Page:Elements of the Differential and Integral Calculus - Granville - Revised.djvu/20

1. CHAPTER XXV INTEGRATION OF RATIONAL FRACTIONS

2. SECTION

   PAGE

3. 184.

   Introduction

   325

4. 185.

   Case I

   325

5. 186.

   Case II

   327

6. 187.

   Case III

   329

7. 188.

   Case IV

   331

8. CHAPTER XXVI INTEGRATION BY SUBSTITUTION OF A NEW VARIABLE. RATIONALIZATION

9. 189.

   Introduction

   335

10. 190.

    Differentials containing fractional powers of ${\displaystyle \scriptstyle {x}}$ only

    335

11. 191.

    Differentials containing fractional powers of ${\displaystyle \scriptstyle {a+bx}}$ only

    336

12. 192.

    Change in limits corresponding to change in variable

    336

13. 193.

    Differentials containing no radical except ${\displaystyle \scriptstyle {\sqrt {a+bx+x^{2}}}}$

    338

14. 194.

    Differentials containing no radical except ${\displaystyle \scriptstyle {\sqrt {a+bx-x^{2}}}}$

    338

15. 195.

    Binomial differentials

    340

16. 196.

    Conditions of integrability of binomial differentials

    341

17. 197.

    Transformation of trigonometric differentials

    343

18. 198.

    Miscellaneous substitutions

    345

19. CHAPTER XXVII INTEGRATION BY PARTS. REDUCTION FORMULAS

20. 199.

    Formula for integration by parts

    347

21. 200.

    Reduction formulas for binomial differentials

    350

22. 201.

    Reduction formulas for trigonometric differentials

    356

23. 202.

    To find ${\displaystyle \scriptstyle {\int e^{ax}\sin {nx}dx}}$ and ${\displaystyle \scriptstyle {\int e^{ax}\cos {nx}dx}}$

    359

24. CHAPTER XXVIII INTEGRATION A PROCESS OF SUMMATION

25. 203.

    Introduction

    361

26. 204.

    The fundamental theorem of Integral Calculus

    361

27. 205.

    Analytical proof of the Fundamental Theorem

    364

28. 206.

    Areas of plane curves. Rectangular coördinates

    365

29. 207.

    Area when curve is given in parametric form

    368

30. 208.

    Areas of plane curves. Polar coördinates

    370

31. 209.

    Length of a curve

    372

32. 210.

    Lengths of plane curves. Rectangular coördinates

    373

33. 211.

    Lengths of plane curves. Polar coördinates

    375