iosr-Jm   Volume-1 ~ Issue-5

Abstract: Quality human resources enhance the progress and prosperity of any nation. Excellent educational system produces good citizens. Our current educational system should be revitalized which produces creative, talented and co-operative people according to the recent global pressure. In the present 21st century the explosion of technologies uplift the world into the sky. It leads to globalization. We require powerful brainy citizens for this competitive world. Education can give tremendous boost to these citizens in the global society. Education should not only reflect the needs of the society but also excellence. Every effort should make to adopt our educational system today's changing economic and social realities of the scientific world. No branch of science is complete without mathematics. Mathematical understanding and reasoning are essential components of success in all walks of life. How did this precious mathematics subject teach or learn? Being abstract nature of mathematics most of the student find difficult to perceive it. Teachers are constantly looking for ways or tools to help their pupils understand the underlying concepts of the lessons. Attention is too paid on the integrative efforts of Information Processing Approach, Transformation between Short Term Memory and Long Term Memory and accelerating cognitive strategies. In this situation the investigators adopt some remedial measures through Multisensory strategies to overcome from these difficulties and enhance the understanding of the learners. This paper focuses about it.

[1]. Dr.Swaruparani ―Teaching of mathematics‖, 2007, APH publication, NewDelhi.
[2]. Mrs.C.Mattuvarkuzhali―Teaching of mathematics, 2009, APH publication, NewDelhi.
[3]. www.learning disabilities.com
[4]. www.dylexia for teacher.com
[5]. www.housing.sc.edu

Abstract:Our aim of this paper is to find a Eulerian Integral and a main theorem based on the fractional operator associated with generalized polynomial and a multivariable I-function having general arguments. The theorem provides extension of various results. Some special cases are also given.
Keywords-Fractionalintegral,Eulerian integral,multivariable I-function,Riemann-Liouville operator,Lauricella function.

[1]. Y.N. Prasad , Multivariable I-Function, Vijnana Parishad Anusandhan Patrika 29(1986) 231 – 235.
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[3]. V.B.L Chaurasia and V.K Singhal,Fractional integration of certain special functions,Tamkang J.Math.35(2004),13-22.
[4]. A.P.Prudnikov,Yu.A. Brychkov and O.I.Marichev,Integrals and series,Vol.I,Elementary Functions,Gordon and Breach,Newyork-London-Paris-Montreux-Tokyo,1986.
[5]. M. Saigo and R.K.Saxena ,Unified fractional integral formula for the multivariable H-function,J.Fract.Calc.15 (19999),91-107.
[6]. R.K. Saxena and K.Nishimoto,Fractional integral formula for the H-function,J.Fract.Calc. 13 (1994),65-74.
[7]. R.K. Saxena and M. Saigo, Fractional integral formula for the H-function II,J.Fract.Calc. 6 (1994),37-41.
[8]. H.M.Srivastava and M.C.Daoust,Certain generalized Neumann expansions associated with the Kampe de Feriet function,Nederl.Acad.We-tench.Indag.Math. 31 (1969),449-457.
[9]. H.M. Srivastava , K.C. Gupta and S.P. Goyal,The H-functions of One and Two Variables with Applications,South Asian Publishers,New Delhi-Madras,1982.

Abstract:In this paper we study the unseady Convective Heat Transfer flow of a viscous electrically conducting
fluid in a vertical wavy Channel under the influence of an inclined magnetic field. The unsteadiness in the flow
is due to an Oscillatory flux in the fluid region. The equations governing the flow and Heat Transfer which are
Non-linear coupled in nature are solved by employing a perturbation technique with the slope  of the wavy
walls as perturbation parameter the influence of Hall effects the radiation and Heat sources on the flow and
Heat Transfer characteristics has been studied graphically the average Nusselt Number on the boundary walls
  1 are numerically evaluated for different values of ,β,  and N.

[1]. Christopher Philip, G, Heat and Mass transfer from a film into steady shear flow, J. I. Mech. Applied Matha, v. 43 (1990).
[2]. Lai F.C : Coupled heat and mass transfer by natural convection from a horizontal line source in saturated porous medium. Int. Comm. Heat Mass transfer, v. 17 pp, 489-499 (1990).
[3]. Chen, T.S, Yuh, C.F and Montsoglo, H : Combined Heat and Mass transfer in mixed convection along vertical and inclined planes. Int. J. Heat Mass transfer, v. 23, pp, (527-537) (1980).
[4]. Poulikakos, D. : On Buoyancy induced heat and mass transfer from a concentrated surface in a infinite porous medium, Int. J. Heat Mass transfer, v. 28, No. 3, pp, 621-629 (1985).
[5]. Angirasa, D, Peterson, G. P, Pop I : Combined heat and mass transfer by natural convection with buyancy effects in a fluid saturated porous medium, Int. J. Heat mass transfer v. 40, no. 12, pp, 2755-2773 (1997)
[6]. B. Hossain, M.D.A and H.S. Thakar: Radiation effects on mixed convection along a vertical plate with uniform surface temperature heat and mass transfer, V.34, PP. 243-248, (1996).
[7]. Ching-Yang Cheng : Natural convection Heat and Mass transfer near a vertical wavy surface with constant wall temperature and concentration in a porous medium, Int. Comm. Heat Mass transfer v. 27, No. 8, pp, 1143-1154 (2000).
[8]. Cess, R.D. The interaction of thermal radiation with free convection of heat transfer, Int. J. Heat Mass transfer v. 9, pp, 1269-1277 (1966).

Abstract: In this paper, we introduce and investigate a new class of set called ω - λ -open set which is weaker than both ω -open and λ -open set. Moreover, we obtain the characterization of λ -Lindelof spaces.
Keywords: Topological spaces, -open sets, λ -Lindelof spaces.
2000 Mathematics Subject Classification: 54C05, 54C08, 54C10.

[1] F.G.Arenas, J.Dontchev and M.Ganster, On -closed sets and dual of generalized continuity, Q&A Gen.Topology, 15, (1997), 3-13.
[2] M.Caldas, S.Jafari and G.Navalagi, More on -closed sets in topological spaces, Revista Columbiana de Matematica, 41(2), (2007), 355-369.
[3] H.Maki, Generalized  -sets and the associated closure operator, The special issue in commemoration of Prof. Kazusada IKEDA's Retirement, (1.Oct, 1986), 139-146.