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Sl.No Chapter Name MP4 Download
11.2 Metric SpacesDownload
21.3 Examples of metric spacesDownload
31.4 Loads of definitionsDownload
42.1 Normed vector spacesDownload
52.2 Examples of normed vector spacesDownload
62.3 Basic properties open closed sets metricDownload
73.1 Continuity in metric spacesDownload
83.2 Equivalent metrics and product spacesDownload
94.1 CompletenessDownload
104.2 Completeness continuedDownload
114.3 Completeness of B(x,y)Download
125.1 CompletionDownload
135.2 CompactnessDownload
146.1 The Bolzano--Weierstrass PropertyDownload
156.2 Open covers and CompactnessDownload
166.3 The Heine--Borel Theorem for Metric SpacesDownload
177.1 ConnectednessDownload
187.2 Path-ConnectednessDownload
197.3 Connected ComponentsDownload
208.1 The Arzela--Ascolli theoremDownload
218.2 Upper and lower limitsDownload
229.1 The Stone--Weierstrass theoremDownload
239.2 All norms are equivalentDownload
2410.1 Vector-valued functionsDownload
2510.2 Scalar-valued functions of a vector variableDownload
2610.3 Directional derivatives and the gradientDownload
2711.1 Interpretation and properties of the gradientDownload
2811.2 Higher-order partial derivativesDownload
2912.1 The derivative as a linear mapDownload
3012.2 Examples of differentiationDownload
3113.1 Properties of the derivative mapDownload
3213.2 The mean-value theoremDownload
3313.3 Differentiating under the integral signDownload
3414.1 Higher-order derivativesDownload
3514.2 Symmetry of the second derivativeDownload
3615.1 Taylor's theoremDownload
3715.2 Taylor's theorem with remainderDownload
3816.1 The Banach fixed point theoremDownload
3916.2 Newton's methodDownload
4017.1 The inverse function theoremDownload
4118.1 Diffeomorphismsm and local diffeomorphismsDownload
4218.2 The implicit function theoremDownload
4319.1 Tangent space to a hypersurfaceDownload
4420.1 The definition of a manifoldDownload
4521.1 Examples and non examples of manifoldsDownload
4621.2 The tangent space to a manifoldDownload
4722.1 Maxima and minima in several variablesDownload
4822.2 The Hessian and extremaDownload
4922.3 Completing the squaresDownload
5022.4 Constrained extrema and lagrange multipliersDownload
5123.1 CurvesDownload
5224.1 Rectifiability and arc-lengthDownload
5325.1 The Riemann integral revisitedDownload
5425.2 Monotone sequences of functionsDownload
5526.1 Upper functions and their integralsDownload
5626.2 Riemann integrable functions as upper functionsDownload
5727.1 Lebesgue integrable functionsDownload
5827.2 Approximation of Lebesgure integrable functionsDownload
5928.1 Levi monotone convergence theorem for step functionsDownload
6028.2 Monotone convergence theorem for upper functionsDownload
6128.3 Monotone convergence theorem for Lebesgue integrable functionsDownload
6229.1 The Lebesgue dominated convergence theoremDownload
6329.2 Applications of the convergence theoremsDownload
6430.1 The problem of measureDownload
6531.1. The Lebesgue integral on unbounded intervalsDownload
6631.2 Measurable functionsDownload
6732.1 Solution to the problem of measureDownload
6833.1 The Lebesgue integral on arbitrary subsetsDownload
6933.2 Square integrable functionsDownload
7034.1 Norms and inner-products on complex vector spacesDownload
7134.2 Convergence in L2Download
7234.3 The Riesz--Fischer theoremDownload
7335.1 Multiple Riemann integrationDownload
7435.2 Multiple Lebesgue integrationDownload

Sl.No Chapter Name English
11.2 Metric SpacesDownload
Verified
21.3 Examples of metric spacesDownload
Verified
31.4 Loads of definitionsDownload
Verified
42.1 Normed vector spacesDownload
Verified
52.2 Examples of normed vector spacesDownload
Verified
62.3 Basic properties open closed sets metricDownload
Verified
73.1 Continuity in metric spacesDownload
Verified
83.2 Equivalent metrics and product spacesPDF unavailable
94.1 CompletenessPDF unavailable
104.2 Completeness continuedPDF unavailable
114.3 Completeness of B(x,y)PDF unavailable
125.1 CompletionPDF unavailable
135.2 CompactnessPDF unavailable
146.1 The Bolzano--Weierstrass PropertyPDF unavailable
156.2 Open covers and CompactnessPDF unavailable
166.3 The Heine--Borel Theorem for Metric SpacesPDF unavailable
177.1 ConnectednessPDF unavailable
187.2 Path-ConnectednessPDF unavailable
197.3 Connected ComponentsPDF unavailable
208.1 The Arzela--Ascolli theoremPDF unavailable
218.2 Upper and lower limitsPDF unavailable
229.1 The Stone--Weierstrass theoremPDF unavailable
239.2 All norms are equivalentPDF unavailable
2410.1 Vector-valued functionsPDF unavailable
2510.2 Scalar-valued functions of a vector variablePDF unavailable
2610.3 Directional derivatives and the gradientPDF unavailable
2711.1 Interpretation and properties of the gradientPDF unavailable
2811.2 Higher-order partial derivativesPDF unavailable
2912.1 The derivative as a linear mapPDF unavailable
3012.2 Examples of differentiationPDF unavailable
3113.1 Properties of the derivative mapPDF unavailable
3213.2 The mean-value theoremPDF unavailable
3313.3 Differentiating under the integral signPDF unavailable
3414.1 Higher-order derivativesPDF unavailable
3514.2 Symmetry of the second derivativePDF unavailable
3615.1 Taylor's theoremPDF unavailable
3715.2 Taylor's theorem with remainderPDF unavailable
3816.1 The Banach fixed point theoremPDF unavailable
3916.2 Newton's methodPDF unavailable
4017.1 The inverse function theoremPDF unavailable
4118.1 Diffeomorphismsm and local diffeomorphismsPDF unavailable
4218.2 The implicit function theoremPDF unavailable
4319.1 Tangent space to a hypersurfacePDF unavailable
4420.1 The definition of a manifoldPDF unavailable
4521.1 Examples and non examples of manifoldsPDF unavailable
4621.2 The tangent space to a manifoldPDF unavailable
4722.1 Maxima and minima in several variablesPDF unavailable
4822.2 The Hessian and extremaPDF unavailable
4922.3 Completing the squaresPDF unavailable
5022.4 Constrained extrema and lagrange multipliersPDF unavailable
5123.1 CurvesPDF unavailable
5224.1 Rectifiability and arc-lengthPDF unavailable
5325.1 The Riemann integral revisitedPDF unavailable
5425.2 Monotone sequences of functionsPDF unavailable
5526.1 Upper functions and their integralsPDF unavailable
5626.2 Riemann integrable functions as upper functionsPDF unavailable
5727.1 Lebesgue integrable functionsPDF unavailable
5827.2 Approximation of Lebesgure integrable functionsPDF unavailable
5928.1 Levi monotone convergence theorem for step functionsPDF unavailable
6028.2 Monotone convergence theorem for upper functionsPDF unavailable
6128.3 Monotone convergence theorem for Lebesgue integrable functionsPDF unavailable
6229.1 The Lebesgue dominated convergence theoremPDF unavailable
6329.2 Applications of the convergence theoremsPDF unavailable
6430.1 The problem of measurePDF unavailable
6531.1. The Lebesgue integral on unbounded intervalsPDF unavailable
6631.2 Measurable functionsPDF unavailable
6732.1 Solution to the problem of measurePDF unavailable
6833.1 The Lebesgue integral on arbitrary subsetsPDF unavailable
6933.2 Square integrable functionsPDF unavailable
7034.1 Norms and inner-products on complex vector spacesPDF unavailable
7134.2 Convergence in L2PDF unavailable
7234.3 The Riesz--Fischer theoremPDF unavailable
7335.1 Multiple Riemann integrationPDF unavailable
7435.2 Multiple Lebesgue integrationPDF unavailable


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