene of enegy and stati enegy and expeient does veify it, fo exaple invaiane of sentene () sees onsevation of enegies and to the sae eason it is onsideed that, ( / ) v Too onsideed enegy of otons aong the levels in an ato alulated by Shödinge equation and Copton ffet and ollision of big bodies and high enegeti ollision of fundaental patiles. of ouse thee ae any anoalous enoenon against in the expeients and fo exaple low enegy ollisions in quantu ysis and lost neutinos and lost enegy of beta deay and easued yield of nulea explosions that is less than theoetially onsideed. Then it is not ipossible existene of eo in the definition of ineti enegy howeve hee poving an opposite equation fo ineti enegy is elated to the pue alulation based on the aepted papes. In fat eve thee is a law to hange and this is ay the sae benefit of siene. II. PYTHAGORAN CONSRVATION OF MASS Aoding to the equivaleny of ass and enegy and fo plan equation of enegy, oton hν And then oentu of oton is that, oton hν (3) It is anifest that a oton is possible to adiate fo a stati ass lie an ato. Then aoding to the oentu onsevation, oentu and beause of the fat that oentu of stati ass is zeo, It is anifest that geneated oentu in the ass should be etainly equal to the oentu of oton (3) and then, hν v (4) In the quantu ysis [] this equation is used to pove the equation of unetainty piniple [] and then its oetness is not new. Using equation (3) into the equation (4) appeas that, v (5) On the othe hand, ( v / ) Using this faous equation in the equation (5), v v / ( ) ( v / ) v v v Using equation (5), v v v + Manusipt eeived Apil 5, ; evised May 7,. Mohsen Lutey is with Azad univesity of Ian, Ian (e-ail: ololel@yahoo.o). This is addition of stati ass and otoni ass that it is not opatible by piniple of linea addition suppose as a 96

2 Intenational Jounal of Applied Physis and Matheatis, Vol., No. 4, July wonde addition of these asses is opatible by Pythagoean Theoe that stati ass and otoni ass ae two sides of a etangle that is its hod that, Using this equation into the equation (7), v (8) Using this equation in the equation (6), v (9) Fig.. Pythagoean onsevation of ass. In fat Pythagoean onsevation of ass hee is inopatible by linea onsevation of ass that, + Suppose adding a otoni ass to a stati ass is Pythagoean onsevation that, + In fat when we add a g of oton to a g of stati ass, additional ass is not opatible by linea addition that, + Suppose it is aepted that, + In fat the stati ass and otoni ass ae pependiula togethe and to the sae eason thei onsevation is Pythagoean. III. KINTIC NRGY AND MOMNTUM QUIVALNCY The enegy of oton is ineti enegy oplete and enegy of stati ass is oplete, stati enegy and then when it is added oplete of a oton to a stati ass lie the fae that a oton is added to an ato, beause of onsevation of enegy and the fat that ineti enegy of stati ass is zeo, it is anifest that geneated ineti enegy in the oving ass is soued oplete with enegy of added oton e and added oton enegy is oplete, ineti enegy and then geneated ineti enegy in the oving ass is the sae enegy of oton that it is added to the ass at the station. In fat it is anifest that the ass is just inluded to the two faes of enegy, stati enegy and ineti enegy and then beause of the fat that ineti enegy of oving ass is not geneated by the stati ass, to the sae eason ineti enegy of oving ass and ineti enegy of added oton ae equal and beause that the oton is just ineti enegy then ineti enegy of oving ass and enegy of added oton ae equal that, (6) On the othe hand if we ultiple to the equation (5), It is anifest that, v (7) The oentu is defined that, p v Using this equation in the equation (9), p () Beause of onstany it is anifest that this equation appeas that oentu and ineti enegy ae equivalene. This is equivaleny of ineti enegy and oentu that it is not equal with aepted equation that, / v ( ) IV. PHYTHAGORAN CONSRVATION OF NRGY On the othe hand beause of below shape equation of elativisti ass that, v And using equivaleny of ass and enegy appeas that, ( ) + v Beause of equivaleny of oentu and ineti enegy, v It is esulted that, + This is against the piniple of linea addition that, + And the onsevation of enegy fo addition of ineti enegy and stati enegy is Pythagoean lie the ass onsevation and Pythagoean onsevation appeas that, Stati enegy and ineti enegy ae pependiula togethe and to the sae eason thei addition is Pythagoean and then, () And finally we should aept that the linea diffeene of total enegy and stati enegy is not enegy suppose Pythagoean diffeene is ineti enegy and then, Fig.. Pythagoean onsevation of enegy. V. PROVING D BROGLI WAV QUATION BY QUIVALNCY OF MOMNTUM AND KINTIC NRGY Aoding to the de Boglie wave equation [3] that, 97

3 Intenational Jounal of Applied Physis and Matheatis, Vol., No. 4, July h p λ And this equation eans that eah ass is a wave too that its oentu p is popotional with its invese wavelength. But this equation is not yet poved suppose it is just onsideed beause of its expeiental veifiation by Clinton Jose Davisson in USA [4] and by Geoge paget Thoson in ngland. To pove the de Boglie wave equation we should notie that if we onside that the stati ass is not wave then geneated wave in the oving patile should be etainly just soued by the ineti enegy of oving ass beause that eah oving ass is just inluded to the stati ass and oving ass and then when stati ass is wave less, the wave is ineti full. In fat ineti enegy in a oving ass aoding to the equation (6) that, K And using equation below that, It is that, K Now if we onside that oving ass is quantized by quantization of otoni enegy, it is appeaed a ass that it is oton lie with diffeene in the axiu speed beause of existene stati ass eans that eleton is a oton lie patile that its axiu speed is diffeene. We should notie that being oton lie eans that eleton lie the light eve has a onstant speed in a onstant ondition and in fat the speed of eleton is eve axiu speed lie the oton and this axiu speed is vaied by the existene otoni enegy in the oving eleton. In fat stati ass is not wave and then it is ontinuu and when we add diffeentially stati ass to oton it is anifest that fequeny of oton is not hanged by diffeentially addition of ass beause that fequeny of oton is a quantu nube and quantu nube if it is hanged it is hanged by a quantu value of stati ass not ontinuu values. Then vaiation in the oton by added ass is not a quantu vaiation suppose it should be vaied just ontinuu values lie the speed that it is not a quantu in the wave too. Then ineasing gadually stati ass to a oton does hange neve its quantu nube and fequeny is too a quantu nube. In fat this is geneal onept that ontinuu paaetes vaiation doesn t hange the quantu paaetes and in the quantu ehanis quantu paaetes ae vaied by quantu paaetes and ontinuu paaetes ae vaied by ontinuu paaete. Hee the stati ass is ontinuu and to the sae eason vaiation of stati ass doesn t hange the fequeny and to the sae eason when a oton plus to a stati ass, the geneated oving ass should be had the sae fequeny that added oton has it. Added oton fequeny is by plan equation that, oton hν And beause of the esulted fat that fequeny of oton is not vaied by stati ass that it eans that fequeny of oving ass and added oton is equal that, ν ass ν Using this equation in the equation (4) below that, v hν It esults that, p h / λ VI. INSTIN RVISD QUATION Aoding to the fat that ineti enegy is otoni tue enegy and stati ass too is a tue ass, is not tue suppose it is a value to agee soe othe values in the equations lie the oentu onsevation and in fat when stati ass and ineti enegy ae tue, geneated paaete by Pythagoean onsevation below is not tue, + In fat we an wite Pythagoean onsevation of enegy in the below fae that, ( i ) + ( i) v () Beause t is anifest atheatially that if we onside, v i Then it is onsideed in the oplex alulus that, ( ) ( ) ( ) + v On the othe hand about the enegy equation that, + It is again anifest that total enegy is not tue beause that stati enegy is tue and ineti enegy is tue too and then lie the ass, too is figuative and to the sae eason we an eplae by its iaginay value and in fat beause of equation () it is esulted that, ( i) + ( i) v instein faous equation tansfes to the below fae that, i And it is appeaed that, ( And this is tue fae of instein equation that it should be onsideed eve until tue values ealizable with figuative values in the syste. In the Shödinge wave equation too the onsideed enegy is appeaed as an iaginay sentene that, t VII. TH QUATION OF RLATIVISTIC MASS Conside a stati ass and a oton added to the sae stati ass. Adding oplete of oton to this stati ass hanges speed fo zeo to a speed v. Now onside a foe that it is ating on the sae stati ass ) 98

4 to hange its speed fo zeo to speed v. If we onside that aiving to the v is soued by adding oton, the foe in the elativity is ating with addition of oton and in fat we an onside that light is foe. It is anifest that foe should be paallel with dietion of otion until foe ation and adding oton to be unified and it is inteest that this fat is ageeent with definition of enegy that, d f d Now beause of the fat that displaeent along the foe is d that, d d osθ And angle is angle between foe dietion and dietion of displaeent of ass then it is anifest that, d fd Then aoding to the equivaleny of ass and enegy that, ( ) fd d (3) And now beause of equation that, dp f It is appeaed that, dp f d d And beause that veto diffeential of oentu veto is along the foe veto, to the sae eason it is appeaed that, dp fd d fd vdp (4) And aoding to the equation (3) and using it in this equation it is appeaed that, d vdp vd( v) d d ( v ) vdv d vdv v ln( / ) ln v + ln ln ( / ) Intenational Jounal of Applied Physis and Matheatis, Vol., No. 4, July ln v ( v / ) And then oetness of this equation is independent of dietion of foe and in eah dietion it is ageeent and on the othe hand it is anifest that wo law is opatible by elativisti ass and then the law of wo is elativisti too. In fat geneated longitudinal ass and tansvese ass is beause of using non elativisti fae of foe that, dv f And this fat is lea and using below equation in the instein pape anifestly shows the sae fat, d v[ dv] v 3 v / ( ( ) ) dv VIII. TH CONSRVATION LAW IS NOT CONSRVATION LAW SUPPOS INVARIANC MATHMATICALLY Aoding to the below equation of enegy that, d f d Coetness of this equation is independene fo oetness of the fae that diffeene of enegy is enegy suppose oetness of the fae that diffeene of enegy is enegy is depended to the piniple of linea addition and then when we onside an evident sentene that, f d f d Coetness of this equality is evident, not depended to the oetness of linea addition piniple. Then eah esult geneated by this evident equality is independent fo piniple of linea addition. Veto alulus (4) shows that, d vdp By this equation it is appeaed that, v v' ' Then appeaane of onstany of the sentene that, v It is not depended to the piniple of linea addition beause it is esult of an evident equality. In fat this sentene is an invaiant sentene in the alulus of equations wheeas that it is not onsevation of enegy. In the ollision of bodies too the foe afte ollision is the sae befoe ollision and then, afte befoe befoe d ( v / ) i v / v / afte IX. POTNTIAL NRGY IS NOT NRGY About the potential enegy too, beause of wo law that, d d It is anifest that, ( ) ( ) + If we onside in a possible that, 99

5 Intenational Jounal of Applied Physis and Matheatis, Vol., No. 4, July and, () ( () ) v And then, p And beause of the fat that linea diffeene of these enegies is not enegy, then onsideed potential enegy is not enegy too. ACKNOWLDGMNT This pape is egula pape and to be ontinued with seveal papes along the sae and too please waiting fo a boo naed absolutely elativity that this pape is just seveal pages fo this boo. I announe hee appeaane of a new ysis naed absolute ysis that, It is unifiation of diffeenes. Out of theoy and siulation suppose the sae that is the sae. In fat if absolute ysis is a theoy it is theoy of light and if ysis is theoy of eveything, the light is eveything. Absolute ysis is aived to the end fat that the light is a twenty diensional thing that twentieth diension is not an independent diension suppose it is inluded to the othe diensions and unifie of these eleven diensions and this final diension is not anything else tie. Then equation of tie is equation of eveything and to the sae eason the equation of iniu tie esults tue equations in the ysis and in fat best ation is least ation and least ation is iniu tie. Absolute ysis is least nube of laws that foundation of otion in the natue needs it wheeas that set of all laws in the natue is infinity beause that set of laws is the will of god and when the god wants it is appeaed a law. Least laws to eate otion set logial ysis as a oe and the su of laws with the sae oe is wisdo ysis. I have disoveed it any yeas ago but I hide it to oplete and to the sae eason I don t publish any pape in these yeas and this is fist pape that it is just seveal pages fo a boo with nae absolute elativity. Absolute ysis is too lage and to the sae eason I should publish gadually one by one the papes and the boos. RFRNCS [] R. Shane, Aazon.o piniples of qunatu ehnais. [] Paul C. V. Davission, Davidas, Betes, Quantu ehanis [3] R. isbeg and R. Resni, "hapte 3 de Boglie's postulate-wavelie popeties of patiles" quantu ysis of atos, oleules, solids, Nulei, and Patiles nd ed., John wiely and sons. [4] C. J. Davisson and G. P. Thoson, The noble foundation, Clinton Jose Davisson and Geoge Paget Thoson fo thei expeiental disovey of the diffation of eletons by ystals, 937. M. Lutey Reseahe and nginee. Fo eath in the Ian and I a designing pesonally a new ysis naed absolute ysis and tue o false it should be eviewed by awae pesons. 3