Calculus mainly covers the concept of changes and uses different types of mathematical models for the sake of quantifying the changes. Calculus is a branch of mathematics that has tremendous application and is phenomenally vast. Electromagnetic theory online course video lectures by iit bombay. Freely browse and use ocw materials at your own pace. Electromagnetic theory online course video lectures by iit. For more details on nptel visit nptel related courses. Video lectures multivariable calculus mathematics mit. Vector calculus in geometry video lecture by prof bhaskar. The divergence theorem of gauss, stokes theorem, and greens theorem. Vector analysis home college of engineering and applied. Luke october 14, 2007 1 introduction let u be an open subset of r, a. A physical quantity which has both magnitude and direction is called as vector. Along with the video lecture for each topic, we have included the prenotes and postnotes. As the set fe igforms a basis for r3, the vector a may be written as a linear combination of the e i.
This lecture explains how to calculate the length of a space curve, then introduces three versions of the product rule for vectorvalued functions and considers an example of curves on the unit sphere, and finally introduces integration of vectorvalued functions. Integral definition of gradient, divergence and curl. Instead of vector calculus, some universities might call this course multivariable calculus or calculus three. Oct 19, 2019 using nptel mathematics engineering app you can read text content pdf of all videos which helps you to save mobile data.
Kumaran,department of chemical engineering,iisc bangalore. Mit ocw has a huge collection of undergraduate and graduate level courses in mathematics and other subjects as well which includes audiovideo lectures, lecture notes, textbooks, assi. Application of vector calculus in mechanics, lines, surface and volume integrals. Geometrically speaking, the domain of a function was a subset of the xaxis. Let be a domain of a function, then if for each variable unique association of a vector, then is called as. Math 2210 calculus 3 lecture videos u of u math university of.
Bhaskar dasgupta,department of mechanical engineering,iit kanpur. Check out for an indepth study and more calculus related lessons. For such a function, say, yfx, the graph of the function f consists of the points x,y x,fx. Aug 12, 2014 mod03 lec14 vector calculus in geometry. The prerequisites are the standard courses in singlevariable calculus a. Line integral from vector calculus over a closed curve. There are two basic operations that can be performed on vectors. Up next mod01 lec03 divergence and curl of vector fields duration. These points lie in the euclidean plane, which, in the. Situable for those taking vector calculus or enginnering math in general.
And youd think of this as a function that takes a point to a number, or a point to a vector. Math 211, multivariable calculus, fall 2011 final exam. The calculus of scalar valued functions of scalars is just the ordinary calculus. A representation in terms of components or unit vectors may be important for calculation and application, but is not intrinsic to the concept of vector. What are the best online, collegelevel mathematics courses. So ive drawn multiple versions of the exact same surface s, five copies of that exact same surface. The topics will be complimented by many examples from different topics in physics. Grayson eisenstein series of weight one, qaverages of the 0logarithm and periods of. Finding the tangent plane in this video lesson, gmath calculus donny lee gives a short example finding the tangent plane of a given scalar surface function. Mod01 lec03 divergence and curl of vector fields youtube. This course contains 42 short lecture videos, with a few problems to solve after each lecture. Spherical and cylindrical coordinates, gradient, divergence and curl, laplacian operator volume and line integrals, surface integrals, divergence and stokes theorem.
R1, wherer1 andr2 are the position vectors of pointsp1. Nptel provides elearning through online web and video courses various streams. In the single variable calculus course, professor gross discussed the calculus of a single real variable in which the domain of a function was a subset of the real numbers. Nptel video lectures, iit video lectures online, nptel youtube lectures, free video lectures, nptel online courses, youtube iit videos nptel courses. In aspect we observed that the vector calculus course was wellplaced for academic development intervention, both because of its unfortunate gatekeeper function and because it is a course taken. Publication date 1920 topics vector analysis publisher calcutta. History thesenotesarebasedonthelatexsourceofthebookmultivariableandvectorcalculusofdavid.
In chapter 2 or 3 not sure derivative of a vector is defined nicely, greens and stokes theorem are given in enough detail. The physics of electromagnetic em fields requires us to deal with the three coordinates of spacex,y,z and. Would you like to learn mathematics engineering by iit professors at any time and place. Vectors are usually used to represent velocity and acceleration, force, and other directional quantities in physics.
Math 211, multivariable calculus, fall 2011 final exam solutions. A physical quantity which has magnitude only is called as a scalar. Vectors are denoted with an arrow over the top of the variable. This book covers calculus in two and three variables. Autoplay when autoplay is enabled, a suggested video will automatically play next. Use nptel mathematics engineering app to understand your subjects better using video lectures and pdfs and make your concept stronger. The objects that we have worked with in single variable calculus calculus 1 and 2 have all had a quantity, i. This lecture explains how to calculate the length of a space curve, then introduces three versions of the product rule for vector valued functions and considers an example of curves on the unit sphere, and finally introduces integration of vector valued functions. Dec 12, 2018 in this video, i give a broad overview of vector calculus, focusing more on the main concepts rather than explicit calculations. A vector is a geometrical object with magnitude and direction independent of any particular coordinate system. Find materials for this course in the pages linked along the left. Multivariable calculus mit fall 2007 lecture notes multivariable. Calendar notes homework exams lecture solution videos. Vector calculus for engineers the academic development model.
This course is about vector calculus, and covers material that all engineers should know. It is suitable for a onesemester course, normally known as vector calculus, multivariable calculus, or simply calculus iii. Calculus begins with definitions of derivatives and gives some standard forms and computation of critical points of curves, then presents grad, del and curl operators on scalar and vector functions. Educational video lectures, tutorials nptel videos. And a lot of people, when they start teaching multivariable calculus, they just jump into the calculus, and theres lots of fun things, partial derivatives, gradients, good stuff that youll learn. Smart material, adaptive structures and intelligent mechanical systems iitk. And what i want to do is think about the value of the line integral let me write this down the value of the line integral of f dot dr, where f is the vector field that ive drawn in magenta in each of these diagrams. Vectors are quantities with size and direction the objects that we have worked with in single variable calculus calculus 1 and 2 have all had a quantity, i. It begins with basic of vector like what is vector, dot and cross products. The vector product of two vectors one of which is itself the vector product of two vectors is a vector quantity called vector triple product. Vector calculus, gradient, divergence and curl in curvilinear coordinates applications to classical mechanics and electrodynamics. Nptel mathematics engineering app has following features. In particular, two arrows that are related by a translation represent the same vector.
Two semesters of single variable calculus is a typical prerequisite. The course contains vector calculus in curvilinear coordinates, linear vector spaces, tensors and complex analysis. R1, wherer1 andr2 are the position vectors of pointsp1 andp2,respectively. This document is intended to provide a brief overview of the salient topics in vector calculus at the level of a calculus iiiiv course. Vector calculus in geometry tutorial of mathematical methods in engineering. Computer networks nptel online videos, courses iit video. In this video, i give a broad overview of vector calculus, focusing more on the main concepts rather than explicit calculations. I try to emphasize how the concepts relate, and that they should. In this chapter, youll study vectors and vector calculus, including the different types of vectors, their definitions and examples. Fdr where f is the gradient vector eld of the function fx. Differential equations are calcified and to methods to solve linear, homogenous equations are presented. It is essentially covered in two segments namely differential calculus and integral calculus. Nocintegral equations, calculus of variations and its applications. Computer networks nptel online videos, courses iit.
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