Integrals
(the database of solved problems)
All the problems and solutions shown below were generated using the Integral Calculator.
| ID |
Problem |
Count |
| 5451 | $$ 1 $$ | 1 |
| 5452 | $$ 1 $$ | 1 |
| 5453 | $$ 1 $$ | 1 |
| 5454 | | 1 |
| 5455 | $$ 1-1 or 873=(select 873 from pg_sleep(15))-- $$ | 1 |
| 5456 | $$ 1-1) or 940=(select 940 from pg_sleep(15))-- $$ | 1 |
| 5457 | $$ 1-1)) or 726=(select 726 from pg_sleep(15))-- $$ | 1 |
| 5458 | $$ 12i88x6vi or 272=(select 272 from pg_sleep(15))-- $$ | 1 |
| 5459 | $$ 1vpa53dtc) or 78=(select 78 from pg_sleep(15))-- $$ | 1 |
| 5460 | $$ 1ccjzb07s)) or 961=(select 961 from pg_sleep(15))-- $$ | 1 |
| 5461 | $$ @@jwr0b $$ | 1 |
| 5462 | | 1 |
| 5463 | $$ \displaystyle\int^{3}_{0} \ln\left(3-x\right)\, \mathrm d x $$ | 1 |
| 5464 | $$ \displaystyle\int^{4}_{0} \ln\left(3-x\right)\, \mathrm d x $$ | 1 |
| 5465 | $$ \displaystyle\int^{1}_{0} \ln\left(3-x\right)\, \mathrm d x $$ | 1 |
| 5466 | $$ \displaystyle\int \ln\left(3-x\right)\, \mathrm d x $$ | 1 |
| 5467 | $$ \displaystyle\int 5000-\left(2500-25x\right)\, \mathrm d x $$ | 1 |
| 5468 | $$ \displaystyle\int^{3}_{0} 5000-\left(2500-25x\right)\, \mathrm d x $$ | 1 |
| 5469 | $$ \displaystyle\int^{3}_{0} 5000-\left(2500-25x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5470 | $$ \displaystyle\int^{2}_{0} 5000-\left(2500-25x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5471 | $$ \displaystyle\int^{2}_{0} 5000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5472 | $$ \displaystyle\int^{2}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5473 | $$ \displaystyle\int^{2}_{0} \dfrac{50000-\left(2500-2x\right){\cdot}10}{2500-2x}\, \mathrm d x $$ | 1 |
| 5474 | $$ \displaystyle\int^{10}_{0} \dfrac{50000-\left(2500-2x\right){\cdot}10}{2500-2x}\, \mathrm d x $$ | 1 |
| 5475 | $$ \displaystyle\int^{0.0001}_{0} \dfrac{50000-\left(2500-2x\right){\cdot}10}{2500-2x}\, \mathrm d x $$ | 1 |
| 5476 | $$ \displaystyle\int^{1}_{0} \dfrac{50000-\left(2500-2x\right){\cdot}10}{2500-2x}\, \mathrm d x $$ | 1 |
| 5477 | $$ \displaystyle\int^{1}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5478 | $$ \displaystyle\int^{0.0001}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5479 | $$ \displaystyle\int^{0.0000001}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5480 | $$ \displaystyle\int^{0.0}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5481 | $$ \displaystyle\int^{0.2}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5482 | $$ \displaystyle\int^{0.01}_{0} 50000-\left(2500-2x\right){\cdot}10\, \mathrm d x $$ | 1 |
| 5483 | $$ \displaystyle\int^{3}_{0} \dfrac{50000-\left(2500-2x\right){\cdot}10}{2500-2x}\, \mathrm d x $$ | 1 |
| 5484 | $$ \displaystyle\int {x}^{\frac{1}{2}}{\cdot}{\left(x-1\right)}^{\frac{1}{2}}\, \mathrm d x $$ | 1 |
| 5485 | $$ \displaystyle\int {x}^{\frac{1}{2}}{\cdot}{\left(x+1\right)}^{\frac{1}{2}}\, \mathrm d x $$ | 1 |
| 5486 | $$ \displaystyle\int \dfrac{1}{{x}^{2}-3}\, \mathrm d x $$ | 1 |
| 5487 | $$ \displaystyle\int \dfrac{1}{2x-1}\, \mathrm d x $$ | 1 |
| 5488 | $$ \displaystyle\int \dfrac{2x}{{x}^{2}-1}\, \mathrm d x $$ | 1 |
| 5489 | $$ \displaystyle\int \dfrac{x}{{x}^{2}-1}\, \mathrm d x $$ | 1 |
| 5490 | $$ \displaystyle\int \dfrac{2}{x-1}\, \mathrm d x $$ | 1 |
| 5491 | $$ \displaystyle\int \dfrac{1}{{x}^{\frac{2}{3}}}\, \mathrm d x $$ | 1 |
| 5492 | $$ \displaystyle\int \dfrac{12x}{{\left({x}^{2}+4\right)}^{3}}\, \mathrm d x $$ | 1 |
| 5493 | $$ \displaystyle\int {\left(1+3{x}^{2}\right)}^{4}\, \mathrm d x $$ | 1 |
| 5494 | $$ $$ | 1 |
| 5495 | $$ $$ | 1 |
| 5496 | $$ $$ | 1 |
| 5497 | $$ $$ | 1 |
| 5498 | $$ $$ | 1 |
| 5499 | $$ $$ | 1 |
| 5500 | $$ $$ | 1 |
