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HSC & Admission Physics All Formula PDF

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Mr Shadath

উচ্চ মাধ্যমিক (HSC) ও বিশ্ববিদ্যালয় ভর্তি পরীক্ষায় পদার্থবিজ্ঞানের প্রয়োজনীয় সকল সূত্রাবলি একত্রে।

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01725-176911 SHADATH'S SPECIAL PHYSICS CARE GBP.Gm.wmGKv‡WwgK,BwÄwbqvwisIfvwm©wUGWwgkbc`v_©weÁv‡bi†mive¨vP c`v_©weÁvb'im~Îvewj BUET&VARSITYMISSION'iwmwbqiwk¶KbvRgymmv`vZfvBqv'i Lyjbv'i e¨vPt wcwUAvB †gvo,Lyjbv wet`ªt evmvq MÖ“c K‡i covi mxwgZ my‡hvM Av‡Q|
†fŠZRMr I cwigvc  হলে শতকরা ত্রুটি এখালে, যেল াে পূর্ণসংখযা বা ভগ্াংশ যেল াে পূর্ণসংখযা বা ভগ্াংশ  Q P R    + = †f±‡ii †hvM, we‡qvM Ges gvb wbY©q • ( ) ( ) ( )k̂ z B z A j ˆ y B y A î x B x A B A  +  +  = →  → • k̂ A ĵ A î A R Z y x + + =  GKwU †f±i ivwk n‡j, Gi gvb, 2 z 2 y 2 x A A A R + + =  GKK †f±i wbY©q • R  Gi w`‡K GKK †f±i, | R | R r̂   = • → A I B → Gi j¤^w`‡K GKK †f±i,  =  A B A B → → → →   †f±i ¸Yb • B . A   = AB cos  = AxBx + AyBy + AzBz • B A    = AB sin  = z y x z y x B B B A A A k̂ ĵ î  1 k̂ . k̂ ĵ . ĵ î . î = = = Ges 0 k̂ k̂ ĵ ĵ î î =  =  =   k̂ ĵ î =  , ĵ î k̂ =  , î k̂ ĵ =  , k̂ î ĵ − =  †f±i ¸b‡bi cÖ‡qvM • A  I B  †f±iØq j¤^ n‡j AxBx + AyBy + AzBz = 0 • A  I B  ‡f±iØq mgvšÍivj n‡j z z y y x x B A B A B A = = †f±‡ii ga¨eZ©x †KvY wbY©q • cos  = AB B . A   • cos = AB B A B A B A z z y y x x + + A‡¶i mv‡_ Drcbœ †Kv‡Yi †¶Î, x = cos–1           + + 2 Z 2 y 2 x A A A Ges y = cos–1           + + 2 Z 2 y 2 x A A A z = cos–1           + + 2 z 2 y 2 x A A A Awf‡¶cwbY©q • A  eivei B  Gi Awf‡¶c = A B . A   mvgvšÍwi‡Ki m~Î • jwä, R =  + + cos PQ 2 Q P 2 2 jwäi †KvY,  = tan–1  +  cos Q P sin Q • → A I → B †Kvb mvgvšÍwiK A_ev i¤^‡mi mwbœwnZ evû n‡j Z‡e mvgvšÍwiK ev i¤^‡mi †¶Îdj = → →  B A • → A I → B †Kvb mvgvšÍwiK A_ev i¤^‡mi KY© n‡j Z‡e mvgvšÍwiK ev i¤^‡mi †¶Îdj = → →  B A 2 1  Need To Know: 1.  = 0n‡j, R = P + Q, hv jwäi m‡e©v”P gvb| 2.  = 180n‡j, R = P  Q hv jwäi ¶z`ªZg gvb| 3.  = 90n‡j, R = 2 2 Q P + 4. R2 max + R2 min = 2R2 90 5. wZbwU ej †Kv‡bv we›`y‡Z fvimvg¨ m„wó Ki‡j G‡`i †h‡Kvb `yBwUi jwä AciwU n‡e| 6. P = Q n‡j Ges ej؇qi jwä †h †Kvb e‡ji mgvb n‡j  = 120 7. P = Q n‡j Ges ej؇qi jwä †h †Kvb e‡ji wظY n‡j  = 0 8. P = Q n‡j Ges ej؇qi jwä †h †Kvb e‡ji A‡a©K n‡j  = 151 9. P = Q n‡j R = 2Pcos 2  Dcvs‡k wefvRb • j¤^fv‡e wefvR‡bi †¶‡Î, • Avbyf~wgK Dcvsk, X  = R cos  • Dj¤^ Dcvsk, Y  = R sin  MwZwe`¨v(DYNAMICS) s = ut v2 = u2 + 2 a s v = u  at s =       V0 + V 2 t a = t u ~ v V = 2 v u + t Zg †m‡K‡Û AwZµvšÍ `~iZ¡, Sth = u + ( ) 1 2 2 1 − t a a = t t m n m n S S t t − − , S(t+1)Zg = StZg + a  †eM, v = dt ds Z¡iY, a = dt dv = 2 2 dt s d  x `~iZ¡ †f` Kivi ci Gi †eM n 1 Ask nviv‡j, ¸wjwU AviI s `~iZ¡ †f` Ki‡j s = x n2 – 1  x `~iZ¡ cÖ‡e‡k‡i ci †eM A‡a©K n‡j, `~iZ¡ hv‡e, s = 3 x  x `~iZ¡ cÖ‡e‡k‡i ci †eM GK-Z…Zxqvsk n‡j, `~iZ¡ hv‡e, s = 8 x  GKwU ivB‡d‡ji ¸wj GKwU Z³v‡K †f` Ki‡Z cv‡i| ¸wji †eM v ¸Y Kiv n‡j Z³vi msL¨v n‡e, n = v2 Ges ¸wjwU n msL¨K Z³v †f` Ki‡j †eM n‡e v = n ¸Y| P  A Q  B C Q P R    + = O A B X  Y  R   C  î -Gi mnM ŷ -Gi mnM ẑ -Gi mnM AwZµvšÍ `~iZ¡ mgxKiY msµvšÍ mgm¨v Z³vi mgm¨v cošÍ e¯‘i MwZi mgxKiY MwZi mgxKiY msµvšÍ mgm¨v
2 gt 2 1 ut h  = 2 gt 2 1 h = [Avbyf~wgK w`‡K gvi‡j] 2 gt 2 1 ut h + − = [h D”PZv n‡Z Dj¤^ eivei gvi‡j] hth = 2 1 g(2t-1) h D”PZv †_‡K GKwU e¯‘‡K wb‡P †d‡j w`‡j Ges GKB mg‡q GKwU e¯‘‡K u †e‡M Dc‡i wb‡¶c Ki‡j, wgwjZ nevi mgq, t = u h Ges wgwjZ nevi ¯’vb, h 2 ) u h ( g 2 1 h − = v2 = u2  2gh hth= u  2 1 g(2t-1) H = ut  2 1 gt2 V = u  gt m‡e©v”P D”PZv †_‡K bvg‡Z mgq g u t = m‡ev©”P D”PZvq DV‡Z mgq g u t = wePiYKvj g u 2 T = m‡e©v”P D”PZv g 2 u H 2 = f~wgi mv‡_  †Kv‡b Ges Dj¤^ eivei gvi‡j (i) cvjøv, R = g 2 sin v o 2 o  (ii) MwZ c‡_i mgxt y = bx-cx2 (iii) m‡e©v”Pcvjøv Rmax = g v2 o (iv) m‡e©v”P D”PZv, H = g 2 sin V o 2 2 o  (v) wePiY Kvj, T = g sin v 2 o o   g‡b ivL‡Z n‡e: = 45°n‡j R = Rmax = g u2 = 90°n‡j H = Hmax = g 2 u2 = 76°n‡j R = H n‡e|  GKwU wbw¶ß e¯‘i †h †Kvb mg‡q Zvr¶wbK †e‡Mi AwfgyL ¯úk©K eivei|  H max = 2 Rmax  = 45°n‡j H = 4 R  cÖ‡¶c‡KvY  n‡j tan = R T 9 . 4 2  GKB Avw`‡e‡M `yywU e¯‘i Avbyf~wgK cvjøv mgvb n‡e hw` wb‡¶c †KvY  Ges AciwU (90°- ) nq|  f~wg n‡Z wbw¶ß cÖv‡mi †¶‡Î Avbyf~wgK eivei Z¡i‡Yi gvb k~Y¨| h D”PZv n‡Z Avbyf~wgK eivei gviv n‡j, Avbyf‚wgK fv‡e wbw¶ß e¯‘i MwZi mgxKi‡Yi †¶‡Î 2 y 2 x v v v + = x y v v tan =  2 gt 2 1 h = s = ut cÖw¶ß e¯‘i MwZi mgxKi‡Yi †¶‡Î †e‡Mi Dj¤^ AskK, vy = v0sin0 – gt. †e‡Mi Avbyf‚wgK AskK, vx = v0cos0 h= – usinot + 1 2 gt2 Vy = – u sin 0+ gt. †K›`ªgyLx Z¡i‡Yi †¶‡Î a = r r v 2 2  = =       2 T 2  =       2N t 2  †K›`ªgyLx ej, F = m2 r wbDUwbqvb ejwe`¨v NEWTONIAN MECHANICS ❑ ˆiwLK I †KŠwYK MwZi g‡a¨ mv`„k¨: ˆiwLK †KŠwYK S  = 2πN V = t s / v = r  = t  = t N  2 a = r  m I F = ma  = I ˆiwLK †KŠwYK S = vt  = t →mg‡KŠwYK S = vt 2 1  = 2 1 t →GKwU †eM k~Y¨ n‡j S = 2 2 1 at  = 2 2 1 t  P = Fv P =  Ek = 2 2 1 mv Ek = 2 1 I2 fi‡e‡Mi wbZ¨Zvi m~Î, 2 2 1 1 v m v m = e›`y‡Ki cðvr †eM V, e›`y‡Ki fi M, ¸wji †eM v, ¸wji fi m n‡j, MV + mv = 0 wbw¶ß e¯‘i MwZi mgxKiY D”PZvi mgxKiY  u h s u h= 2 gt 2 1 s=ut u1 u sin   cÖvm RwbZ mgm¨v wbw¶ß e¯‘i MwZi mgxKiY cÖw¶ß e¯‘i MwZi mgxKiY †K›`ªgyLx Z¡iY RwbZ mgm¨v fi‡e‡Mi wbZ¨Zvi m~Î
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911 cðvr †eM V, †bŠKvi fi M, Av‡ivnxi †bŠKvi †eM v Ges Av‡ivnxi fi m n‡j, MV + mv = 0 fi‡eM P= Ft = m (v-u) = mv ej F = ma = m ( ) t u v − ( ) ( ) u v m t t F 1 2 − = − e‡ji NvZ    J Ft mv mu = = − m1u1 + m2u2 = m1v1 + m2v2 (G‡Ki AwaK e¯‘i g‡a¨ msNl© nq Zvn‡jI G m~Î cÖ‡hvR¨) wgwjZ e¯‘i †eM, v = 2 1 2 2 1 1 m m u m u m +  [GKB w`K †_‡K G‡m av°v †L‡j (+), wecixZ w`K n‡j (-)] (i) DaŸ©Mvgx wjd‡Ui †¶‡Î: R = m (g + f) (ii) wbgœMvgx wjd‡Ui †¶‡Î: R = m (g – f)  MwZkw³ Ek = m 2 p mv 2 1 2 2 = → MwZkw³ n ¸b Ki‡Z n‡j eZ©gvb †eM v2 = v1 n  w¯’Z Nl©Y ¸YvsK, s Fs R = s tan = k = tan-1 (k) i‡K‡Ui †¶‡Î, DaŸ©gyLx av°v ev ej, F = Vr . dt dm wb‡¶‡ci mgq i‡K‡Ui Dci cÖhy³ jwä ej = Vr g m dt dm 0 − GLv‡b mo = i‡K‡Ui †gvU fi| i‡K‡Ui Dci wµqvkxj jwäZ¡iY, g dt dm m v a r −       = i‡K‡Ui Zvr¶wYK Z¡iY, g t m M r V a −  =       → AvbZ Zj eivei gv‡e©j ev †MvjK AvK…wZi e¯‘ Mwo‡q co‡j †gvU kw³ Ek = 2 10 7 mv n e¨vmv‡a©i myZvi mvnv‡h¨ m f‡ii cv_i‡K e„ËvKvi c‡_ Nyiv‡j myZvi Dci Uvb ev †K›`ª wegyLx ej, F = r mv2 = m2 r r ˆ`‡N©¨i myZvi mvnv‡h¨ evjwZ‡Z cvwb wb‡q KZ †e‡M Nyiv‡j evjwZ n‡Z cvwb co‡e bv, †m‡ÿ‡Î v = rg n‡e| †KŠwbK †eM,  =  t = 2N t ‰iwLK †eM, v = r  m f‡ii cv_i‡K r ˆ`‡N©¨i myZvi mvnv‡h¨ Nyiv‡j, I = mr2 (evwl©K)  m f‡ii I r e¨vmv‡a©i GKwU †MvjK‡K wbR A‡¶i mv‡c‡¶ Nyiv‡j I = 2 5 2 mr (AvwüK)  c„w_exi AvwüK MwZi Rb¨ c„w_exi RoZvi åvgK I = 2 5 2 MR (R = c„w_exi e¨vmva©)  evwl©K MwZi Rb¨ c„w_exi RoZvi åvgK, I = 2 Mr ( r = m~h© n‡Z c„w_exi `~iZ¡)  r e¨vmv‡a©i wis‡K wbR A‡¶i mv‡c‡¶ Nyiv‡j, I = mr2  PvKwZ wbR A‡¶i mv‡c‡¶ Nyiv‡j, I = 2 2 1 mr  wb‡iU wmwjÛvi‡K wbR A‡¶i mv‡c‡¶ Nyiv‡j, I = 2 2 1 mr  m fi I l ˆ`‡N©¨i `Û‡K gvS eivei Dj¤^ A‡¶i mv‡c‡¶ Nyiv‡j = 2 12 1 ml Ges GKcÖv‡šÍi mv‡c‡¶ Nyiv‡j, I = 3 2 ml  iv¯Ívi evuK, rg v tan 2 =  KvR, kw³ I ÿgZv WORK, ENERGY & POWER  MwZkw³, Ek = 1 2 mv2  w¯’wZkw³, Ep = mgh  f‚wg n‡Z x D”PZvq MwZkw³, w¯’wZkw³i n ¸Y n‡j D”PZv, x = h n + 1  KvR W F S FS cos = =   .  = Pt mgh mv 2 1 2 = =  ¶gZv, t W P = = t mgh = t mv 2 1 2  ¶gZv, Fv t S . F t W P = = =  GKwU ivB‡d‡ji ¸wj wbw`©ó cyiæ‡Z¡i GKwU Z³v †f` Ki‡Z cv‡i| Giæc n wU Z³v †f` Ki‡Z n‡j ¸wji †eM n‡e n ¸Y|  n msL¨K BU‡K hv‡`i cÖ‡Z¨‡Ki D”PZv h GKwUi Dci Av‡iKwU †i‡L ¯Í¤¢ ˆZwi Ki‡Z K…ZKvR, W = mgh n(n – 1) 2  nvZzwo Dj¤^fv‡e †c‡iK‡K AvNvZ Ki‡j, W=mg (h +x) NvZ ej RwbZ mgm¨v wgwjZ e¯‘i MwZ RwbZ mgm¨v wjd&U RwbZ mgm¨v MwZkw³ wbY©q Nl©Y ¸YvsK RwbZ mgm¨v i‡K‡Ui MwZ RwbZ mgm¨v †Mvj‡Ki †gvU MwZkw³ wbY©q †K›`ªgyLx ej msµvšÍ mgm¨v †KŠwYK †eM msµvšÍ ˆiwLK I †KŠwYK †e‡Mi m¤úK© RoZvi åvgK hvbevnb I iv¯Ívi evuK msµvšÍ mgm¨v MwZkw³ I w¯’wZkw³ wbY©q KvR I ¶gZv wbY©q K…ZKvR RwbZ mgm¨v
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  nvZzwo Avbyf‚wgKfv‡e †c‡iK‡K AvNvZ Ki‡j, W= 1 2 mv2  cvwb c~Y© Kzqv Lvwj Ki‡Z W = mgh [Mo D”PZv 2 h ]  Dc‡ii A‡a©K cvwb †Zvjv n‡j, 4 h h =   A‡a©K c~Y© Kzqvi m¤ú~Y© cvwb †Zvjv n‡j, 4 h 3 h =   `¶Zv  me©`v p Gi mv‡_ ¸b nq|  e›`y‡Ki ¸wji †¶‡Î, S . F mv 2 1 2 =  MwZ kw³, EK = m 2 P2  KvR kw³ Dccv`¨,       − = 2 2 mu 2 1 mv 2 1 W  cvwb †g‡N cwiYZ n‡Z K…ZKvR, gh A gh v mgh W  =  = = l  Dj¤^ eivei f~wg n‡Z x D”PZvq EpI Ek  MwZkw³ wefe kw³i A‡a©K n‡j, x = 3 h 2  MwZ kw³ wefe kw³i wظb¸Y n‡j, x = 3 h gnvKl© I AwfKl© GRAVIATION & GRAVITY gnvKl© ej, F = 2 2 1 d m Gm AwfKl©ej, 2 R GMm mg F = = f‚-c„‡ô AwfKl©R Z¡iY, 2 R GM g = = G R  3 4 c„w_exi fi, M = gR G 2 c„w_exi NbZ¡,   = 3 4 g GR h D”PZvq Z¡iY, 2 h h R R g g       + = D”PZv, h = R 1 w w R 1 g g 1 1         − =         − h MfxiZvq Z¡iY       − = R h R g gd mylg Nb‡Z¡ `ywU MÖ‡ni Rb¨ → g  R A_©vr , 2 1 2 1 R R g g = `ywU MÖ‡ni fi mgvb n‡j → g  2 R 1 A_©vr , 2 1 2 2 1 R R g g         = p e 2 e p p e p e W W R R M M g g =          = K…wÎg DcMÖ‡ni ˆiwLK †eM v = GM R + h = R = g R + h K…wÎg DcMÖ‡ni †eM I AveZ©b Kv‡ji g‡a¨ m¤úK© v = 2 T (R + h) f‚w¯’i DcMÖ‡ni AveZ©b Kvj, T = 2 r3/2 R g gyw³‡eM, v= gR 2 = R GM 2 gnvKl©xq wefe, V = R GM − gnvKl©xq cÖvej¨, 2 r GM E = †Kcjv‡ii Z…Zxq m~Î t 3 2 R 2 2 T 3 1 R 2 1 T = c`v‡_©i MvVwbK ag© STRUCTURAL PROPERTIES MATTER w¯’wZ¯’vcK ¸YvsK wbY©q  ˆ`N©¨ weK…wZ = l L  AvqZb weK…wZ = V v  Amn cxob = Amn ej †¶Îdj = F A  Bqs Gi w¯’wZ¯’vcK ¸YvsK, l l 2 r mgL A FL Y  = =  AvqZb ¸YvsK, K FV Av = = v PV [P = Pvc = A F ] w¯’wZkw³ MwZkw³ x h-x mgq h–x h x Ep = mgx Ek= mg (h- x) K‚c RwbZ mgm¨v MwZkw³ I K…ZKv‡Ri m¤úK© Dj¤^ eivei w¯’wZkw³ I MwZkw³ gnvKl© I AwfKl© ej wbY©q AwfKl©R Z¡iY, c„w_exi fi I NbZ¡ wbY©q c„w_exi wewfbœ ¯’v‡b AwfKl©R Z¡iY `ywU MÖ‡ni fi I NbZ¡ RwbZ mgm¨v K…wÎg DcMÖ‡ni †eM I AveZ©b Kvj gyw³‡eM, gnvKl©xq wefe I cªvej¨ wbY©q
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  AvqZb ¸YvsK, K =  PV  cqm‡bi AbycvZ,  = Ld D l  Y Y i r r i = l l Y = 2n (1+)  Y = 3k (1-2) û‡Ki m~Î: cxob weK…wZ = aªæe  w¯’wZ¯’vcK w¯’wZkw³ ev †gvU kw³, W YA L =  1 2 2 l  GKK AvqZ‡b w¯’wZkw³ E = 1 2  cxob  weK…wZ = AL F 2 1 l   cvwbi c„ôUvb, L F T =  e¯‘i IRb, W= cøeZv (F1) + mv›`ªej (F2)  c„ôUv‡bi Dci ZvcgvÎvq cÖfve, T = To (1– t)  Zi‡ji c„ôUvb, ( )  +  = cos 2 3 r h g r T =   cos 2 g rh = 2 g rh  cvwbi †j‡f‡ji cv_©K¨,         −  =  2 1 r 1 r 1 g T 2 h  mv›`ªej: F A dv dx =  [cÖ‡kœ †Zj D‡jø¨L _vK‡j]  mv›`ªZvsK:  =       F A       dx dv  †÷vK‡mi m~Î: F = 6r  M¨v‡mi †¶‡Î ZvcgvÎvi mv‡_ mv›`ªZvsK 2 1 2 1 T T =    †Mvj‡Ki cÖvšÍ †eM, ( )   −  = 9 g 2 r 2 V  AwZwi³ Pvc, r T 4 P =  †gvU w¯’wZkw³ t E = TA  c„ôkw³ e„w×, E = AT = 4 (Nr2 -R2 )  T  mvev‡bi ey`ey‡`i †¶‡Î, E = 24(Nr2 -R2 )T ch©ve„wËK MwZ PERIODIC MOTION  T = g L 2 = 2 m k = 2 e g  1 2 2 1 g g T T = [hw` L AcwiewZ©Z _v‡K]  2 1 2 1 L L T T = [hw` g AcwiewZ©Z _v‡K]  cwiewZ©Z †`vjbKvj wbY©q, 86400 86400 T T 1 2   =  †eM V =  2 2 x A −  Z¡iY a = –2 x  m‡e©v”P †eM Vmax = A  m‡e©v”P Z¡iY amax = 2 A  miY; x = A sin(t + )  †`vjbKvj T =   2  †KŠwYK †eM  = k m  d2 x dt2 + 2 x = 0  w¯cÖs Gi mgm¨v: ej F = mg = kx → k wbY©q K…ZKvR W = ( ) 2 1 2 2 2 x x k 2 1 kx 2 1 − = †`vjbKvj  = 2 T K M = g x 2  w¯cÖs Gi ej aªæeK x mg K =  †gvU kw³ = 1 2 m2 A2  cvnv‡oi D”PZv wbY©q: R h R T T 1 2 + = †`vjK GKw`‡b †¯øv/dv÷ n‡j, R h R 86400 86400 + =   Zi½ WAVE  †hgb : cvwb‡Z m„ó †XD, Zvwor †PŠ¤^K ˆ`N©¨ → wØgvwÎK  Zi½P~ov n‡Z Zi½P~ovi `~iZ¡ →   mg`kv m¤úbœ `ywU KYvi ga¨eZ©x `~iZ¡ →  GKw`‡b slow ev fast mgq| †`vjbKvj m¤úK©xZ mgm¨v cwiewZ©Z †`vjbKvj wbY©q m‡e©v”P †eM I Z¡iY w¯cÖs RwbZ mgm¨v cvnv‡oi D”PZv wbY©q AbycÖ¯’ Zi½ w¯’wZ¯’vcK ¸YvsK I cqm‡bi Abycv‡Zi g‡a¨ m¤úK© w¯’wZkw³ wbY©q cvwbi c„ôUvb wbY©q †KŠwkK b‡j cvwbi Av‡ivnb wbY©q mv›`ªZvsK wbY©q cÖvšÍ‡eM I c„ôkw³ e„w× wbY©q
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  wecixZ `kv m¤úbœ `ywU KYvi ga¨eZ©x `~iZ¡ → 2   AMÖMvgx Zi‡½i Zi½ mÂvjb Ges KYv¸‡jvi ¯ú›`‡bi ga¨eZ©x †KvY → 90  AMÖMvgx Zi‡½i `kv cv_©K¨,  = x 2     `kv cv_©K¨ 2 Gi †ewk n‡Z cv‡i bv| 2 Gi †ewk n‡j 2 we‡qvM Ki‡Z n‡e|  `kv cv_©K¨ 2 Gi ¸wYZK n‡j `kv cv_©K¨ k~Y¨ n‡e|  y = A sin   2 (vt – x) D‡jÐL¨, x Gi mnM me mgq 1 Ki‡Z n‡e|  k‡ãi †eM, v = f  AwZµvšÍ `~iZ¡ , s = N GKB Zi½‰`N©¨ I K¤úvsK wewkó `ywU Zi‡½i wecixZ w`K n‡Z DcwicvZ‡bi m„wó nq|  `ywU wb®ú›` we›`yi ga¨eZ©x `~iZ¡ = 2   GKwU wb¯ú›` I GKwU my¯ú›` we›`yi ga¨eZ©x `~iZ¡ = 4   wZbwU wb®ú›` we›`yi `~iZ¡ =    `~i‡Z¡ `ywU m¯ú›` I `ywU wb¯ú›` we›`y nq|  †Kvb gva¨‡g AwZµvšÍ `~iZ¡, s = N  †hLv‡b, N = K¤úb msL¨v.  = Zi½‰`N©¨  PvKwZ‡Z m„ó k‡ãi K¤úvsK f = N  m  f = 1 2l T m GLv‡b, T = Uvb A_ev ej  = kg/m  cÖ_g Dcmy‡ii †gŠwjK K¤úvsK, f = 1 l T m  `ywU Uvbv Zvi HKZv‡b _vK‡j f1 = f2 nq|  k‡ãi ZxeªZv †j‡fj,  = 10 log 0 I I dB  k‡ãi ZxeªZv †j‡f‡ji cv_©K¨  = 10 log 1 2 I I dB  kã Drm n‡Z `~i‡Z¡i mv‡_ kÖæZ k‡ãi ZxeªZvi m¤úK© e‡M©i e¨v¯ÍvbycvwZK|  Zi½‰`‡N©¨i cv_©K¨ †`Iqv _vK‡j, V2 – V1 = f    K¤úvs‡Ki cv_©K¨ A_©vr weU msL¨v †`Iqv _vK‡j, f2 – f1 = N = V          −  1 2 1 1  `ywU kã Zi‡½i DcwicvZ‡b cÖvq mgvb K¤úvs‡Ki `ywU Zi‡½i DcwicvZ‡b k‡ã ZxeªZvi n«vm e„wׇK exU e‡j| A_©vr GK †m‡K‡Û m„ó exU‡K exU msL¨v e‡j|  exU msL¨v 10 Gi Dc‡i n‡Z cv‡i bv|  f2 = f1  N GKB n‡j (–), wecixZ n‡j (+) Av`k© M¨vm I M¨v‡mi MwZZË¡ IDEAL GAS & KINETIC THEORY OF GASES  P1V1 = P2V2  2 2 2 1 1 1 T V P T V P =  2 2 1 1 T P T P =  2 2 1 1 T V T V =  2 2 2 1 1 1 T P T P  =   PV = 1 3 mnc2 .  PV = nRT = RT M g  E = 2 3 nRT = 2 3 M g RT (†gvU MwZkw³)  E = 2 3 KT (Mo MwZkw³i †¶‡Î)  c = M RT 3  c = M KT 3  c =  P 3  2 1 1 2 1 2 2 1 T T M M C C = =   =  MfxiZv h = (n – 1)  10.2 (n = AvqZ‡bi ¸Y)  MfxiZv h = (n3 – 1)  10.2 (n = e¨vm ev e¨vmv‡a©i ¸Y)  Mo gy³ c_,  = n d 2 1 2  . d = AYyi e¨vm , n = GKK AvqZ‡b AYyi msL¨v  Av‡cw¶K Av`ª©Zv % 100 F f R  = c_ cv_©K¨ wb¯ú›` we›`y my¯ú›` we›`y AMÖMvgx Zi‡½i miY Zi‡½i †eM w¯’i Zi½ wQ`ª N~Y©b k‡ãi AwZµvšÍ `~iZ¡ k‡ãi m„wó Uvbv Zv‡i m„ó k‡ãi K¤úvsK k‡ãi ZxeªZv †j‡fj k‡ãi Zi½‰`N©¨ exU ARvbv kjvKvi K¤úvsK M¨v‡mi †gvU MwZkw³ eM©g~j Mo eM©‡eM wbY©q n«‡`i MfxiZv wbY©q Mogy³ c_ wbY©q Av‡cw¶K Av`ª©Zv wbY©q
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911 ZvcMwZwe`¨v THERMODYNAMICS 1. 9 492 R 5 273 K 9 32 F 5 C − = − = − = 2.1C = F 5 9  3. 5C = 9F = 5K = 9R T = K X X 16 . 273 r         Formula:  = ice stream ice x x x x − −   100 (C) cÖK…Z cvV  ; x = µwUc~Y© _v‡g©vwgUv‡ii cvV  Zvcxq ZworPvjK kw³, E = a + b2 → Drµg ZvcgvÎv, C = – b a → kxZj ms‡hvM¯’‡ji ZvcgvÎv, 0 = OC → wbi‡c¶ ZvcgvÎv, n = 0 + c 2  D”PZv h †`Iqv _vK‡j,  = 428 h  e¯‘i †eM v †`Iqv _vK‡j  = s 2 v 2 P1 V1 = P2V2 → m‡gvò cÖwµqvi †¶‡Î P1V1  = P2V2  T1V1 –1 = T2V2 –1 (i) CP – CV = R (ii)  = V P C C (iii) CP > CV GK cigvYyK CV 3 2 R CP 5 2 R wØ- cigvYyK CV 5 2 R CP 7 2 R eûcigvYyK CV 3R CP 4R 1.  =       − 1 2 T T 1  100% 2.  =       − 1 2 Q Q 1  100%  1 2 1 2 T T Q Q =  KvR W = Q1 Ae¯’vi cwieZ©b n‡j, ds = T ml ZvcgvÎvi cwieZ©b n‡j, ds = ms ln 1 2 T T w¯’i Zwor STATIC ELECTRICITY  Zwor d¬v· t  = Z‡ji †ÿÎdj (S)  Zwor‡ÿÎ (E)  MvD‡mi m~Î t |  =  s q s d E   . 0 hw` 0 = q nq, Z‡e Zwor d¬v·, 0 . = = s s d E    Zwor w؇giæ (Electric Dipole) t Zwor w؇giæi åvgK, l q P 2  = Pv‡R©i cwigvY  `~iZ¡ Zwor w؇giæi Rb¨ Zwor †ÿÎ cÖvej¨, 3 0 4 1 r P E  =  Zwor w؇giæi Rb¨ Zwor wefe, 2 0 cos 4 1 r P Vp    =  Pv‡R©i †Kvqv›Uvqb t cÖK…wZi †Kv‡bv e¯‘i †gvU Pv‡R©i cwigvY n‡e B‡jKUªb ev †cÖvU‡bi Pv‡R©i c~Y© msL¨K ¸wYZK, G‡K Pv‡R©i †Kqv›Uvqb e‡j|  †Kv‡bv e¯‘i PvR©, ne q  = F = 0 4 1   2 2 1 r Q Q        =   2 2 9 0 c / Nm 10 9 4 1 V = r Q . 4 1 0   (†Mvj‡Ki Af¨šÍ‡i I c„‡ô wefe mgvb) V = 9  109        + + + r q r q r q r q 4 3 2 1 V = 9  109  r q 4 [me¸‡jv PvR© mgvb n‡j] e¨vmva© , r = evû 2 = 2 a †K‡›`ª wefe k~b¨ n‡j, 0 q q q q 4 3 2 1 = + + + 2 9 2 r Q . 10 9 r Q . 4 1 E  =  =   ms‡hvM †iLvi ga¨we›`y‡Z jwä wefe: V = 9109 2 / r q q 2 1 +  ms‡hvM †iLvi ga¨we›`y‡Z jwä cÖvej¨: E = 9109 ( )2 2 1 2 / r q q − q1 PvR© n‡Z x `~i‡Z¡ jwä cÖvej¨ k~Y¨ n‡j, x = 1 2 q q 1 r + [hvi ¯^v‡c‡¶ †m wb‡P n‡e]  F = qE F= mg  qE mg =  E = – dr dV  KvR = PvR©  wefe cv_©K¨ ZvcgvÎvi wewfbœ †¯‹j msµvšÍ ˆÎa we›`y msµvšÍ µwUc~Y© _v‡g©vwgUvi msµvšÍ _v‡g©vKvcj/ ZvchyMj iæ×Zvcxq cÖwµqvi †¶‡Î ey‡jU I SiYv msµvšÍ mgm¨v m‡gvò I iƒ×Zvcxq cÖwµqv msµvšÍ w¯’i AvqZb I w¯’i Pvc m¤•wK©Z Kv‡Y©v BwÄb m¤úwK©Z m¤úvw`Z Kv‡Ri cwigvY GbƪwcRwbZ mgm¨v Kzj‡¤^i m~Î †Mvj‡Ki wefe eM©‡¶‡Îi †K‡›`ª wefe Zwor‡¶‡Îi cÖvej¨ ga¨we›`y‡Z jwä Ges wefe cÖvej¨ jwä cÖvej¨ wbY©q Zwor ej I cÖve‡j¨i m¤úK© Zwor cÖvej¨ I wef‡ei m¤úK©
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  ˆe`y¨wZK †¶‡Î (E) I wefe cv_©K¨ (V) g‡a¨ m¤úK©: E = d V  †kªYx mgev‡q Zzj¨ aviKZ¡: CS = (C1 –1 + C2 –1 + C3 –1 .... )–1  mgvšÍivj mgev‡q Zzj¨ aviKZ¡: CP = C1 + C2 + C3 + ....  cwievnxi aviKZ¡: C = V Q  †MvjvKvi cwievnxi aviKZ¡: C= 40 .k r  mgvšÍivj cvZ avi‡Ki aviKZ¡: C = d A K 0   = A Q = 2 r Q  = 2 r 4 Q  (†MvjK n‡j) PvwR©Z avi‡K w¯’wZ kw³: E = C Q 2 1 QV 2 1 CV 2 1 2 2 = = Pj Zwor CURRENT ELECTRICITY  Zwor cÖevn gvÎv: I = t Q  B‡j±ª‡bi Zvob †eM: V = NAe I  †iv‡ai DòZv ¸Yv¼:  = z R R RZ   −  †iv‡ai †kªYx mgevq: Rs = R1 –1 + R2 –1 + R3 –1 + ..... + Rn  †iv‡ai mgvšÍivj mgevq: Rp = (R1 –1 + R2 –1 + R3 –1 + ..... )–1  mgvšÍivj mgev‡qi †¶‡Î, R1 = R2 n‡j, Rp = 2 R1  R1 = 2R2 n‡j, Rp = 3 R1  n msL¨K mggv‡bi †iv‡ai Rb¨ Rs = n2  Rp  GKwU Zvi‡K n ¸b j¤^v Kiv n‡j cwieZx© †iva: R = n2  Av‡Mi †iva  Av‡cw¶K †iva:  = RA L  †iv‡ai Kvjvi †KvW, AB10C [B B R O Y Good Boy Very Good Worker]  `ywU †iv‡ai g‡a¨ Zzjbv Ki‡j, 2 1 2 2 1 2 1 r r L L R R          =  IÕ †gi m~Î: V = IR  Af¨šÍixY †iva hy³ _vK‡j, I = r R E +  ûBU‡÷vb eªxR: S R Q P =  wgUvi eªx‡Ri wbt¯ú›` we›`y: r 100 r Q P − = [r = cm GK‡K n‡e]  Current divider rule: I1 = I R R R 2 1 2  + I2 = I R R R 2 1 1  +  †kªYx mgev‡qi †¶‡Î, 1 1 1 R I V = Ges 2 2 2 R I V =  †Kvb we›`yi we›`y wefe = (eZ©bxi wefe – H we›`yi Av‡Mi †iv‡ai wefe) Zwor cÖev‡ni †PŠ¤^K wµqv I Pz¤^KZ¡ MAGNETIC EFFECT OF CURRENT & MAGNETISM  A¨vw¤úqvi m~Î t  = I dl B 0 .  |  ev‡qvU m¨vfv‡U©i m~‡Îi MvwYwZK iæc: 2 sin r dl l dB    Zwor cÖev‡ni d‡j m¤úbœ KvR W = I2 Rt = VIt = Pt  Zv‡ci hvwš¿K mgZv: J = H W = H VIt  ¶gZv P = VI = R V 2  Zvcxq Zwor”PvjK kw³: E = a + b2  Zwor we‡køl‡b Aegy³ fi: W = ZQ = ZIt  Zwor ivmvqwbK Zzj¨vsK: Z = cvigvbweKfi †hvRbx96500  d¨viv‡Wi m~Î, 2 2 1 1 m W m W =  ZvcgvÎv e„w× n‡j, mst = I2 Rt = VIt = Pt  `ywU †iva †kªYx‡Z hy³ _vK‡j Drcbœ Zv‡ci AbycvZ: 2 1 2 1 R R H H =  `ywU †iva mgvšÍiv‡j _vK‡j Drcbœ Zv‡ci AbycvZ: 1 2 2 1 R R H H =  we`y¨r wej, B = Wb (cÖwZ BDwb‡U LiP) Zzj¨ aviKZ¡ wbY©q avi‡Ki aviKZ¡ Pv‡R©i ZjgvwÎK NbZ¡ avi‡Ki mwÂZ kw³ I1 R1 I I2 R2 R1 R2 R3 V2 V RP I I I2 I3 I1 †iv‡ai mgevq Av‡cw¶K †iva Zzj¨ †iva In‡gi m~‡Îi e¨envi ûBU‡÷vb eªx‡Ri e¨envi wgUvi eªx‡Ri e¨envi eZ©bx m¤úwK©Z mgm¨v Zvob †eM I Zwor cÖevn wbY©q e¨wqZ Zwor kw³ wbY©q Zv‡ci hvwš¿K mgZv Aegy³ fi wbY©q Drcbœ Zv‡ci AbycvZ we`y¨r wej wbY©q
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  cÖevn NbZ¡: J = A I  †PŠ¤^K åvgK m = NIA  M¨vjfv‡bvwgUv‡ii Zwor cÖevn , I = k  C B E 0 0 =  †mvRv cwievnxi wbK‡U †Kvb we›`y‡Z B Gi gvb: B = a 2 I 0    e„ËvKvi cwievnxi †K‡›`ª B Gi gvb: B = r 2 NI 0   MwZkxj Pv‡R©i Dci †PŠ¤^K ej: B V N F  =  †mvRv Zv‡ii Dci †PŠ¤^K ej: B I F  =  sin  `ywU mgvšÍivj Zv‡ii ga¨ w`‡q Zwor cÖevwnZ n‡j, Zv‡`i g‡a¨ wµqvkxj ej: F = r 2 I I 2 1 0     nj wefe cÖv_©K¨: V = Bvd  ¶z`ª eZ©bxi Dci †PŠ¤^K †¶‡Îi UK©: B m B A Ni  =  =   M¨vjfv‡bvwgUv‡ii g‡a¨ w`‡q cÖevwnZ Zwor, Ig = S G S + I  mv‡›Ui †iv‡ai gvb, S = 1 n r − f~-Pz¤^‡Ki AvYyf~wgK Dcvsk: H = B cos f~-Pz¤^‡Ki Dj¤^ Dcvsk: V = B sin webwZ , tan  = H V †gvU cÖvej¨, I = 2 2 H V +  †`vjb g¨vM‡bvwgUv‡i Pz¤^‡Ki †`vjbKvj T = 2 MH I  Ab¨vb¨: tan = H V I = 2 2 V H +  K = H I M = IA Zvwor‡PŠ¤^Kxq Av‡ek I cwieZ©x cÖevn ELECTROMAGNETIC INDUCTION & ALTERNATING CURRENT   = 0 sin t  I = I0 sin t  Mo e‡M©i eM©g~j gvb Irms = 1 2  kxl©gvb  p s s p p s n n I I E E = =  p s E E K =   = – N dB dt   = – M dL1 dt   = – L dI dt  L = I N B   M = 1 1 1 I N  R¨vwgwZK Av‡jvKweÁvb GEOMETRICAL OPTICS 1.  = r i sin sin 2. r i r i sin sin   =  b~¨bZg wePz¨wZi kZ© t 1. b~¨bZg wePz¨wZi †ÿ‡Î 2 / ) ( 2 1 m A i i  + = = n‡e| 2. b~¨bZg wePz¨wZi †ÿ‡Î 2 / 2 1 A r r = = n‡e| ¶xY `„wó‡`i Pkgvi ¶gZv, P = d 1 − `~i`„wó A_©vr eq¯‹‡`i Pkgvi ¶gZv, P = d 1 25 . 0 1 − E  mij AYyex¶Y hš¿/ AvZmx KvP: weea©b, m = f D 1+  b‡fv `~iex¶Y hš¿: (a) ¯^vfvweK †dvKvwms Gi †¶‡Î, b‡ji ˆ`N©¨ L = f0 + fe, weea©b m = fe f0 (b) wbKU we›`y‡Z †dvKvwms L = f0 + D  fe D + fe weea©b m =  f     1 D + 1 fe .  †dvKvm `~iZ¡ f = 2 r  `c©‡Yi mgxKib, u 1 v 1 + = f 1 r 2 =  †dvKvm `~i‡Z¡i mgxKib, f = v u uv +   †Kv‡Yi `ywU `c©‡Yi mvg‡b GKwU e¯‘ ai‡j we¤^ m„wó n‡e, 1 360 n −  =  weea©b m = –   = u v  e¯‘i `~iZ¡, u = f m 1 m   [ev¯Íe = +, Aev¯Íe = –]  DËj `c©Y f = (–), AeZj `c©Y f = (+)  we‡¤^i ˆ`N©¨    − =  f u f cÖevn NbZ¡ I †PŠ¤^K åvgK wbY©q †PŠ¤^K †¶‡Îi gvb wbY©q †PŠ¤^K ej wbY©q nj wefe msµvšÍ mgm¨v mv›U RwbZ mgm¨v Pz¤^‡Ki Dcvs‡ki gvb wbY©q †PŠ¤^‡Ki †`vjbKvj wbY©q kxl©gvb wbY©q UªvÝdigvi RwbZ mgm¨v Avweó Zwor PvjK kw³ wbY©q ¯^Kxq Av‡ek ¸YvsK wbY©q †Pv‡Li ÎæwU RwbZ mgm¨v AYyex¶Y hš¿ RwbZ mgm¨v `c©‡bi mgxKib we‡¤^i AvK…wZi wbY©q msKU †KvY wbY©q
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911   = 1 sinc  B gva¨g ¯^v‡c‡¶ A gva¨†gi cÖwZmiv¼, c a b a c b   =   A gva¨g ¯^v‡c‡¶ B gva¨†gi cÖwZmiv¼, b a b a C C =   wcÖRg Dcv`v‡bi cÖwZmiv¼:  = 2 A sin 2 A sin m  +  miæ wcÖR‡g wePz¨wZ:  = ( – 1) A  weea©b: m = – u v  †j‡Ýi mgxKiY, f 1 u 1 v 1 = +  †j‡Ýi ¶gZv: p = ) m ( f 1  Zzj¨ †j‡Ýi ¶gZv, p = n 3 2 1 p ..... .......... p p p + + + +  n 2 1 f 1 ... .......... f 1 f 1 P + + + =  mgZzj¨ †j‡Ýi †dvKvm `~iZ¡: F = 2 1 2 1 f f f f +   = cÖK…Z MfxiZv AvcvZ MfxiZv  cÖwZwe‡¤^i Ae¯’vb, r 1 u 1 v −  = +   †jÝ cÖ¯‘Z Kvi‡Ki m~Î:         − −  = 2 1 r 1 r 1 ) 1 ( f 1 ‡fŠZ Av‡jvKweÁvb PHYSICAL OPTICS  g¨vjv‡mi m~Î t ÒmgewZ©Z Av‡jv we‡køl‡Ki ga¨ w`‡q Mg‡bi d‡j Gi ZxeªZv mgeZ©K I we‡køl‡Ki wbtmiY Z‡ji ga¨eZ©x †Kv‡Yi cosine Gi e‡M©i mgvbycvwZK|Ó  Av‡jvi ZxeªZv,   2 0 2 2 cos cos I Ka I  =  k~Y¨¯’v‡b Zwor †PŠ¤^Kxq Zi‡½i MwZ‡eM, C =   0 1  c‡qw›Us †f±i H E S     =  E = h  C =   wd‡Rvi c×wZ‡Z Av‡jvi †eM, C = 4mnd  Av‡jvi †eM Ges Gi cÖwZmiv‡¼i g‡a¨ m¤úK©, ab = b a C C  Zi½‰`N©¨ Ges gva¨‡gi cÖwZmiv‡¼i g‡a¨ m¤úK©, ab = b a    Bqs Gi wØwPf cix¶vq m„ó †Wvivi cÖ¯’: x = a nd GLv‡b, n = KZ Zg, d = c`©vi `~iZ¡, a = wPi؇qi e¨veavb  GK wP‡oi Rb¨ AceZ©b; a sin  = n GLv‡b, a = f P‡ii cÖ¯’,  = AceZ©b †Kvb  †Kw›`ªq Pi‡gi [Dfq ¯ú‡k©] n Zg n = KZ Zg  Ae‡gi †KŠwbK `~iZ¡ = 2  m‡e©v”P Ae‡gi msL¨v wbY©‡qi †¶‡Î sin = 1 n‡e|  †MÖwUs aªæe‡Ki Rb¨ AceZ©b:  =  n sin N 1  `kv cv_©K¨ =   2  c_ cv_©K¨ (`kv cv_©K¨ 2 A_ev 2 (`yB Gi) ¸wYZK n‡Z cv‡i bv)  A gva¨g mv‡c‡¶ B gva¨‡gi cÖwZmivsK, b a b a C C =  AvaywbK c`v_©weÁv‡bi m~Pbv INTRODUCTION TO MODERN PHYSICS  AvBb÷vB‡bi Av‡jvK Zwor mgxKiY t 0 2 2 1 W hf mv − = 0 W = Kvh© A‡cÿK| `¨ eªMwj Zi½, ] [ mv P mv h p h = =  =     K¤úUb cÖfve, ) cos 1 ( ) cos 1 ( 0        − =   − =  = −  c c m h  nvB‡Rbev‡M©i AwbðqZv bxwZ t h P x h P x        . 2 .   Av‡cw¶K ˆ`N©¨ , L = Lo  2 2 c v 1−  Av‡cw¶K fi , m = 2 2 c v 1 m −   Av‡cw¶K mgq , t = 2 2 c v 1 t −   MwZkxj KvVv‡gvi †eM, v = c  2 ) 1 ( 1  −  b‡fvPvixi eZ©gvb eqm = Av‡Mi eqm + ågbKvj  2 c v 1       −  fi kw³ iƒcvšÍi m~Î, E = mc2  K…òe¯‘i †¶‡Î, CS = S R gm 2 cigvYyi g‡Wj Ges wbDwK¬qvi c`v_©weÁvb ATOM MODEL & NUCLEAR PHYSICS  fi ÎæwU t M Nm Zm m n p − + =  ) (  eÜb kw³ t 2 mc E  =  ‡ZRw¯ŒqZvi ÿqm~Î t N dt dN N dt dN N dt dN  − =  −    − †ZRw¯Œq iƒcvšÍi mgxKiY t t Oe N N  − =  Aa©vqy 2 1 T =  693 . 0 [ = ¶q-aªæeK] Av‡cw¶K fi, ˆ`N©¨, mgq wbY©q MwZkxj KvVv‡gvi †eM wbY©q kw³i iƒcvšÍi cÖwZmiv¼ wbY©q wcÖRg RwbZ mgm¨v †j‡Ýi †dvKvm `~iZ¡ wbY©q †j‡Ýi ¶gZv wbY©q cÖwZmiv¼ RwbZ mgm¨v cÖwZmiv¼ wbY©q Zi‡½i †eM I kw³ wbY©q wPi RwbZ mgm¨v `kv cv_©K¨ I c_ cv_©K¨ Aewkó cigvYyi fi
SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  Aa©vqy 2 1 T = InN InN t 693 . 0 0 −  A¶Z ev Aewkó cigvbyi fi: N = N0 t e  −  N = N0 (0.5) 2 1 T t  Mo Avqy ,  =  1 = 693 . 0 T  H cigvYyi n K¶ c‡_i kw³ En = eV n 6 . 13 2 −  H cigvYyi n K¶c‡_i e¨vmva© rn = n2  0.53  A  AvcwZZ Av‡jvK kw³ Kvh©v‡c¶‡Ki Zzjbvq †ewk n‡j,  hf = 0 + Ek f = h 10 6 . 1 ) E ( 19 k −   +   wewKwiZ Av‡jvi K¤úv¼, f = h 10 6 . 1 ) E E ( 19 1 2 −   −  − e Gi `yB cÖv‡šÍ V wefe w`‡j, − e Gi MwZkw³ E = − e V  wbe„wZ wefe Vs Gi †¶‡Î, V e mv 2 1 2 =  v = m eV 2 ‡mwgKÛv±i I B‡jKUªwb· SEMICONDUCTOR & ELECTRONICS  MZxq †iva t I V R   =  cxU cÖevn, C B E I I I + =  cÖevn jvf ,  = B C I I   =  −  1  weea©b ¸YK ,  = E C I I    MZxq †iva, R = I V   kw³¯Í‡ii kw³ I e¨vmva© wbY©q K¤úv¼ wbY©q wKQz K_v... wcÖq D”Pgva¨wgK I fwZ© cÖZ¨vkx wk¶v_©xiv, GBP.Gm.wm cix¶vi c‡iB †Zvgv‡`i D”P wk¶v AR©‡bi Avkvq AeZxY© n‡Z nq wek¦we`¨vjq fwZ© hy‡×|BwÄwbqvwis e‡jv Avi cvewjK wek¦we`¨vjq,fwZ© cix¶vq c`v_©weÁvb †Zv me †¶‡ÎB Avek¨K|Avi c`v_©weÁv‡b m‡e©v”P cÖ¯‘wZi Rb¨ cÖ‡qvRb mg‡qi m‡e©v”P mبenvi Ges mwVK w`Kwb‡`©kbv|c`v_©weÁv‡b fv‡jv wcÖcv‡ikb †bqvi Rb¨ kU©KvU †Kv‡bv dg©zjv †bB| c`v_©weÁv‡b fv‡jv cÖ¯‘wZi Rb¨ Rvb‡Z nq A‡bK wKQz, eyS‡Z nq Zvi‡P‡q †Xi †ewk| Avgvi `xN© mg‡qi GKv‡WwgK I GWwgkb cov‡bvi AwfÁZv †_‡K †Zvgv†`i‡K c`v_©weÁv‡b m‡e©v”P cÖ¯‘wZi wbðqZv w`‡Z Avwg wbqwgZ †Póv K‡i hvw”Q|c`v_©weÁv‡bi LyuwUbvwU Rvb‡Z I wkL‡Z AvMÖnx Ges c`v_©weÁv‡b m‡e©v”P cÖ¯‘wZi mv‡_ mvdj¨ cÖZ¨vkx‡`i ÒSHADATH’S PHYSICS CAREÓ G ¯^vMZg| ïfKvgbvq, bvRgym mv`vZ c`v_©weÁvb wWwmwc-b Lyjbv wek¦we`¨vjq wmwbqi wk¶K, BUET&Varsity Mission.
01725-176911 SHADATH'S SPECIAL PHYSICS CARE GBP.Gm.wmGKv‡WwgK,BwÄwbqvwisIfvwm©wUGWwgkbc`v_©weÁv‡bi†mive¨vP c`v_©weÁvb'im~Îvewj BUET&VARSITYMISSION'iwmwbqiwk¶KbvRgymmv`vZfvBqv'i Lyjbv'i e¨vPt wcwUAvB †gvo,Lyjbv wet`ªt evmvq MÖ“c K‡i covi mxwgZ my‡hvM Av‡Q|

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Accounting Chapter 10 Lecture 01
 

HSC & Admission Physics All Formula PDF

  • 2. †fŠZRMr I cwigvc  হলে শতকরা ত্রুটি এখালে, যেল াে পূর্ণসংখযা বা ভগ্াংশ যেল াে পূর্ণসংখযা বা ভগ্াংশ  Q P R    + = †f±‡ii †hvM, we‡qvM Ges gvb wbY©q • ( ) ( ) ( )k̂ z B z A j ˆ y B y A î x B x A B A  +  +  = →  → • k̂ A ĵ A î A R Z y x + + =  GKwU †f±i ivwk n‡j, Gi gvb, 2 z 2 y 2 x A A A R + + =  GKK †f±i wbY©q • R  Gi w`‡K GKK †f±i, | R | R r̂   = • → A I B → Gi j¤^w`‡K GKK †f±i,  =  A B A B → → → →   †f±i ¸Yb • B . A   = AB cos  = AxBx + AyBy + AzBz • B A    = AB sin  = z y x z y x B B B A A A k̂ ĵ î  1 k̂ . k̂ ĵ . ĵ î . î = = = Ges 0 k̂ k̂ ĵ ĵ î î =  =  =   k̂ ĵ î =  , ĵ î k̂ =  , î k̂ ĵ =  , k̂ î ĵ − =  †f±i ¸b‡bi cÖ‡qvM • A  I B  †f±iØq j¤^ n‡j AxBx + AyBy + AzBz = 0 • A  I B  ‡f±iØq mgvšÍivj n‡j z z y y x x B A B A B A = = †f±‡ii ga¨eZ©x †KvY wbY©q • cos  = AB B . A   • cos = AB B A B A B A z z y y x x + + A‡¶i mv‡_ Drcbœ †Kv‡Yi †¶Î, x = cos–1           + + 2 Z 2 y 2 x A A A Ges y = cos–1           + + 2 Z 2 y 2 x A A A z = cos–1           + + 2 z 2 y 2 x A A A Awf‡¶cwbY©q • A  eivei B  Gi Awf‡¶c = A B . A   mvgvšÍwi‡Ki m~Î • jwä, R =  + + cos PQ 2 Q P 2 2 jwäi †KvY,  = tan–1  +  cos Q P sin Q • → A I → B †Kvb mvgvšÍwiK A_ev i¤^‡mi mwbœwnZ evû n‡j Z‡e mvgvšÍwiK ev i¤^‡mi †¶Îdj = → →  B A • → A I → B †Kvb mvgvšÍwiK A_ev i¤^‡mi KY© n‡j Z‡e mvgvšÍwiK ev i¤^‡mi †¶Îdj = → →  B A 2 1  Need To Know: 1.  = 0n‡j, R = P + Q, hv jwäi m‡e©v”P gvb| 2.  = 180n‡j, R = P  Q hv jwäi ¶z`ªZg gvb| 3.  = 90n‡j, R = 2 2 Q P + 4. R2 max + R2 min = 2R2 90 5. wZbwU ej †Kv‡bv we›`y‡Z fvimvg¨ m„wó Ki‡j G‡`i †h‡Kvb `yBwUi jwä AciwU n‡e| 6. P = Q n‡j Ges ej؇qi jwä †h †Kvb e‡ji mgvb n‡j  = 120 7. P = Q n‡j Ges ej؇qi jwä †h †Kvb e‡ji wظY n‡j  = 0 8. P = Q n‡j Ges ej؇qi jwä †h †Kvb e‡ji A‡a©K n‡j  = 151 9. P = Q n‡j R = 2Pcos 2  Dcvs‡k wefvRb • j¤^fv‡e wefvR‡bi †¶‡Î, • Avbyf~wgK Dcvsk, X  = R cos  • Dj¤^ Dcvsk, Y  = R sin  MwZwe`¨v(DYNAMICS) s = ut v2 = u2 + 2 a s v = u  at s =       V0 + V 2 t a = t u ~ v V = 2 v u + t Zg †m‡K‡Û AwZµvšÍ `~iZ¡, Sth = u + ( ) 1 2 2 1 − t a a = t t m n m n S S t t − − , S(t+1)Zg = StZg + a  †eM, v = dt ds Z¡iY, a = dt dv = 2 2 dt s d  x `~iZ¡ †f` Kivi ci Gi †eM n 1 Ask nviv‡j, ¸wjwU AviI s `~iZ¡ †f` Ki‡j s = x n2 – 1  x `~iZ¡ cÖ‡e‡k‡i ci †eM A‡a©K n‡j, `~iZ¡ hv‡e, s = 3 x  x `~iZ¡ cÖ‡e‡k‡i ci †eM GK-Z…Zxqvsk n‡j, `~iZ¡ hv‡e, s = 8 x  GKwU ivB‡d‡ji ¸wj GKwU Z³v‡K †f` Ki‡Z cv‡i| ¸wji †eM v ¸Y Kiv n‡j Z³vi msL¨v n‡e, n = v2 Ges ¸wjwU n msL¨K Z³v †f` Ki‡j †eM n‡e v = n ¸Y| P  A Q  B C Q P R    + = O A B X  Y  R   C  î -Gi mnM ŷ -Gi mnM ẑ -Gi mnM AwZµvšÍ `~iZ¡ mgxKiY msµvšÍ mgm¨v Z³vi mgm¨v cošÍ e¯‘i MwZi mgxKiY MwZi mgxKiY msµvšÍ mgm¨v
  • 3. 2 gt 2 1 ut h  = 2 gt 2 1 h = [Avbyf~wgK w`‡K gvi‡j] 2 gt 2 1 ut h + − = [h D”PZv n‡Z Dj¤^ eivei gvi‡j] hth = 2 1 g(2t-1) h D”PZv †_‡K GKwU e¯‘‡K wb‡P †d‡j w`‡j Ges GKB mg‡q GKwU e¯‘‡K u †e‡M Dc‡i wb‡¶c Ki‡j, wgwjZ nevi mgq, t = u h Ges wgwjZ nevi ¯’vb, h 2 ) u h ( g 2 1 h − = v2 = u2  2gh hth= u  2 1 g(2t-1) H = ut  2 1 gt2 V = u  gt m‡e©v”P D”PZv †_‡K bvg‡Z mgq g u t = m‡ev©”P D”PZvq DV‡Z mgq g u t = wePiYKvj g u 2 T = m‡e©v”P D”PZv g 2 u H 2 = f~wgi mv‡_  †Kv‡b Ges Dj¤^ eivei gvi‡j (i) cvjøv, R = g 2 sin v o 2 o  (ii) MwZ c‡_i mgxt y = bx-cx2 (iii) m‡e©v”Pcvjøv Rmax = g v2 o (iv) m‡e©v”P D”PZv, H = g 2 sin V o 2 2 o  (v) wePiY Kvj, T = g sin v 2 o o   g‡b ivL‡Z n‡e: = 45°n‡j R = Rmax = g u2 = 90°n‡j H = Hmax = g 2 u2 = 76°n‡j R = H n‡e|  GKwU wbw¶ß e¯‘i †h †Kvb mg‡q Zvr¶wbK †e‡Mi AwfgyL ¯úk©K eivei|  H max = 2 Rmax  = 45°n‡j H = 4 R  cÖ‡¶c‡KvY  n‡j tan = R T 9 . 4 2  GKB Avw`‡e‡M `yywU e¯‘i Avbyf~wgK cvjøv mgvb n‡e hw` wb‡¶c †KvY  Ges AciwU (90°- ) nq|  f~wg n‡Z wbw¶ß cÖv‡mi †¶‡Î Avbyf~wgK eivei Z¡i‡Yi gvb k~Y¨| h D”PZv n‡Z Avbyf~wgK eivei gviv n‡j, Avbyf‚wgK fv‡e wbw¶ß e¯‘i MwZi mgxKi‡Yi †¶‡Î 2 y 2 x v v v + = x y v v tan =  2 gt 2 1 h = s = ut cÖw¶ß e¯‘i MwZi mgxKi‡Yi †¶‡Î †e‡Mi Dj¤^ AskK, vy = v0sin0 – gt. †e‡Mi Avbyf‚wgK AskK, vx = v0cos0 h= – usinot + 1 2 gt2 Vy = – u sin 0+ gt. †K›`ªgyLx Z¡i‡Yi †¶‡Î a = r r v 2 2  = =       2 T 2  =       2N t 2  †K›`ªgyLx ej, F = m2 r wbDUwbqvb ejwe`¨v NEWTONIAN MECHANICS ❑ ˆiwLK I †KŠwYK MwZi g‡a¨ mv`„k¨: ˆiwLK †KŠwYK S  = 2πN V = t s / v = r  = t  = t N  2 a = r  m I F = ma  = I ˆiwLK †KŠwYK S = vt  = t →mg‡KŠwYK S = vt 2 1  = 2 1 t →GKwU †eM k~Y¨ n‡j S = 2 2 1 at  = 2 2 1 t  P = Fv P =  Ek = 2 2 1 mv Ek = 2 1 I2 fi‡e‡Mi wbZ¨Zvi m~Î, 2 2 1 1 v m v m = e›`y‡Ki cðvr †eM V, e›`y‡Ki fi M, ¸wji †eM v, ¸wji fi m n‡j, MV + mv = 0 wbw¶ß e¯‘i MwZi mgxKiY D”PZvi mgxKiY  u h s u h= 2 gt 2 1 s=ut u1 u sin   cÖvm RwbZ mgm¨v wbw¶ß e¯‘i MwZi mgxKiY cÖw¶ß e¯‘i MwZi mgxKiY †K›`ªgyLx Z¡iY RwbZ mgm¨v fi‡e‡Mi wbZ¨Zvi m~Î
  • 4. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911 cðvr †eM V, †bŠKvi fi M, Av‡ivnxi †bŠKvi †eM v Ges Av‡ivnxi fi m n‡j, MV + mv = 0 fi‡eM P= Ft = m (v-u) = mv ej F = ma = m ( ) t u v − ( ) ( ) u v m t t F 1 2 − = − e‡ji NvZ    J Ft mv mu = = − m1u1 + m2u2 = m1v1 + m2v2 (G‡Ki AwaK e¯‘i g‡a¨ msNl© nq Zvn‡jI G m~Î cÖ‡hvR¨) wgwjZ e¯‘i †eM, v = 2 1 2 2 1 1 m m u m u m +  [GKB w`K †_‡K G‡m av°v †L‡j (+), wecixZ w`K n‡j (-)] (i) DaŸ©Mvgx wjd‡Ui †¶‡Î: R = m (g + f) (ii) wbgœMvgx wjd‡Ui †¶‡Î: R = m (g – f)  MwZkw³ Ek = m 2 p mv 2 1 2 2 = → MwZkw³ n ¸b Ki‡Z n‡j eZ©gvb †eM v2 = v1 n  w¯’Z Nl©Y ¸YvsK, s Fs R = s tan = k = tan-1 (k) i‡K‡Ui †¶‡Î, DaŸ©gyLx av°v ev ej, F = Vr . dt dm wb‡¶‡ci mgq i‡K‡Ui Dci cÖhy³ jwä ej = Vr g m dt dm 0 − GLv‡b mo = i‡K‡Ui †gvU fi| i‡K‡Ui Dci wµqvkxj jwäZ¡iY, g dt dm m v a r −       = i‡K‡Ui Zvr¶wYK Z¡iY, g t m M r V a −  =       → AvbZ Zj eivei gv‡e©j ev †MvjK AvK…wZi e¯‘ Mwo‡q co‡j †gvU kw³ Ek = 2 10 7 mv n e¨vmv‡a©i myZvi mvnv‡h¨ m f‡ii cv_i‡K e„ËvKvi c‡_ Nyiv‡j myZvi Dci Uvb ev †K›`ª wegyLx ej, F = r mv2 = m2 r r ˆ`‡N©¨i myZvi mvnv‡h¨ evjwZ‡Z cvwb wb‡q KZ †e‡M Nyiv‡j evjwZ n‡Z cvwb co‡e bv, †m‡ÿ‡Î v = rg n‡e| †KŠwbK †eM,  =  t = 2N t ‰iwLK †eM, v = r  m f‡ii cv_i‡K r ˆ`‡N©¨i myZvi mvnv‡h¨ Nyiv‡j, I = mr2 (evwl©K)  m f‡ii I r e¨vmv‡a©i GKwU †MvjK‡K wbR A‡¶i mv‡c‡¶ Nyiv‡j I = 2 5 2 mr (AvwüK)  c„w_exi AvwüK MwZi Rb¨ c„w_exi RoZvi åvgK I = 2 5 2 MR (R = c„w_exi e¨vmva©)  evwl©K MwZi Rb¨ c„w_exi RoZvi åvgK, I = 2 Mr ( r = m~h© n‡Z c„w_exi `~iZ¡)  r e¨vmv‡a©i wis‡K wbR A‡¶i mv‡c‡¶ Nyiv‡j, I = mr2  PvKwZ wbR A‡¶i mv‡c‡¶ Nyiv‡j, I = 2 2 1 mr  wb‡iU wmwjÛvi‡K wbR A‡¶i mv‡c‡¶ Nyiv‡j, I = 2 2 1 mr  m fi I l ˆ`‡N©¨i `Û‡K gvS eivei Dj¤^ A‡¶i mv‡c‡¶ Nyiv‡j = 2 12 1 ml Ges GKcÖv‡šÍi mv‡c‡¶ Nyiv‡j, I = 3 2 ml  iv¯Ívi evuK, rg v tan 2 =  KvR, kw³ I ÿgZv WORK, ENERGY & POWER  MwZkw³, Ek = 1 2 mv2  w¯’wZkw³, Ep = mgh  f‚wg n‡Z x D”PZvq MwZkw³, w¯’wZkw³i n ¸Y n‡j D”PZv, x = h n + 1  KvR W F S FS cos = =   .  = Pt mgh mv 2 1 2 = =  ¶gZv, t W P = = t mgh = t mv 2 1 2  ¶gZv, Fv t S . F t W P = = =  GKwU ivB‡d‡ji ¸wj wbw`©ó cyiæ‡Z¡i GKwU Z³v †f` Ki‡Z cv‡i| Giæc n wU Z³v †f` Ki‡Z n‡j ¸wji †eM n‡e n ¸Y|  n msL¨K BU‡K hv‡`i cÖ‡Z¨‡Ki D”PZv h GKwUi Dci Av‡iKwU †i‡L ¯Í¤¢ ˆZwi Ki‡Z K…ZKvR, W = mgh n(n – 1) 2  nvZzwo Dj¤^fv‡e †c‡iK‡K AvNvZ Ki‡j, W=mg (h +x) NvZ ej RwbZ mgm¨v wgwjZ e¯‘i MwZ RwbZ mgm¨v wjd&U RwbZ mgm¨v MwZkw³ wbY©q Nl©Y ¸YvsK RwbZ mgm¨v i‡K‡Ui MwZ RwbZ mgm¨v †Mvj‡Ki †gvU MwZkw³ wbY©q †K›`ªgyLx ej msµvšÍ mgm¨v †KŠwYK †eM msµvšÍ ˆiwLK I †KŠwYK †e‡Mi m¤úK© RoZvi åvgK hvbevnb I iv¯Ívi evuK msµvšÍ mgm¨v MwZkw³ I w¯’wZkw³ wbY©q KvR I ¶gZv wbY©q K…ZKvR RwbZ mgm¨v
  • 5. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  nvZzwo Avbyf‚wgKfv‡e †c‡iK‡K AvNvZ Ki‡j, W= 1 2 mv2  cvwb c~Y© Kzqv Lvwj Ki‡Z W = mgh [Mo D”PZv 2 h ]  Dc‡ii A‡a©K cvwb †Zvjv n‡j, 4 h h =   A‡a©K c~Y© Kzqvi m¤ú~Y© cvwb †Zvjv n‡j, 4 h 3 h =   `¶Zv  me©`v p Gi mv‡_ ¸b nq|  e›`y‡Ki ¸wji †¶‡Î, S . F mv 2 1 2 =  MwZ kw³, EK = m 2 P2  KvR kw³ Dccv`¨,       − = 2 2 mu 2 1 mv 2 1 W  cvwb †g‡N cwiYZ n‡Z K…ZKvR, gh A gh v mgh W  =  = = l  Dj¤^ eivei f~wg n‡Z x D”PZvq EpI Ek  MwZkw³ wefe kw³i A‡a©K n‡j, x = 3 h 2  MwZ kw³ wefe kw³i wظb¸Y n‡j, x = 3 h gnvKl© I AwfKl© GRAVIATION & GRAVITY gnvKl© ej, F = 2 2 1 d m Gm AwfKl©ej, 2 R GMm mg F = = f‚-c„‡ô AwfKl©R Z¡iY, 2 R GM g = = G R  3 4 c„w_exi fi, M = gR G 2 c„w_exi NbZ¡,   = 3 4 g GR h D”PZvq Z¡iY, 2 h h R R g g       + = D”PZv, h = R 1 w w R 1 g g 1 1         − =         − h MfxiZvq Z¡iY       − = R h R g gd mylg Nb‡Z¡ `ywU MÖ‡ni Rb¨ → g  R A_©vr , 2 1 2 1 R R g g = `ywU MÖ‡ni fi mgvb n‡j → g  2 R 1 A_©vr , 2 1 2 2 1 R R g g         = p e 2 e p p e p e W W R R M M g g =          = K…wÎg DcMÖ‡ni ˆiwLK †eM v = GM R + h = R = g R + h K…wÎg DcMÖ‡ni †eM I AveZ©b Kv‡ji g‡a¨ m¤úK© v = 2 T (R + h) f‚w¯’i DcMÖ‡ni AveZ©b Kvj, T = 2 r3/2 R g gyw³‡eM, v= gR 2 = R GM 2 gnvKl©xq wefe, V = R GM − gnvKl©xq cÖvej¨, 2 r GM E = †Kcjv‡ii Z…Zxq m~Î t 3 2 R 2 2 T 3 1 R 2 1 T = c`v‡_©i MvVwbK ag© STRUCTURAL PROPERTIES MATTER w¯’wZ¯’vcK ¸YvsK wbY©q  ˆ`N©¨ weK…wZ = l L  AvqZb weK…wZ = V v  Amn cxob = Amn ej †¶Îdj = F A  Bqs Gi w¯’wZ¯’vcK ¸YvsK, l l 2 r mgL A FL Y  = =  AvqZb ¸YvsK, K FV Av = = v PV [P = Pvc = A F ] w¯’wZkw³ MwZkw³ x h-x mgq h–x h x Ep = mgx Ek= mg (h- x) K‚c RwbZ mgm¨v MwZkw³ I K…ZKv‡Ri m¤úK© Dj¤^ eivei w¯’wZkw³ I MwZkw³ gnvKl© I AwfKl© ej wbY©q AwfKl©R Z¡iY, c„w_exi fi I NbZ¡ wbY©q c„w_exi wewfbœ ¯’v‡b AwfKl©R Z¡iY `ywU MÖ‡ni fi I NbZ¡ RwbZ mgm¨v K…wÎg DcMÖ‡ni †eM I AveZ©b Kvj gyw³‡eM, gnvKl©xq wefe I cªvej¨ wbY©q
  • 6. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  AvqZb ¸YvsK, K =  PV  cqm‡bi AbycvZ,  = Ld D l  Y Y i r r i = l l Y = 2n (1+)  Y = 3k (1-2) û‡Ki m~Î: cxob weK…wZ = aªæe  w¯’wZ¯’vcK w¯’wZkw³ ev †gvU kw³, W YA L =  1 2 2 l  GKK AvqZ‡b w¯’wZkw³ E = 1 2  cxob  weK…wZ = AL F 2 1 l   cvwbi c„ôUvb, L F T =  e¯‘i IRb, W= cøeZv (F1) + mv›`ªej (F2)  c„ôUv‡bi Dci ZvcgvÎvq cÖfve, T = To (1– t)  Zi‡ji c„ôUvb, ( )  +  = cos 2 3 r h g r T =   cos 2 g rh = 2 g rh  cvwbi †j‡f‡ji cv_©K¨,         −  =  2 1 r 1 r 1 g T 2 h  mv›`ªej: F A dv dx =  [cÖ‡kœ †Zj D‡jø¨L _vK‡j]  mv›`ªZvsK:  =       F A       dx dv  †÷vK‡mi m~Î: F = 6r  M¨v‡mi †¶‡Î ZvcgvÎvi mv‡_ mv›`ªZvsK 2 1 2 1 T T =    †Mvj‡Ki cÖvšÍ †eM, ( )   −  = 9 g 2 r 2 V  AwZwi³ Pvc, r T 4 P =  †gvU w¯’wZkw³ t E = TA  c„ôkw³ e„w×, E = AT = 4 (Nr2 -R2 )  T  mvev‡bi ey`ey‡`i †¶‡Î, E = 24(Nr2 -R2 )T ch©ve„wËK MwZ PERIODIC MOTION  T = g L 2 = 2 m k = 2 e g  1 2 2 1 g g T T = [hw` L AcwiewZ©Z _v‡K]  2 1 2 1 L L T T = [hw` g AcwiewZ©Z _v‡K]  cwiewZ©Z †`vjbKvj wbY©q, 86400 86400 T T 1 2   =  †eM V =  2 2 x A −  Z¡iY a = –2 x  m‡e©v”P †eM Vmax = A  m‡e©v”P Z¡iY amax = 2 A  miY; x = A sin(t + )  †`vjbKvj T =   2  †KŠwYK †eM  = k m  d2 x dt2 + 2 x = 0  w¯cÖs Gi mgm¨v: ej F = mg = kx → k wbY©q K…ZKvR W = ( ) 2 1 2 2 2 x x k 2 1 kx 2 1 − = †`vjbKvj  = 2 T K M = g x 2  w¯cÖs Gi ej aªæeK x mg K =  †gvU kw³ = 1 2 m2 A2  cvnv‡oi D”PZv wbY©q: R h R T T 1 2 + = †`vjK GKw`‡b †¯øv/dv÷ n‡j, R h R 86400 86400 + =   Zi½ WAVE  †hgb : cvwb‡Z m„ó †XD, Zvwor †PŠ¤^K ˆ`N©¨ → wØgvwÎK  Zi½P~ov n‡Z Zi½P~ovi `~iZ¡ →   mg`kv m¤úbœ `ywU KYvi ga¨eZ©x `~iZ¡ →  GKw`‡b slow ev fast mgq| †`vjbKvj m¤úK©xZ mgm¨v cwiewZ©Z †`vjbKvj wbY©q m‡e©v”P †eM I Z¡iY w¯cÖs RwbZ mgm¨v cvnv‡oi D”PZv wbY©q AbycÖ¯’ Zi½ w¯’wZ¯’vcK ¸YvsK I cqm‡bi Abycv‡Zi g‡a¨ m¤úK© w¯’wZkw³ wbY©q cvwbi c„ôUvb wbY©q †KŠwkK b‡j cvwbi Av‡ivnb wbY©q mv›`ªZvsK wbY©q cÖvšÍ‡eM I c„ôkw³ e„w× wbY©q
  • 7. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  wecixZ `kv m¤úbœ `ywU KYvi ga¨eZ©x `~iZ¡ → 2   AMÖMvgx Zi‡½i Zi½ mÂvjb Ges KYv¸‡jvi ¯ú›`‡bi ga¨eZ©x †KvY → 90  AMÖMvgx Zi‡½i `kv cv_©K¨,  = x 2     `kv cv_©K¨ 2 Gi †ewk n‡Z cv‡i bv| 2 Gi †ewk n‡j 2 we‡qvM Ki‡Z n‡e|  `kv cv_©K¨ 2 Gi ¸wYZK n‡j `kv cv_©K¨ k~Y¨ n‡e|  y = A sin   2 (vt – x) D‡jÐL¨, x Gi mnM me mgq 1 Ki‡Z n‡e|  k‡ãi †eM, v = f  AwZµvšÍ `~iZ¡ , s = N GKB Zi½‰`N©¨ I K¤úvsK wewkó `ywU Zi‡½i wecixZ w`K n‡Z DcwicvZ‡bi m„wó nq|  `ywU wb®ú›` we›`yi ga¨eZ©x `~iZ¡ = 2   GKwU wb¯ú›` I GKwU my¯ú›` we›`yi ga¨eZ©x `~iZ¡ = 4   wZbwU wb®ú›` we›`yi `~iZ¡ =    `~i‡Z¡ `ywU m¯ú›` I `ywU wb¯ú›` we›`y nq|  †Kvb gva¨‡g AwZµvšÍ `~iZ¡, s = N  †hLv‡b, N = K¤úb msL¨v.  = Zi½‰`N©¨  PvKwZ‡Z m„ó k‡ãi K¤úvsK f = N  m  f = 1 2l T m GLv‡b, T = Uvb A_ev ej  = kg/m  cÖ_g Dcmy‡ii †gŠwjK K¤úvsK, f = 1 l T m  `ywU Uvbv Zvi HKZv‡b _vK‡j f1 = f2 nq|  k‡ãi ZxeªZv †j‡fj,  = 10 log 0 I I dB  k‡ãi ZxeªZv †j‡f‡ji cv_©K¨  = 10 log 1 2 I I dB  kã Drm n‡Z `~i‡Z¡i mv‡_ kÖæZ k‡ãi ZxeªZvi m¤úK© e‡M©i e¨v¯ÍvbycvwZK|  Zi½‰`‡N©¨i cv_©K¨ †`Iqv _vK‡j, V2 – V1 = f    K¤úvs‡Ki cv_©K¨ A_©vr weU msL¨v †`Iqv _vK‡j, f2 – f1 = N = V          −  1 2 1 1  `ywU kã Zi‡½i DcwicvZ‡b cÖvq mgvb K¤úvs‡Ki `ywU Zi‡½i DcwicvZ‡b k‡ã ZxeªZvi n«vm e„wׇK exU e‡j| A_©vr GK †m‡K‡Û m„ó exU‡K exU msL¨v e‡j|  exU msL¨v 10 Gi Dc‡i n‡Z cv‡i bv|  f2 = f1  N GKB n‡j (–), wecixZ n‡j (+) Av`k© M¨vm I M¨v‡mi MwZZË¡ IDEAL GAS & KINETIC THEORY OF GASES  P1V1 = P2V2  2 2 2 1 1 1 T V P T V P =  2 2 1 1 T P T P =  2 2 1 1 T V T V =  2 2 2 1 1 1 T P T P  =   PV = 1 3 mnc2 .  PV = nRT = RT M g  E = 2 3 nRT = 2 3 M g RT (†gvU MwZkw³)  E = 2 3 KT (Mo MwZkw³i †¶‡Î)  c = M RT 3  c = M KT 3  c =  P 3  2 1 1 2 1 2 2 1 T T M M C C = =   =  MfxiZv h = (n – 1)  10.2 (n = AvqZ‡bi ¸Y)  MfxiZv h = (n3 – 1)  10.2 (n = e¨vm ev e¨vmv‡a©i ¸Y)  Mo gy³ c_,  = n d 2 1 2  . d = AYyi e¨vm , n = GKK AvqZ‡b AYyi msL¨v  Av‡cw¶K Av`ª©Zv % 100 F f R  = c_ cv_©K¨ wb¯ú›` we›`y my¯ú›` we›`y AMÖMvgx Zi‡½i miY Zi‡½i †eM w¯’i Zi½ wQ`ª N~Y©b k‡ãi AwZµvšÍ `~iZ¡ k‡ãi m„wó Uvbv Zv‡i m„ó k‡ãi K¤úvsK k‡ãi ZxeªZv †j‡fj k‡ãi Zi½‰`N©¨ exU ARvbv kjvKvi K¤úvsK M¨v‡mi †gvU MwZkw³ eM©g~j Mo eM©‡eM wbY©q n«‡`i MfxiZv wbY©q Mogy³ c_ wbY©q Av‡cw¶K Av`ª©Zv wbY©q
  • 8. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911 ZvcMwZwe`¨v THERMODYNAMICS 1. 9 492 R 5 273 K 9 32 F 5 C − = − = − = 2.1C = F 5 9  3. 5C = 9F = 5K = 9R T = K X X 16 . 273 r         Formula:  = ice stream ice x x x x − −   100 (C) cÖK…Z cvV  ; x = µwUc~Y© _v‡g©vwgUv‡ii cvV  Zvcxq ZworPvjK kw³, E = a + b2 → Drµg ZvcgvÎv, C = – b a → kxZj ms‡hvM¯’‡ji ZvcgvÎv, 0 = OC → wbi‡c¶ ZvcgvÎv, n = 0 + c 2  D”PZv h †`Iqv _vK‡j,  = 428 h  e¯‘i †eM v †`Iqv _vK‡j  = s 2 v 2 P1 V1 = P2V2 → m‡gvò cÖwµqvi †¶‡Î P1V1  = P2V2  T1V1 –1 = T2V2 –1 (i) CP – CV = R (ii)  = V P C C (iii) CP > CV GK cigvYyK CV 3 2 R CP 5 2 R wØ- cigvYyK CV 5 2 R CP 7 2 R eûcigvYyK CV 3R CP 4R 1.  =       − 1 2 T T 1  100% 2.  =       − 1 2 Q Q 1  100%  1 2 1 2 T T Q Q =  KvR W = Q1 Ae¯’vi cwieZ©b n‡j, ds = T ml ZvcgvÎvi cwieZ©b n‡j, ds = ms ln 1 2 T T w¯’i Zwor STATIC ELECTRICITY  Zwor d¬v· t  = Z‡ji †ÿÎdj (S)  Zwor‡ÿÎ (E)  MvD‡mi m~Î t |  =  s q s d E   . 0 hw` 0 = q nq, Z‡e Zwor d¬v·, 0 . = = s s d E    Zwor w؇giæ (Electric Dipole) t Zwor w؇giæi åvgK, l q P 2  = Pv‡R©i cwigvY  `~iZ¡ Zwor w؇giæi Rb¨ Zwor †ÿÎ cÖvej¨, 3 0 4 1 r P E  =  Zwor w؇giæi Rb¨ Zwor wefe, 2 0 cos 4 1 r P Vp    =  Pv‡R©i †Kvqv›Uvqb t cÖK…wZi †Kv‡bv e¯‘i †gvU Pv‡R©i cwigvY n‡e B‡jKUªb ev †cÖvU‡bi Pv‡R©i c~Y© msL¨K ¸wYZK, G‡K Pv‡R©i †Kqv›Uvqb e‡j|  †Kv‡bv e¯‘i PvR©, ne q  = F = 0 4 1   2 2 1 r Q Q        =   2 2 9 0 c / Nm 10 9 4 1 V = r Q . 4 1 0   (†Mvj‡Ki Af¨šÍ‡i I c„‡ô wefe mgvb) V = 9  109        + + + r q r q r q r q 4 3 2 1 V = 9  109  r q 4 [me¸‡jv PvR© mgvb n‡j] e¨vmva© , r = evû 2 = 2 a †K‡›`ª wefe k~b¨ n‡j, 0 q q q q 4 3 2 1 = + + + 2 9 2 r Q . 10 9 r Q . 4 1 E  =  =   ms‡hvM †iLvi ga¨we›`y‡Z jwä wefe: V = 9109 2 / r q q 2 1 +  ms‡hvM †iLvi ga¨we›`y‡Z jwä cÖvej¨: E = 9109 ( )2 2 1 2 / r q q − q1 PvR© n‡Z x `~i‡Z¡ jwä cÖvej¨ k~Y¨ n‡j, x = 1 2 q q 1 r + [hvi ¯^v‡c‡¶ †m wb‡P n‡e]  F = qE F= mg  qE mg =  E = – dr dV  KvR = PvR©  wefe cv_©K¨ ZvcgvÎvi wewfbœ †¯‹j msµvšÍ ˆÎa we›`y msµvšÍ µwUc~Y© _v‡g©vwgUvi msµvšÍ _v‡g©vKvcj/ ZvchyMj iæ×Zvcxq cÖwµqvi †¶‡Î ey‡jU I SiYv msµvšÍ mgm¨v m‡gvò I iƒ×Zvcxq cÖwµqv msµvšÍ w¯’i AvqZb I w¯’i Pvc m¤•wK©Z Kv‡Y©v BwÄb m¤úwK©Z m¤úvw`Z Kv‡Ri cwigvY GbƪwcRwbZ mgm¨v Kzj‡¤^i m~Î †Mvj‡Ki wefe eM©‡¶‡Îi †K‡›`ª wefe Zwor‡¶‡Îi cÖvej¨ ga¨we›`y‡Z jwä Ges wefe cÖvej¨ jwä cÖvej¨ wbY©q Zwor ej I cÖve‡j¨i m¤úK© Zwor cÖvej¨ I wef‡ei m¤úK©
  • 9. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  ˆe`y¨wZK †¶‡Î (E) I wefe cv_©K¨ (V) g‡a¨ m¤úK©: E = d V  †kªYx mgev‡q Zzj¨ aviKZ¡: CS = (C1 –1 + C2 –1 + C3 –1 .... )–1  mgvšÍivj mgev‡q Zzj¨ aviKZ¡: CP = C1 + C2 + C3 + ....  cwievnxi aviKZ¡: C = V Q  †MvjvKvi cwievnxi aviKZ¡: C= 40 .k r  mgvšÍivj cvZ avi‡Ki aviKZ¡: C = d A K 0   = A Q = 2 r Q  = 2 r 4 Q  (†MvjK n‡j) PvwR©Z avi‡K w¯’wZ kw³: E = C Q 2 1 QV 2 1 CV 2 1 2 2 = = Pj Zwor CURRENT ELECTRICITY  Zwor cÖevn gvÎv: I = t Q  B‡j±ª‡bi Zvob †eM: V = NAe I  †iv‡ai DòZv ¸Yv¼:  = z R R RZ   −  †iv‡ai †kªYx mgevq: Rs = R1 –1 + R2 –1 + R3 –1 + ..... + Rn  †iv‡ai mgvšÍivj mgevq: Rp = (R1 –1 + R2 –1 + R3 –1 + ..... )–1  mgvšÍivj mgev‡qi †¶‡Î, R1 = R2 n‡j, Rp = 2 R1  R1 = 2R2 n‡j, Rp = 3 R1  n msL¨K mggv‡bi †iv‡ai Rb¨ Rs = n2  Rp  GKwU Zvi‡K n ¸b j¤^v Kiv n‡j cwieZx© †iva: R = n2  Av‡Mi †iva  Av‡cw¶K †iva:  = RA L  †iv‡ai Kvjvi †KvW, AB10C [B B R O Y Good Boy Very Good Worker]  `ywU †iv‡ai g‡a¨ Zzjbv Ki‡j, 2 1 2 2 1 2 1 r r L L R R          =  IÕ †gi m~Î: V = IR  Af¨šÍixY †iva hy³ _vK‡j, I = r R E +  ûBU‡÷vb eªxR: S R Q P =  wgUvi eªx‡Ri wbt¯ú›` we›`y: r 100 r Q P − = [r = cm GK‡K n‡e]  Current divider rule: I1 = I R R R 2 1 2  + I2 = I R R R 2 1 1  +  †kªYx mgev‡qi †¶‡Î, 1 1 1 R I V = Ges 2 2 2 R I V =  †Kvb we›`yi we›`y wefe = (eZ©bxi wefe – H we›`yi Av‡Mi †iv‡ai wefe) Zwor cÖev‡ni †PŠ¤^K wµqv I Pz¤^KZ¡ MAGNETIC EFFECT OF CURRENT & MAGNETISM  A¨vw¤úqvi m~Î t  = I dl B 0 .  |  ev‡qvU m¨vfv‡U©i m~‡Îi MvwYwZK iæc: 2 sin r dl l dB    Zwor cÖev‡ni d‡j m¤úbœ KvR W = I2 Rt = VIt = Pt  Zv‡ci hvwš¿K mgZv: J = H W = H VIt  ¶gZv P = VI = R V 2  Zvcxq Zwor”PvjK kw³: E = a + b2  Zwor we‡køl‡b Aegy³ fi: W = ZQ = ZIt  Zwor ivmvqwbK Zzj¨vsK: Z = cvigvbweKfi †hvRbx96500  d¨viv‡Wi m~Î, 2 2 1 1 m W m W =  ZvcgvÎv e„w× n‡j, mst = I2 Rt = VIt = Pt  `ywU †iva †kªYx‡Z hy³ _vK‡j Drcbœ Zv‡ci AbycvZ: 2 1 2 1 R R H H =  `ywU †iva mgvšÍiv‡j _vK‡j Drcbœ Zv‡ci AbycvZ: 1 2 2 1 R R H H =  we`y¨r wej, B = Wb (cÖwZ BDwb‡U LiP) Zzj¨ aviKZ¡ wbY©q avi‡Ki aviKZ¡ Pv‡R©i ZjgvwÎK NbZ¡ avi‡Ki mwÂZ kw³ I1 R1 I I2 R2 R1 R2 R3 V2 V RP I I I2 I3 I1 †iv‡ai mgevq Av‡cw¶K †iva Zzj¨ †iva In‡gi m~‡Îi e¨envi ûBU‡÷vb eªx‡Ri e¨envi wgUvi eªx‡Ri e¨envi eZ©bx m¤úwK©Z mgm¨v Zvob †eM I Zwor cÖevn wbY©q e¨wqZ Zwor kw³ wbY©q Zv‡ci hvwš¿K mgZv Aegy³ fi wbY©q Drcbœ Zv‡ci AbycvZ we`y¨r wej wbY©q
  • 10. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  cÖevn NbZ¡: J = A I  †PŠ¤^K åvgK m = NIA  M¨vjfv‡bvwgUv‡ii Zwor cÖevn , I = k  C B E 0 0 =  †mvRv cwievnxi wbK‡U †Kvb we›`y‡Z B Gi gvb: B = a 2 I 0    e„ËvKvi cwievnxi †K‡›`ª B Gi gvb: B = r 2 NI 0   MwZkxj Pv‡R©i Dci †PŠ¤^K ej: B V N F  =  †mvRv Zv‡ii Dci †PŠ¤^K ej: B I F  =  sin  `ywU mgvšÍivj Zv‡ii ga¨ w`‡q Zwor cÖevwnZ n‡j, Zv‡`i g‡a¨ wµqvkxj ej: F = r 2 I I 2 1 0     nj wefe cÖv_©K¨: V = Bvd  ¶z`ª eZ©bxi Dci †PŠ¤^K †¶‡Îi UK©: B m B A Ni  =  =   M¨vjfv‡bvwgUv‡ii g‡a¨ w`‡q cÖevwnZ Zwor, Ig = S G S + I  mv‡›Ui †iv‡ai gvb, S = 1 n r − f~-Pz¤^‡Ki AvYyf~wgK Dcvsk: H = B cos f~-Pz¤^‡Ki Dj¤^ Dcvsk: V = B sin webwZ , tan  = H V †gvU cÖvej¨, I = 2 2 H V +  †`vjb g¨vM‡bvwgUv‡i Pz¤^‡Ki †`vjbKvj T = 2 MH I  Ab¨vb¨: tan = H V I = 2 2 V H +  K = H I M = IA Zvwor‡PŠ¤^Kxq Av‡ek I cwieZ©x cÖevn ELECTROMAGNETIC INDUCTION & ALTERNATING CURRENT   = 0 sin t  I = I0 sin t  Mo e‡M©i eM©g~j gvb Irms = 1 2  kxl©gvb  p s s p p s n n I I E E = =  p s E E K =   = – N dB dt   = – M dL1 dt   = – L dI dt  L = I N B   M = 1 1 1 I N  R¨vwgwZK Av‡jvKweÁvb GEOMETRICAL OPTICS 1.  = r i sin sin 2. r i r i sin sin   =  b~¨bZg wePz¨wZi kZ© t 1. b~¨bZg wePz¨wZi †ÿ‡Î 2 / ) ( 2 1 m A i i  + = = n‡e| 2. b~¨bZg wePz¨wZi †ÿ‡Î 2 / 2 1 A r r = = n‡e| ¶xY `„wó‡`i Pkgvi ¶gZv, P = d 1 − `~i`„wó A_©vr eq¯‹‡`i Pkgvi ¶gZv, P = d 1 25 . 0 1 − E  mij AYyex¶Y hš¿/ AvZmx KvP: weea©b, m = f D 1+  b‡fv `~iex¶Y hš¿: (a) ¯^vfvweK †dvKvwms Gi †¶‡Î, b‡ji ˆ`N©¨ L = f0 + fe, weea©b m = fe f0 (b) wbKU we›`y‡Z †dvKvwms L = f0 + D  fe D + fe weea©b m =  f     1 D + 1 fe .  †dvKvm `~iZ¡ f = 2 r  `c©‡Yi mgxKib, u 1 v 1 + = f 1 r 2 =  †dvKvm `~i‡Z¡i mgxKib, f = v u uv +   †Kv‡Yi `ywU `c©‡Yi mvg‡b GKwU e¯‘ ai‡j we¤^ m„wó n‡e, 1 360 n −  =  weea©b m = –   = u v  e¯‘i `~iZ¡, u = f m 1 m   [ev¯Íe = +, Aev¯Íe = –]  DËj `c©Y f = (–), AeZj `c©Y f = (+)  we‡¤^i ˆ`N©¨    − =  f u f cÖevn NbZ¡ I †PŠ¤^K åvgK wbY©q †PŠ¤^K †¶‡Îi gvb wbY©q †PŠ¤^K ej wbY©q nj wefe msµvšÍ mgm¨v mv›U RwbZ mgm¨v Pz¤^‡Ki Dcvs‡ki gvb wbY©q †PŠ¤^‡Ki †`vjbKvj wbY©q kxl©gvb wbY©q UªvÝdigvi RwbZ mgm¨v Avweó Zwor PvjK kw³ wbY©q ¯^Kxq Av‡ek ¸YvsK wbY©q †Pv‡Li ÎæwU RwbZ mgm¨v AYyex¶Y hš¿ RwbZ mgm¨v `c©‡bi mgxKib we‡¤^i AvK…wZi wbY©q msKU †KvY wbY©q
  • 11. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911   = 1 sinc  B gva¨g ¯^v‡c‡¶ A gva¨†gi cÖwZmiv¼, c a b a c b   =   A gva¨g ¯^v‡c‡¶ B gva¨†gi cÖwZmiv¼, b a b a C C =   wcÖRg Dcv`v‡bi cÖwZmiv¼:  = 2 A sin 2 A sin m  +  miæ wcÖR‡g wePz¨wZ:  = ( – 1) A  weea©b: m = – u v  †j‡Ýi mgxKiY, f 1 u 1 v 1 = +  †j‡Ýi ¶gZv: p = ) m ( f 1  Zzj¨ †j‡Ýi ¶gZv, p = n 3 2 1 p ..... .......... p p p + + + +  n 2 1 f 1 ... .......... f 1 f 1 P + + + =  mgZzj¨ †j‡Ýi †dvKvm `~iZ¡: F = 2 1 2 1 f f f f +   = cÖK…Z MfxiZv AvcvZ MfxiZv  cÖwZwe‡¤^i Ae¯’vb, r 1 u 1 v −  = +   †jÝ cÖ¯‘Z Kvi‡Ki m~Î:         − −  = 2 1 r 1 r 1 ) 1 ( f 1 ‡fŠZ Av‡jvKweÁvb PHYSICAL OPTICS  g¨vjv‡mi m~Î t ÒmgewZ©Z Av‡jv we‡køl‡Ki ga¨ w`‡q Mg‡bi d‡j Gi ZxeªZv mgeZ©K I we‡køl‡Ki wbtmiY Z‡ji ga¨eZ©x †Kv‡Yi cosine Gi e‡M©i mgvbycvwZK|Ó  Av‡jvi ZxeªZv,   2 0 2 2 cos cos I Ka I  =  k~Y¨¯’v‡b Zwor †PŠ¤^Kxq Zi‡½i MwZ‡eM, C =   0 1  c‡qw›Us †f±i H E S     =  E = h  C =   wd‡Rvi c×wZ‡Z Av‡jvi †eM, C = 4mnd  Av‡jvi †eM Ges Gi cÖwZmiv‡¼i g‡a¨ m¤úK©, ab = b a C C  Zi½‰`N©¨ Ges gva¨‡gi cÖwZmiv‡¼i g‡a¨ m¤úK©, ab = b a    Bqs Gi wØwPf cix¶vq m„ó †Wvivi cÖ¯’: x = a nd GLv‡b, n = KZ Zg, d = c`©vi `~iZ¡, a = wPi؇qi e¨veavb  GK wP‡oi Rb¨ AceZ©b; a sin  = n GLv‡b, a = f P‡ii cÖ¯’,  = AceZ©b †Kvb  †Kw›`ªq Pi‡gi [Dfq ¯ú‡k©] n Zg n = KZ Zg  Ae‡gi †KŠwbK `~iZ¡ = 2  m‡e©v”P Ae‡gi msL¨v wbY©‡qi †¶‡Î sin = 1 n‡e|  †MÖwUs aªæe‡Ki Rb¨ AceZ©b:  =  n sin N 1  `kv cv_©K¨ =   2  c_ cv_©K¨ (`kv cv_©K¨ 2 A_ev 2 (`yB Gi) ¸wYZK n‡Z cv‡i bv)  A gva¨g mv‡c‡¶ B gva¨‡gi cÖwZmivsK, b a b a C C =  AvaywbK c`v_©weÁv‡bi m~Pbv INTRODUCTION TO MODERN PHYSICS  AvBb÷vB‡bi Av‡jvK Zwor mgxKiY t 0 2 2 1 W hf mv − = 0 W = Kvh© A‡cÿK| `¨ eªMwj Zi½, ] [ mv P mv h p h = =  =     K¤úUb cÖfve, ) cos 1 ( ) cos 1 ( 0        − =   − =  = −  c c m h  nvB‡Rbev‡M©i AwbðqZv bxwZ t h P x h P x        . 2 .   Av‡cw¶K ˆ`N©¨ , L = Lo  2 2 c v 1−  Av‡cw¶K fi , m = 2 2 c v 1 m −   Av‡cw¶K mgq , t = 2 2 c v 1 t −   MwZkxj KvVv‡gvi †eM, v = c  2 ) 1 ( 1  −  b‡fvPvixi eZ©gvb eqm = Av‡Mi eqm + ågbKvj  2 c v 1       −  fi kw³ iƒcvšÍi m~Î, E = mc2  K…òe¯‘i †¶‡Î, CS = S R gm 2 cigvYyi g‡Wj Ges wbDwK¬qvi c`v_©weÁvb ATOM MODEL & NUCLEAR PHYSICS  fi ÎæwU t M Nm Zm m n p − + =  ) (  eÜb kw³ t 2 mc E  =  ‡ZRw¯ŒqZvi ÿqm~Î t N dt dN N dt dN N dt dN  − =  −    − †ZRw¯Œq iƒcvšÍi mgxKiY t t Oe N N  − =  Aa©vqy 2 1 T =  693 . 0 [ = ¶q-aªæeK] Av‡cw¶K fi, ˆ`N©¨, mgq wbY©q MwZkxj KvVv‡gvi †eM wbY©q kw³i iƒcvšÍi cÖwZmiv¼ wbY©q wcÖRg RwbZ mgm¨v †j‡Ýi †dvKvm `~iZ¡ wbY©q †j‡Ýi ¶gZv wbY©q cÖwZmiv¼ RwbZ mgm¨v cÖwZmiv¼ wbY©q Zi‡½i †eM I kw³ wbY©q wPi RwbZ mgm¨v `kv cv_©K¨ I c_ cv_©K¨ Aewkó cigvYyi fi
  • 12. SHADATH’S PHYSICS CARE Academic and Admission Physics Solution Contact: 01725176911  Aa©vqy 2 1 T = InN InN t 693 . 0 0 −  A¶Z ev Aewkó cigvbyi fi: N = N0 t e  −  N = N0 (0.5) 2 1 T t  Mo Avqy ,  =  1 = 693 . 0 T  H cigvYyi n K¶ c‡_i kw³ En = eV n 6 . 13 2 −  H cigvYyi n K¶c‡_i e¨vmva© rn = n2  0.53  A  AvcwZZ Av‡jvK kw³ Kvh©v‡c¶‡Ki Zzjbvq †ewk n‡j,  hf = 0 + Ek f = h 10 6 . 1 ) E ( 19 k −   +   wewKwiZ Av‡jvi K¤úv¼, f = h 10 6 . 1 ) E E ( 19 1 2 −   −  − e Gi `yB cÖv‡šÍ V wefe w`‡j, − e Gi MwZkw³ E = − e V  wbe„wZ wefe Vs Gi †¶‡Î, V e mv 2 1 2 =  v = m eV 2 ‡mwgKÛv±i I B‡jKUªwb· SEMICONDUCTOR & ELECTRONICS  MZxq †iva t I V R   =  cxU cÖevn, C B E I I I + =  cÖevn jvf ,  = B C I I   =  −  1  weea©b ¸YK ,  = E C I I    MZxq †iva, R = I V   kw³¯Í‡ii kw³ I e¨vmva© wbY©q K¤úv¼ wbY©q wKQz K_v... wcÖq D”Pgva¨wgK I fwZ© cÖZ¨vkx wk¶v_©xiv, GBP.Gm.wm cix¶vi c‡iB †Zvgv‡`i D”P wk¶v AR©‡bi Avkvq AeZxY© n‡Z nq wek¦we`¨vjq fwZ© hy‡×|BwÄwbqvwis e‡jv Avi cvewjK wek¦we`¨vjq,fwZ© cix¶vq c`v_©weÁvb †Zv me †¶‡ÎB Avek¨K|Avi c`v_©weÁv‡b m‡e©v”P cÖ¯‘wZi Rb¨ cÖ‡qvRb mg‡qi m‡e©v”P mبenvi Ges mwVK w`Kwb‡`©kbv|c`v_©weÁv‡b fv‡jv wcÖcv‡ikb †bqvi Rb¨ kU©KvU †Kv‡bv dg©zjv †bB| c`v_©weÁv‡b fv‡jv cÖ¯‘wZi Rb¨ Rvb‡Z nq A‡bK wKQz, eyS‡Z nq Zvi‡P‡q †Xi †ewk| Avgvi `xN© mg‡qi GKv‡WwgK I GWwgkb cov‡bvi AwfÁZv †_‡K †Zvgv†`i‡K c`v_©weÁv‡b m‡e©v”P cÖ¯‘wZi wbðqZv w`‡Z Avwg wbqwgZ †Póv K‡i hvw”Q|c`v_©weÁv‡bi LyuwUbvwU Rvb‡Z I wkL‡Z AvMÖnx Ges c`v_©weÁv‡b m‡e©v”P cÖ¯‘wZi mv‡_ mvdj¨ cÖZ¨vkx‡`i ÒSHADATH’S PHYSICS CAREÓ G ¯^vMZg| ïfKvgbvq, bvRgym mv`vZ c`v_©weÁvb wWwmwc-b Lyjbv wek¦we`¨vjq wmwbqi wk¶K, BUET&Varsity Mission.