| 14 | xn | ∫xndx=n+1xn+1,n=−1 |
| 15 | x1 | ∫x1dx=ln(x) |
| 16 | eax | ∫eaxdx=aeax,a=0 |
| 17 | ax | ∫axdx=ln(a)ax,a>0,a=1 |
| 18 | ln(x) | ∫ln(x)dx=x(ln(x)−1) |
| 19 | sin(x) | ∫sin(x)dx=−cos(x) |
| 20 | cos(x) | ∫cos(x)dx=sin(x) |
| 21 | tan(x) | ∫tan(x)dx=−ln(cos(x)) |
| 22 | cot(x) | ∫cot(x)dx=ln(sin(x)) |
| 23 | sec2(x) | ∫sec2(x)dx=tan(x) |
| 24 | csc2(x) | ∫csc2(x)dx=−cot(x) |
| 25 | 1−x21 | ∫1−x21dx=sin−1(x),∥x∥<1 |
| 26 | 1+x21 | ∫1+x21dx=tan−1(x),∥x∥<1 |