Categories
- Pharmacy
- Nursing
-
MBA
-
BBA
- U.P. State University
- Veer Bahadur Singh Purvanchal University, Jaunpur
- Chaudhary Charan Singh University, Meerut
- Dr. Bhimrao Ambedkar University, Agra
- Chhatrapati Shahu Ji Maharaj University, Kanpur
- Mahatma Jyotiba Phule Rohilkhand University, Bareilly
- Mahatma Gandhi Kashi Vidyapith, Varanasi
- Dr. Ram Manohar Lohia Avadh University, Ayodhya
- Deen Dayal Upadhyaya Gorakhpur University
- Prof. Rajendra Singh (Rajju Bhaiya) University, Prayagraj
- BCA
-
B Ed
- Lucknow University B.Ed Books
- Chaudhary Charan Singh University/Maa Shakambhari University, Saharanpur
- Dr Bhim Rao Ambedkar University, Agra
- Mahatma Gandhi Kashi Vidyapeeth, Varanasi
- Chhatrapati Shahu Ji Maharaj University
- Prof. Rajendra Singh (Rajju Bhaiya) University, Prayagraj (PRSU)
- Mahatma Jyotiba Phule Rohilkhand University(Mjpru), Bareilly
- Dr. Ram Manohar Lohia Avadh University, Ayodhya
- Bundelkhand University, Jhansi
- Deen Dayal Upadhyaya Gorakhpur University
- Veer Bahadur Purvanchal University (VBPU)
- Maharaja Suhel Dev State University ,Azamgarh (MSDSU)
- Raja Mahendra Pratap Singh State University, Aligarh (RMPSSU)
- Barkatullah Vishwavidyalaya (Bhopal)
- Jiwaji University (Gwalior)
- Vikram University (Ujjain)
- Dr. Harisingh Gour University (Sagar)
- Devi Ahilya Vishwavidyalaya (Indore)
- Rani Durgavati Vishwavidyalaya (Jabalpur)
- Awadhesh Pratap Singh University (Rewa)
- Maharaja Chhatrasal Bundelkhand University (Chhatarpur)
- D. EL. ED
- TET
-
B Com
-
B Sc
- B.Sc. U.P. State Universities Common Syllabus NEP
- Veer Bahadur Singh Purvanchal University, Jaunpur
- University of Lucknow
- Chaudhary Charan Singh University, Meerut
- Madhya Pradesh
- Chhatrapati Shahu Ji Maharaj University, Kanpur
- Dr. Bhimrao Ambedkar University, Agra
- Mahatma Gandhi Kashi Vidyapith, Varanasi
- DEEN DAYAL UPADHYAYA GORAKHPUR UNIVERSITY
- Prof. Rajendra Singh (Rajju Bhaiya) University, Prayagraj
- Dr. Ram Manohar Lohia Avadh University, Ayodhya
- Mahatma Jyotiba Phule Rohilkhand University, Bareilly
- Uttarakhand State Universities
- B.Sc. Bihar Universities Common Syllabus NEP
- University of Rajasthan (Jaipur)
- Haryana
-
B A
- B.A. Of U.P. State Universities Common Syllabus NEP
- Veer Bahadur Singh Purvanchal University, Jaunpur
- University of Lucknow
- Chaudhary Charan Singh University, Meerut
- Chhatrapati Shahu Ji Maharaj University, Kanpur
- Dr. Bhimrao Ambedkar University, Agra
- Mahatma Gandhi Kashi Vidyapith, Varanasi
- Deen Dayal Upadhyaya Gorakhpur University
- Prof. Rajendra Singh (Rajju Bhaiya) University, Prayagraj
- Dr. Ram Manohar Lohia Avadh University, Ayodhya
- Mahatma Jyotiba Phule Rohilkhand University, Bareilly
- Madhya Pradesh
- Uttarakhand
- Bihar
- University of Rajasthan (Jaipur Syllabus as Per NEP2020)
- Haryana NEP-2020
- B Tech
ORDINARY DIFFERENTIAL EQUATIONS ( साधारण अवकल समीकरण ) Book B.Sc 3rd Sem Bihar

Buy Latest Mathematics Paper 2 ORDINARY DIFFERENTIAL EQUATIONS (साधारण अवकल समीकरण) ( Major/Minor) Book in Bilingual Edition ( Both English and Hindi ) for B.Sc 3rd Semester Uniform Syllabus for all Universities of Bihar As Per NEP 2020 By Thakur Publication. Written by Experienced Authors | Fast & All India Delivery |
AUTHORS : Dr. Harjit kumar , Dr. Abdul Basar , Prof. Rameshwer Shah
ISBN : 978-93-6180-553-0
₹240.00
Tax excluded
Buy Latest Mathematics Paper 2 ORDINARY DIFFERENTIAL EQUATIONS (साधारण अवकल समीकरण) ( Major/Minor) Book in Bilingual Edition ( Both English and Hindi ) for B.Sc 3rd Semester Uniform Syllabus for all Universities of Bihar As Per NEP 2020 By Thakur Publication. Written by Experienced Authors | Fast & All India Delivery |
AUTHORS : Dr. Harjit kumar , Dr. Abdul Basar , Prof. Rameshwer Shah
ISBN : 978-93-6180-553-0
Syllabus
Ordinary Differential Equations
Course Code: MJC-04
Major
Unit
|
Subject
|
No. of Lectures
|
1
|
Formulation of Differential equations and its order and degree, General, Particular and Singular solutions of differential equations, variables separable, Equations reducible to variables separable, Homogeneous differential equations, Equations reducible to homogeneous form, Exact differential equations and equations reducible to the exact form, Linear differential equations and equations reducible to linear form, Bernoulli equation. |
10
|
2
|
Differential equations of first order but not of first degree, Singular solutions, Clairaut’s form, Orthogonal Trajectories of family of curves, Wronskian and its properties, Linear differential equation of order greater than one with constant coefficients, Cauchy- Euler Equation, Legendre’s Linear Equation. |
10
|
3
|
Second order linear differential equations with variable coefficients: Use of a known solution to find another, normal form, method of undetermined coefficient, variation of parameters, Total differential equation in three variables, Simultaneous differential equations. |
10
|
4
|
Definition of Laplace transform, Existence Theorem, Formulas and Properties of Laplace transform, Laplace transform of special functions viz: Dirac’s delta, Unit step, Periodic, Bessel, Error functions, Inverse Laplace transform, Formulas and Properties of inverse Laplace transform, Convolution theorem, Solution of ordinary differential equation using Laplace transform. |
10
|
ikB~;Øe
lk/kkj.k vody lehdj.k
Course Code: MJC-04
Major
bdkbZ
|
fo"k;
|
No. of Lectures
|
1
|
vody lehdj.kksa rFkk bldh dksfV vody ,oa ?kkr dk lw=hdj.k] vody lehdj.kksa dk O;kid gy]fof’k"V gy] fofp= gy] pj fo;ksT;] fo;ksT; pj esa lekus; lehdj.k] ltkrh; vody lehdj.k] le?kkr :i esa lekus; lehdj.k] ;FkkrFk ¼;FkkFkZ½ vody lehdj.k] ;FkkFkZ :i ds fy, lekus; lehdj.k] jSf[kd vody lehdj.k rFkk jSf[kd :i esa lekus; lehdj.k] cjukSyh dk lehdj.kA |
10
|
2
|
çFke dksfV dk vody lehdj.k ysfdu çFke ?kkr dk ugha] fofp= gy]Dysjks ds :i] oØksa ds lewg dk yacdks.kh; ç{ksioØ] ozksfULd;u rFkk mlds xq.k] vpj xq.kkadksa ds lkFk ,d ls vf/kd dksfV ds jSf[kd vody lehdj.k] dkS'kh&vkW;yj lehdj.k] yhtsaMªs dk jSf[kd lehdj.kA |
10
|
3
|
pj xq.kkad okys f}rh; dksfV ds jSf[kd vody lehdj.k& Kkr gy dk mi;ksx djds vU; gy dks Kkr djuk] lkekU; :Ik] vfuèkkZfjr xq.kkadksa dh fofèk] Ákpy fopj.k fofèk] rhu pjksa esa dqy vody lehdj.k] ;qxir vody lehdj.kksaA |
10
|
4
|
ykIykl :ikarj.k dh ifjHkk"kk] ykIykl :ikarj.k] ykIykl :ikarj.k ds çxq.k rFkk lw=] dqN fo'ks"k Qyu dk ykIykl :ikarj.k tSls& fMjkd MsYVk] ,dinh] vkorZ] csly] =qfV Qyu] çfrykse ykIykl :ikarj.k] çfrykse ykIykl :ikarj.k ds çxq.k rFkk lw=] laoyu çes;, ykIykl :ikarj.k dk mi;ksx djds Lkk/kkj.k vody lehdj.kksa dk gyA |
10
|
Syllabus
Ordinary Differential Equations
Course Code: MIC-04
Minor
Unit
|
Subject
|
No. of Lectures
|
1
|
Formulation of Differential equations and its order and degree, General, Particular and Singular solutions of differential equations, variables separable, Equations reducible to variables separable, Homogeneous differential equations, Equations reducible to homogeneous form, Exact differential equations and equations reducible to the exact form, Linear differential equations and equations reducible to linear form, Bernoulli equation. |
10
|
2
|
Differential equations of first order but not of first degree, Singular solutions, Clairaut’s form, Linear differential equation of order greater than one with constant coefficients, Cauchy-Euler Equation, Legendre’s Linear Equation. |
10
|
3
|
Second order linear differential equations with variable coefficients: Use of a known solution to find another, normal form, method of undetermined coefficient, variation of parameters, Total differential equation in three variables, Simultaneous differential equations. |
10
|
ikB~;Øe
lk/kkj.k vody lehdj.k
Course Code: MIC-04
Minor
bdkbZ
|
fo"k;
|
No. of Lectures
|
1
|
vody lehdj.kksa rFkk bldh dksfV vody ,oa ?kkr dk lw=hdj.k] vody lehdj.kksa dk O;kid gy]fof’k"V gy] fofp= gy] pj fo;ksT;] fo;ksT; pj esa lekus; lehdj.k] ltkrh; vody lehdj.k] le?kkr :i esa lekus; lehdj.k] ;FkkrFk ¼;FkkFkZ½ vody lehdj.k] ;FkkFkZ :i ds fy, lekus; lehdj.k] jSf[kd vody lehdj.k rFkk jSf[kd :i esa lekus; lehdj.k] cjukSyh dk lehdj.kA |
10
|
2
|
çFke dksfV dk vody lehdj.k ysfdu çFke ?kkr dk ugha] fofp= gy] Dysjks ds :i] vpj xq.kkadksa ds lkFk ,d ls vf/kd dksfV ds jSf[kd vody lehdj.k] dkS'kh&vkW;yj lehdj.k] yhtsaMªs dk jSf[kd lehdj.kA |
10
|
3
|
pj xq.kkad okys f}rh; dksfV ds jSf[kd vody lehdj.k& Kkr gy dk mi;ksx djds vU; gy dks Kkr djuk] lkekU; :Ik] vfuèkkZfjr xq.kkadksa dh fofèk] Ákpy fopj.k fofèk] rhu pjksa esa dqy vody lehdj.k] ;qxir vody lehdj.kksaA |
10
|
Bihar NEP2020/B.Sc (Bilingual)/3/04
49 Items
New product