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Lectures on integral calculus of functions of one variable and series theory
9. Curves and calculating their length
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Vector functions and their properties
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Table of contents
Preface
Video lectures
1. Antiderivative and indefinite integral
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2. Integration of rational functions
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3. Integration of trigonometric functions
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4. Integration of irrational functions
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5. Definite integral and Darboux sums
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6. Classes of integrable functions. Properties of a definite integral
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7. Integral with a variable upper limit. Newton-Leibniz formula
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8. Calculation of areas and volumes
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9. Curves and calculating their length
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Vector functions and their properties
Differentiable vector functions
Lagrange’s theorem for vector functions
Curves in three-dimensional space. Rectifiable curves
Properties of continuously differentiable curves
Versions of the formula for finding the length of a curve
10. Improper integrals: definition and properties
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11. Absolute and conditional convergence of improper integrals
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12. Numerical series
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13. Convergence tests for numerical series with non-negative terms
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14. Alternating series and conditional convergence
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15. Functional sequences and series
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16. Properties of uniformly converging sequences and series
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17. Power series
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18. Taylor series
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19. Fourier series in Euclidean space
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20. Fourier series in the space of integrable functions
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References
Index
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