Basaveshwar Science college started in the year 1945. The Department of Mathematics of our college came in to existence in the same year. Since 1945 the Department has been striving to impart the knowledge of Mathematics at UG level to the aspirants of the entire north Karnataka.
Shri.Moghe, the first lecturer in the Mathematics department served for a short period and he was succeeded by Shri. Brahmanda Rao who also left. In June 1946, Shri.R.Gopalan (Madras) was joined as lecturer in the Mathematics Department. Prof. R.Gopalan served 34 years as a H.O.D of Mathematics (1946-1980). In June 1955 introducing the degree classes, one more lecturer shri.D.R.Hardi was appointed. In the year 1967, Basaveshwar Science College was bifurcated from Arts College and Department of Mathematics started its work in the present building . From the year 1967 college was run both PU and degree classes, so that day by day increasing in the students strength. Therefore, number of teaching faculty increased Prof. Shetty worked for a short period. Later Prof.S.B.Tippa (1960-1995), Prof. M.C.Inglagavi (1967-1997) and Prof. T.B. Chilakwad (1969-1998) served in the department.
Prof.R.Gopalan was retired on March 1980.after his retirement, Prof. S.B. Tippa became HOD of Mathematics and he has played vital role in the development and strengthening the department. then he promoted as a principal in the year 1989 and worked in the college till their retirement. Then Prof. M.C.Inglagavi became HOD of the department and he also promoted as a principal and work in the college till their retirement. Then Prof. T.B. Chilakwad became HOD of the department and he also promoted as a principal and worked in the college till their retirement.
Shri. S.A.Bhusanurmath was appointed in the year 1992. At present, he is working as a Associate Professor and H.O.D of Mathematics. Shri. S. B. Bhandari was appointed in the year 2003. At present he is working as a Assistant Professor.
Smt. V.V.Wali, Miss. Reshma Pawar, Mr. Kartik Desai and Smt. Ashwini Kengangutti are working as lecturers in the Mathematics department .
ROLL OF HOD’S |
||
1. | Prof. R. Gopalan | 1944-1980 |
2. | Prof. S. B. Tippa | 1980-1989 |
3. | Prof. M.C. Ingalagavi | 1989-1993 |
4. | Prof. T. B. Chilakawad | 1993-1997 |
5. | Prof.S.A.Bhusanurmath | 1997- Present |
• The main objective of the discipline is to introduce and expose the Subject to the Students of Rural and urban area.
• Mathematics is an integral part of almost all science subjects. Our main objective is to make understand the subject thoroughly and at the same time interesting.
• To teach fundamentals of Mathematics.
• To expose and create an atmosphere among the students imbibe the innovative ideas.
• Courses Offered:
• Under Graduate (B.Sc)
• Post Graduate (M.Sc): Post Graduate Course has been introduced in the year 2010.
• Built up area of the department –221 sq.ft
• MATLAB Laboratory -01
• Desktop computers -17
• MATLAB soft ware -17
• Laptop – 01
• Water filter-01
• Printer-01
• Fusion hole Almar-01
• Mathematician photos -16
• Mathematical Charts -06
• Mathematical wooden Geometrical models -12
• Mathematical Geometrical models -16
• Total Books in the Department Library -110
• Total Books in the main Library – 5776
• Total Mathematics journals – 05
• Internet Connectivity (Wi-Fi)
• Q-Bank
• Lab manuals prepared by staff
• Educational Tools : CD/Videos/PPT
• Animations and simulations developed by Staff
Mathematics Department is one of the Oldest departments of the College with 6 Staff members on its roll, one have M.Phil, two have B.ed, one have registered for Ph.D. Our faculty members are engaged in research work in different areas like Topology, Fluid Mechanics, Graph Theory.
• In Research Field the Staff members of Mathematics are actively involved in different area of Research such as Topology , Fluid Mechanics, Graph Theory.
• UGC sponsored Minor Research Project have been completed by Prof.S.B.Bhandari .
‘’Simple Fuzzy Models for Social Scientists and their applications to real world problems.’’
• Ashwini Kenganagutti have submitted the Thesis on the research topic ‘’Study of thermal effects on the Lubrication on the bearings with Newtonian / Non-Newtonian Lubricants.’’
• An UGC sponsored National Level Seminar was organized by the Department . ‘’The Frontiers of Mathematics and some recent advances’’
• Seven research papers where published by the faculty members in the National, International journals and conferences.
• Bhuvaneshwari Sarasambi has secured X Rank to Rani Channamma University,Belagavi (2017-18).
• National year of Mathematics-2012 was celebrated by the Department.
• MAT-Lab Laboratory was established in the year 2013-14 under CPE –fund.
• Saisameer has cleared NPTL course with FIRST grade in “Calculus of one variable’’ under the guidance of Prof.Chidanand badiger .
• Under UGC-CPE fund, One day workshop was conducted for college teachers.”Calculus of variations’’ and ‘’preparation of Model question papers for B.Sc V and VI semester -2013.’’
Under construction
SlNo | Name | Rank | Year |
---|---|---|---|
16 Miss Bhuvaneshwari Sarasmbi X | May-2018 | ||
1 | V.M.Pattanashetti | III | Oct-1968 |
2 | S.V.Tolanur | II | Oct-1968 |
3 | S.S.Sindagi | XI | Mar-1969 |
4 | G.V.Parvatikar | II | Apr-1971 |
5 | C.S.Bagewadi | II | Apr-1971 |
6 | V.A.Lokande. | II | Apr-1971 |
7 | M.Parvatikar | II | Apr-1971 |
8 | S.S.Bayali | X | Apr-1981 |
9 | Asha. R.Anekar | I | Apr-1985 |
10 | M.Parvatikar | VII | Apr-1985 |
11 | M.B.Sajjan | IV | Apr-1994 |
12 | V.N.Chimmalagi | X | Apr-2001 |
13 | H.Madavi | I | Apr-2002 |
14 | Rashmi Revadagundi (Secured GOLD MEDAL) | III | Apr-2002 |
15 | Miss R. L. Attar (Secured GOLD MEDAL) | III | Apr-2011 |
Sl.No | Name of the staff | Title of the Projects | Funding Agency | Sanctioned Amount | Date of Completion |
01 | S.B.Bhandari |
Simple Fuzzy Models for Social Scientists and their Applications to real world problem |
UGC | 90000=00 | 7-2-2014 |
• Ashwini Kenganagutti has submitted the Thesis on the research topic ‘’Study of thermal effects on the Lubrication on the bearings with Newtonian / Non-Newtonian Lubricants.’’
Publications
Prof. S. B. Bhandari
• A medical diagnostic support system for Identification and Estimation in percentage wise the level of Pf+ve Malaria cases of high risk groups.
• Simple Fuzzy Models for social scientists and their application to real world problems.
• Fuzzy expert System for identifying and estimating the level of very severe and uncomplicated plasmodium falciparum malaria disease.
• Fuzzy expert System for identifying and estimating the maximum age group patients suffered by malaria disease problems.
Smt Ashwini Kneganagutti Publications :
1.Multigrid method for the solution of combined effect of viscosity variation and surface roughness on the squeeze film lubrication of journal bearings, Journal of Mechanical Engineering, 1(46) (2017) 1–8. DOI:3329/jme.v46il.32516.
2.Static characteristics of thermohydrodynamic journal bearing with surface roughness operating under lubricants with nanoparticles, Journal of Nanofluids, 1(7) (2018), 203-209.
DOI: https://doi.org/10.1166/jon.2018.1429.
3. Surface roughness effect on thermohydrodynamic analysis of journal bearings lubricated with couple stress fluids, Nonlinear Engineering Modelling and Application, ISSN(online) 2192-8029, ISSN(Print) 2192-8010.
DOI: http://doi.org/10.1515/nleng-2018-0017.
Department Mathematics
Semester B.Sc. I
Subject Name & Code Paper –I : DIFFERENTIAL CALCULUS
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Students are able to understand and implement the following concepts
•Real number, Field Axioms and Order Axioms and Completeness of R.
•Absolute values and Archimedean property.
•Continuous and Discontinuous functions and Algebra of limits.
•Boundedness of continuous functions, Intermediate value theorem and Uniform continuity.
•nth derivative of
•Leibnitz’s rule of nth derivative of a product.
•Rolle’s Theorem, Lagrange’s Mean Value Theorem, Cauchy’s Mean Value Theorem.
•Taylor’s Theorem (with Sclomilch and Rouche’s form of reminder), Maclaurin’s Series and L-Hospital’s rule.
•Indeterminate forms of , ,) , ,
Department : Mathematics
Semester B.Sc. I
Subject Name & Code Paper-II ALGEBRA AND TRIGONOMETRY
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Students are able to learn and implement the following concepts
•Determinants, Properties of Determinants, examples on fourth order Determinants.
•Symmetric and Skew-Symmetric determinants & Reciprocal determinants.
•Matrices, Rank of a Matrices and elementary transformations.
•Elementary transformations, Reduction to Normal forms and Solution of system of Linear equations.
•Set theory, Equivalence relations, Partition of a Set, Arbitrary unions and intersections.
•De Morgan’s laws (Theorem), Countable and Uncountable sets.
•Solution of the Euclidean algorithm, Reminder Theorem & Factor Theorem.
•Fundamental Theorem of Algebra& Relation between the roots and coefficient of general polynomial equation in one variable & Synthetic division.
•Expansion of Sine and Cosine functions, Series of Sines and Cosines.
•Hyperbolic functions, Logarithm of a Complex number & Summations of Trigonometric series.
•Department Mathematics
•Semester B.Sc. II
•Subject Name & Code PAPER-I: DIFFERENTIAL AND INTEGRAL CALCULUS
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Students are able to comprehend the following concepts
• Polar coordinate system, Angle between radius vector and tangent at a point on the curve.
• Angle of intersection of two curves, Polar sub tangent, polar sub-normal & Polar and pedal equation of the curves.
• Derivative of arc length, Curvature and radius of curvature.
• Radius of curvature of intrinsic form, Cartesian form, parametric form, polar form, pedal forms,
• Evolutes and Involutes.
• Limits, continuity of functions of two variables & Partial derivatives.
• Total derivatives, total differentials & Homogeneous functions, Euler’s theorem on homogeneous functions.
• Concavity and Convexity of curves, Points of inflexion of curves.
Envelops, Asymptotes and types of Asymptotes .• Reduction formulae for integration of sinnx, cosnx, tannx, cotnx, secnx, cosecnx, (sinmx cosnx), xn eax, xm(logx)n.
Department Mathematics
Semester B.Sc. II
Subject Name & Code PAPER-II: ALGEBRA AND GEOMETRY
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Students are able to comprehend the following concepts
• Relations, Partially ordered sets, Least Upper Bound, Greatest Lower Bound & Lattices.
• Properties of algebraic structures of distributive and complemented lattices. Boolean lattices,
• Boolean algebra, Boolean functions and expressions.
• Prime and composite numbers, Fundamental theorem of arithmetic and Congruence.
• Fermat and Wilson’s theorems, Euler pi function.
• Sphere, Equation of sphere, Standard form, Central form and General form.
• Sphere through a given circle, equation of circles, two spheres touch each other internally and externally. Angle of intersection of two spheres & Orthogonal
• Equation of cone with vertex at the origin is a homogeneous second degree equation, General equation of the cone of second degree which passes through the co-ordinate axis.
• Equation of the right circular cone with different vertices and different parameters.
• Cylinder, Equation of cylinder, Equation of the cylinder whose generators are parallel to the line & base of the conic f(x,y)=ax2+by2+2fy+2gx+2hxy+c=0, z=0 is a (2 +b()2+2h()+2nf)(z-)+2ng( (z-)+cn2=0.
• Equation of the right circular cylinder in standard form whose axis is z-axis & radius r, is x2+y2=r 2, Equation of right circular cylinder in general form whose axis is & radius r, is (x-)2+(y-)2+(z-)2=2+r2/[l2+m2+n2].
Department Mathematics
Semester B.Sc. III
Subject Name & Code PAPER- I : MATHEMATICAL LOGIC & REAL ANALYSIS
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Students are able to comprehend the following concepts
• Mathematical logic, Statement on Proposition, Conjunction, disjunction, conditional, bi conditional, tautology and Contradiction.
• Converse, inverse and Contra-positive of an implication, Mathematical structures and valid arguments. Quantifiers, Existential & universal quantifiers.
• Jacobians, Properties of Jacobians and Lagrange’s mean value theorem for functions of two variables.
• Taylor’s theorem for two variable functions and Maclaurian’s theorems for two variables.
• Maximum value and Minimum value for functions of two variables.
• Necessary condition for maxima or minima, sufficient condition for extreme values of two variables & the Classification of critical points.
• Sequences, Bounded and unbounded sequences, Convergent, Divergent and Oscillatory sequences.
• Monotonic sequences and Cauchy’s sequence.
• Cauchy’s first and second theorems on limits and Subsequences.
Department Mathematics
Semester B.Sc. III
Subject Name & Code PAPER II: GROUP THEORY, INTEGRAL CALCULUS & DIFFERENTIAL EQUATIONS
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Students are able to understand and implement the following concepts
• Properties of groups, Semi groups, Subgroups and Permutation group.
• Cyclic groups & cosets (Right and Left cosets).
• Lagrange’s theorem on groups, Euler’s & Fermat’s theorem.
• Definite Integrals, Application of definite integral to find the lengths of arc of standard curves.
• Applications of definite integral to find the surface areas of standard curve & find the volume of solids of revolution of standard curves.
• Differential equations, order and degree of differential equations.
• Homogeneous forms, Solutions of Bernoulli’s form and Solution of differential equation by finding a suitable integrating factor.
• Solutions of differential equations of higher degree.
Department : Mathematics
Semester : B.Sc. IV
Subject Name & Code : PAPER I: VECTOR CALCULUS AND INFINITE SERIES
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Students are able to understand and implement the following concepts
• Vector algebra, Scalar product of two vectors and Vector product of two vectors.
• Triple product of vectors, Derivative of vector functions, Constant of vector functions & Partial differentiation of vector function.
• Vector differential operator del, gradient and curl, the gradient of a scalar point function.
• Properties of gradient of vector function, divergence and curl, Solenoidal and irrotational vectors.
• Infinite series, Convergent, Divergent and Oscillatory series.
• Necessary and sufficient condition for convergence, Geometric series, P-series &Different forms of comparison test.
• D’Alembert’s ratio test, Raabe’s test.
• Cauchy’s integral test, Cauchy’s root test.
• Alternating series & Leibnitz theorem.
• Absolute convergence, conditional convergence of series &Uniform convergence.
Department : Mathematics
Semester : B.Sc. IV
Subject Name & Code : PAPER II: GROUP THEORY, FOURIER SERIES AND DIFFERENTIAL EQUATIONS
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Students are able to understand and implement the following concepts
• Normal sub-groups, Quotient groups & Theorems on Quotient groups.
• Homomorphism, Isomorphism of groups & Fundamental theorem on Homomorphism.
• Periodic functions with examples &Fourier series with examples.
• Fourier series of even & odd functions with period 2. Half -Range Sine & Cosine Fourier series.
• Fourier Sine, Cosine Transform and Fourier Integral Theorem.
• Fourier Sine Transform & Fourier Cosine Transform.
• Linear differential equation, Solution of Linear differential equation of nth order with constant coefficients.
• Particular integral of the form xv where v is a function of x.
• Homogeneous linear differential equation of
• Equations reducible to the homogeneous linear form.
Department : Mathematics
Semester : B.Sc. V
Subject Name & Code : Paper –I: REAL ANALYSIS
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Students are able to understand and implement the following concepts
• Partition of an interval & upper and lower Riemann sums.
• Riemann integrals, Necessary and sufficient conditions for integrability and Algebra of integrable function.
• Integrability of continuous, monotonic functions.
• Fundamental theorem of integral calculus &first and second mean value theorem of integral calculus.
• Proper and Improper integrals & Convergence of first and second kind of Improper integrals.
• Comparison tests, Abel’s test & Dirichlet’s test.
• Beta and Gamma functions, Convergence of Beta and Gamma function.
• Double and Triple integrals & Differentiation under integral sign.
• Leibnitz’s rule for Differentiation under integral sign.
Department : Mathematics
Semester : B.Sc. V
Subject Name & Code : Paper –II: NUMERICAL ANALYSIS
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Students are able to learn & understand the following concepts
• Algebraic and transcendental equations, Bisection method and Iteration method.
• Newton-Raphson, Gauss Siedal and Jacobi Iteration method.
• Finite difference, (Δ (Delta), (Del) & E(Shift)).
• Factorial notation, Newton Gregory forward & backward difference interpolation formula.
• Forward and backward difference formulae.
• Quadrature formula, Trapezoidal formula and Simpsons (1/3rd and 3/8th) formula.
• Initial value problems and Ordinary linear first order differential equations.
• Taylor’s series, Euler’s method, Picard method and Runge-Kutta method.
• Basics of difference equations, Order, degree & solution of the difference equations.
• Linear difference equations Form I and II with constant coefficients & Homogeneous linear difference equation.
Department : Mathematics
Semester : B.Sc. V
Subject Name & Code : PAPER- III: DYNAMICS AND CALCULUS OF VARIATIONS
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Students are able to learn & understand the following concepts
• Radial and Transverse components of velocities & accelerations.
• Tangential and normal components of velocities & acceleration.
• Central Orbits, Central force & Derivation of the Equation of the path of the practical in polar co-ordinates.
• Derivation of the Differential Equation of the Central Orbits in polar and pedal form & Apse, Apsidal distance and Apsidal angle.
• Projectile, Trajectory, Point of projection and Velocity of projection.
• Equation of the path of the projectile in the form y= x tangx2 / 2u2cos2and Loss of kinetic energy due to Direct and Oblique impact.
• Functional &Variation of a function f = f(x, y, z).
• Fundamental theorem of calculus of variation & Euler’s equation.
• Geodesic and Geodesic on plane & Geodesic on sphere.
• Derivation of Brachistochrone problem & Know the Minimum surface of revolution.
Department : Mathematics
Semester : B.Sc. VI
Subject Name & Code : PAPER –I : DIFFERENTIAL EQUATIONS
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Students are able to comprehend the following concepts
• Ordinary simultaneous differential equation & Simultaneous differential equations with two and three variables.
• Total differential equation & Condition of integrability.
• Power series, analytic function, ordinary & singular points.
• Derivation of the Frobenius method with working rule.
• Legendre equation & Solutions of Legendre’s equations in series.
• Orthogonal properties, recurrence formulae & Rodrigue’s formula.
• Lagrange’s linear partial differential equation Pp+Qq = R.
• Non-linear differential equations of standard forms I,II,III and IV.
• General Method of Solution (Charpit’s method).
• Linear partial differential equations of higher order& Homogeneous Partial differential equation with constant coefficients.
• Real Numbers, Axioms, Continuity, nth derivatives, mean value theorems, Indeterminate forms.
• Determinants and its properties, Rank of matrix, Demorgan’s Law, Fundamental Theorem of Algebra, Trigonometry.
• Polar co-ordinate system, radius of Curvature, Continuity of functions of two variables, Reduction formulas.
• Relations and types of relations, Boolean Algebra, Number Theory, Sphere, Cone and Cylinder.
• Mathematical Logic, Partial differentiation, Maxima and Minima, Sequences and sub- Sequences.
• Group, Subgroup and its properties, Cyclic Group, Co set groups, Lagrange’s theorem, Definite Integrals, Differential equations.
• Vectors and Scalars, Vector differential operator del, gradient and curl, Infinite Series, Alternating series.
• Normal Subgroups, Quotient group, Homomorphism and Isomorphism groups, Fourier series, Differential equations.
• Riemann Integrations, Improper integrals, Beta and Gamma functions, Triple Integrals.
• Bisection and Iteration method, Newton Raphson Method, Gauss Seidal method, Jacobi Iteration method, Finite Difference , Forward and Back word difference formulas., Difference equations.
• Radial and Transverse Velocities and accelerations of a particle, Projectile, Central orbits, Impact, Calculus of variations.
• Simultaneous differential equations, Total differential equations, Legender equation, Non- Linear differential equations.
• Analytic function, Complex integration, Cauchy’s Integral Theorem, Taylors and Laurent’s series, Ring and Sub ring and its Properties.
• Topology, Open sets, closer set, Neighborhood of a point, Limit points, derived sets, T1 and T2 space, Base and Sub base, Laplace Transforms.
• Guest Lecture on Applications of Integral Calculus was arranged by the department for the B.Sc. I Semester students on 27-8-2013
• Guest Lecture on Basic Ideas of Real and Complex Analysis was arranged by the department for the B.Sc. II and IV Semester students on 8-2-2014
• Guest Lecture on Differential Equations was arranged by the department for the B.Sc. V Semester students on 11-8-2014
• Guest Lecture on Boolean Algebra was arranged by the department for the B.Sc. II Semester students on 27-1-2015
• Guest Lecture on Number Theory was arranged by the department for the B.Sc. III Semester students on 11-9-2015
• Guest Lecture on Recent Developments in Mathematics was arranged by the department for the B.Sc. VI Semester students on 16-3-2016
• Guest Lecture on Laplace Transform – Review and Graphical Approach was arranged by the department for the B.Sc. V Semester students on 24-9-2016
• Guest Lecture on Basic Mathematical Analysis was arranged by the department for the B.Sc. VI Semester students on 26-3-2018
• Guest Lecture on Topology and its Applications was arranged by the department for the B.Sc. VI Semester students on 23-1-2019
• A Quiz programme for B.Sc II, IV and VI semester students of our college was conducted on 24-3-2014
• A Quiz programme for B.Sc II, IV and VI semester students of our college was conducted on 10-3-2015,6-3-2015,4-3-2015
• A Quiz programme for B.Sc I, III and VI semester students of our college was conducted on 1-9-2015,12-9-2015,19-9-2015
• A Quiz programme for B.Sc II, IV and VI semester students of our college was conducted on 20-3-2017, 17-3-2017,18-3-2017
• A Quiz programme for B.Sc II, IV and VI semester students of our college was conducted on 24-3-2018
Sl.No |
Events |
Date |
Participants |
01 |
Workshop on Calculus of Variations |
17-8-2014 |
College Teachers |
02 |
National Seminar on The Frontiers of Mathematics and Some Recent Advances |
September 13-14,2014 |
College Teachers |
03 |
International year of Mathematics-2012 |
18-42012 |
Teachers and Students |
04 |
State Level Seminar on Mathematical Modeling |
20-10-2008 |
College Teachers |
05 |
District level two days Orientation programme for High school Teachers |
04-12-2009 |
High school teachers |
• An extension activity was conducted by the department for IXth and Xth students of Basaveshwar composite P.U. college Bagalkot.(High school section) on 16-08-2014
• An extension activity was conducted by the department for IXth and Xth students of Sangameshwara high school, Kudalasangam on 24-01-2015
• An extension activity was conducted by the department for IXth and Xth students of Adarsh composite PU college, Bewoor.on 18-02-2015
• An extension activity was conducted by the department for IXth and Xth students of Government high school, Ganjihal.Tq. Hunagund on 02-03-2015
• An extension activity was conducted by the department for IXth and Xth students of Siddeshwar high school, Shirur. Tq. Bagalkot.on 22-03-2018
• An extension activity was conducted by the department for IXth and Xth students of Kittur Channamma high school, Shirur.Tq. Bagalkot on 23-02-2018
• An extension activity was conducted by the department for IXth and Xth students of Basaveshwar new high school (English medium), Bagalkot.on 19-01-2019
Bhuvaneshwari Sarasambi has secured X Rank to Rani Channamma University,Belagavi .
Highest Scorer : 2017-18
Class | Reg.No | Name of the student | Marks Obtained |
I Sem | S1727642 | Pallavi Pattanshetti | 190/200 |
II Sem | S1727708 | Shilpa Rathod | 193/200 |
III Sem | S1628808 | Pooja | 200/200 |
IV Sem | S1628926 | Shrinivas.Y.Neeralakeri | 200/200 |
V Sem | S1528121 | Miss. Soubhagya Gothemath | 276/300 |
VI Sem | S1527873 | Bhuvaneshwari Sarasambi | 276/300 |
Highest Scorer : 2018-19
Class | Reg.No | Name of the student | Marks Obtained |
I Sem | S1833208 | Miss. Sneha Ambiger | 190/200 |
III Sem | S1727708 | Miss. Shilpa Rathod | 197/200 |
V Sem | S1628852 | Miss. Rekha Hiremath | 288/300 |
Highest Scorer : 2018-19
SI.No | REFERENCE ID | CANDIDATE NAME |
1 | DT20163602067 | Vinayak Havaragi |
2 | DT20163596972 | Shruti Handaragal |
3 | DT20163601750 | Kusuma Talawar |
4 | DT20163598035 | Suma Hulloora |
5 | DT20163598045 | Rekha Kulali |
6 | DT20163602207 | Vijayalaxmi Shivannavar |
7 | DT20163598150 | Pooja Pattanashetti |
Career guidance and Placement Cell
TCS Recruitment Drive-August 8 and 9, 2016
Final Selected List of Students(PCM)
SL.NO | NAME OF STUDENTS | CLASS | Event | Nature of participation |
1 | Meghana | B.Sc V | Infosys Campus drive | Selected |
2 | Sagar Hanchate | B.Sc V | Infosys Campus drive | Selected |
3 | Madhu Bajantri | B.Sc V | Infosys Campus drive | Selected |
4 | K. Hiremat | B.Sc V | Infosys Campus drive | Selected |
Selected Student list for the Infosys of the year 2017-18
Sl No | Name | Combination |
1 | B.M.Roja | PCM |
2 | Laxmi Aralichandi | PCM |
3 | Uma Nagaral | PCM |
4 | Ramadevi Mudnur | PCM |
5 | Chetan Naregal | PCM |
6 | Kirti Balagavi | PCM |
SELECTED STUDENTS LIST OF FIRMNXT.COM CAMPUS 03-02-2016
Sl No | Name | Combination |
1 | B.M.Roja | PCM |
2 | Akshta Ballolli | PCM |
3 | Kaveri Chalawadi | PCM |
4 | Kaveri Balakannavar | PCM |
5 | Ankita Kalagi | PCM |
6 | Jayashree kollur | PCM |
7 | Mamata Tambake | PCM |
8 | Avinash Kuri | PCM |
9 | Mahalaxmi Vandali | PCM |
10 | Bharati Hulgeri | PCM |
11 | Ravi Indi | PCM |
12 | Ramadevi Mudnur | PCM |
NCC 2017-18
Sl. No Name Class Event 1 Tejashwini Math B.Sc III All india Thal Sainik Camp Got gold in ShootingNSS (2018-19 )
Sl. No | Name | Class | Event |
1 | Sunil Kanti | B.Sc III | Sleeted for Republic day Camp |
N.S.S : 2017-18
1) Miss. Soudaraya.Halkurki was participated in Pre R.D. Selection Camp 2017-18 at Kerala State on 1-10 October 2017.
2) Mr. Bhoomanna Ganiger was selected and attended in Pre R.D. selection Camp 2017-18 at Agriculture University Bangalore University on 3-4 October 2017.
N.S.S : 2016-17
1) Mr.Vinayak .Havaragi was attended National Integration Camp at Gujarath on 4-10 January 2017.
2) Miss. Soudaraya.Halkurki was participated in R.D. Pared Camp at Bangalore University on 14-26 January 2017.
3) Mr. Abhisheksing and Miss. Soudaraya.Halkurki was attended National Integral Camp at Perambur, Tamilnadu on 19-25 March 2017.
Following Staff members are attended refresher course (Degree college teachers) at Indian Institute of Science (IISc) kudapur, Karnataka.
• V.V.Wali
• R.D.Pawar
• Smt. Sumangala Dinni.
• Prof.S.B.Bhandari Awarded M.Phil Degree in the year 2006-07 from the Maduri Kamaraj University , Tamilnadu
• Prof S.B.Bhandari completed UGC Minor research project on “Simple Fuzzy Models for Social Scientists and their applications to real world problems” in the year 2014-15.
• Sri B.Bhandari was Honored by ‘National Young Leader Program Award ‘ with a Cash Prize of Rs30,000/- by Ministry of Youth affairs and Sports, Government of India for his contribution to NSS.
• S.B.Bhandari war awarded as ‘Best NSS officer’ on 23-04-2018 by RCU Belagavi.
• Suryakant.B.Bhandari has got Best Paper Award in an international Conference conducted at carmel
• College nuvem,Goa on 03 to 05 March 2016. Paper topic is “Fuzzy expert system for Identifying and estimating the level of Very Severe and Uncomplicated Plasmodium Falciparum Malaria Disease (VSUPFMD)”.
• S.A.Bhusanurmath was published four articles in college Annual magazine
• S.A.Bhusanurmath was selected as a member of Board of Studies and Board of Examination. Dept. of Mathematics, RCU Belagavi for the year 2015-16 and 2016-17.
• Ashwini Kenganagutti has submitted the Thesis on the research topic ‘’Study of thermal effects on the Lubrication on the bearings with Newtonian / Non-Newtonian Lubricants.’’
Staff members are attended National Seminar/ Conference/ Workshop/ Training Program
Sl.No | Name of the teacher | National seminars | Conference | Workshop | Training program |
1 | Prof.S.A.Bhuasanurmath | 03 | 01 | 03 | — |
2 | Prof.S.B.Bhandari | International-02 National-05 | International- 02 Symposium- 01 | 03 | — |
3 | Smt.V.V.Wali | 03 | — | 02 | — |
4 | Miss.R.D.Pawar | — | —- | 01 | 01 |
5 | Mr.Kartik Desai | — | — | 01 | — |
6 | Smt.Ashwini Kengangutti | 02 | 01 | 02 | — |