Integrals
(the database of solved problems)
All the problems and solutions shown below were generated using the Integral Calculator.
| ID |
Problem |
Count |
| 6251 | $$ \displaystyle\int \dfrac{{x}^{2}-446}{{x}^{3}}\, \mathrm d x $$ | 1 |
| 6252 | $$ $$ | 1 |
| 6253 | $$ $$ | 1 |
| 6254 | $$ $$ | 1 |
| 6255 | $$ \displaystyle\int^{1}_{0} \sin\left(x\right)\, \mathrm d x $$ | 1 |
| 6256 | $$ $$ | 1 |
| 6257 | $$ \displaystyle\int 10\, \mathrm d x $$ | 1 |
| 6258 | $$ \displaystyle\int^{3}_{2} {x}^{3}-4{x}^{2}+5x-10\, \mathrm d x $$ | 1 |
| 6259 | $$ \displaystyle\int^{2}_{1/2} {\left(a-x\right)}^{2}\, \mathrm d x $$ | 1 |
| 6260 | $$ \int \frac{{x}}{{{1}-{x}}}{\left({2}+{x}\right)} \, d\,x $$ | 1 |
| 6261 | $$ \displaystyle\int^{2}_{9} 2{\pi}{\cdot}\left(9-x\right){\cdot}{\left(x-1\right)}^{\frac{1}{3}}\, \mathrm d x $$ | 1 |
| 6262 | $$ \displaystyle\int^{2}_{9} \left(9-x\right){\cdot}{\left(x-1\right)}^{\frac{1}{3}}\, \mathrm d x $$ | 1 |
| 6263 | $$ \int^{0}_{0} {x}^{{2}} \, d\,x $$ | 1 |
| 6264 | $$ \int \sqrt{{\ln{{()}}}} \, d\,x $$ | 1 |
| 6265 | $$ \displaystyle\int^{2}_{0} \sin\left(3x\right){\cdot}{\mathrm{e}}^{2x}\, \mathrm d x $$ | 1 |
| 6266 | $$ \displaystyle\int^{2}_{0} \dfrac{\left(2+\cos\left(2+{x}^{1.5}\right)\right){\cdot}{\mathrm{e}}^{0.5x}}{\sqrt{1+0.5{\cdot}\sin\left(x\right)}}\, \mathrm d x $$ | 1 |
| 6267 | $$ \displaystyle\int^{2}_{0} \sin\left(x\right){\cdot}{\mathrm{e}}^{2x}\, \mathrm d x $$ | 1 |
| 6268 | $$ \displaystyle\int^{\pi/4}_{0} \sqrt{1}+\cos\left(4x\right)\, \mathrm d x $$ | 1 |
| 6269 | $$ \displaystyle\int \dfrac{1}{{x}^{3}{\cdot}\sqrt{{x}^{2}-1}}\, \mathrm d x $$ | 1 |
| 6270 | $$ \displaystyle\int 2x{\cdot}\sqrt{x+2}\, \mathrm d x $$ | 1 |
| 6271 | $$ $$ | 1 |
| 6272 | $$ $$ | 1 |
| 6273 | $$ $$ | 1 |
| 6274 | $$ $$ | 1 |
| 6275 | $$ $$ | 1 |
| 6276 | $$ $$ | 1 |
| 6277 | $$ \displaystyle\int 4{\cdot}\sin\left(2x\right)-3{\cdot}\cos\left(7x\right)\, \mathrm d x $$ | 1 |
| 6278 | $$ \displaystyle\int \left(1-\dfrac{\ln\left(x\right)}{x}\right){\cdot}\sqrt{{x}^{2}-2x}\, \mathrm d x $$ | 1 |
| 6279 | $$ \displaystyle\int^{0}_{-7} 62.4{\cdot}9.8{\cdot}17x\, \mathrm d x $$ | 1 |
| 6280 | $$ \displaystyle\int^{-7}_{0} 62.4{\cdot}9.8{\cdot}17x\, \mathrm d x $$ | 1 |
| 6281 | $$ \displaystyle\int^{-8}_{0} 8x\, \mathrm d x $$ | 1 |
| 6282 | $$ \displaystyle\int^{-16}_{0} 8x\, \mathrm d x $$ | 1 |
| 6283 | $$ \displaystyle\int^{-16}_{-8} 8x\, \mathrm d x $$ | 1 |
| 6284 | $$ \displaystyle\int^{1}_{0} {\pi}{\cdot}\left(2x+3\right)\, \mathrm d x $$ | 1 |
| 6285 | $$ \displaystyle\int^{3}_{0} {\left(3x+4\right)}^{2}-{\left({x}^{2}+4\right)}^{2}\, \mathrm d x $$ | 1 |
| 6286 | $$ \displaystyle\int^{2}_{0} 2x{\cdot}\left(x-{x}^{2}+2\right)\, \mathrm d x $$ | 1 |
| 6287 | $$ $$ | 1 |
| 6288 | $$ \displaystyle\int \dfrac{1}{\sin\left(x\right)}\, \mathrm d x $$ | 1 |
| 6289 | $$ $$ | 1 |
| 6290 | $$ $$ | 1 |
| 6291 | $$ $$ | 1 |
| 6292 | $$ $$ | 1 |
| 6293 | $$ $$ | 1 |
| 6294 | $$ $$ | 1 |
| 6295 | $$ $$ | 1 |
| 6296 | $$ $$ | 1 |
| 6297 | $$ $$ | 1 |
| 6298 | $$ $$ | 1 |
| 6299 | $$ $$ | 1 |
| 6300 | $$ $$ | 1 |
