Integrals
(the database of solved problems)
All the problems and solutions shown below were generated using the Integral Calculator.
| ID |
Problem |
Count |
| 3451 | $$ \displaystyle\int^{0.5}_{0} 30{\mathrm{e}}^{-0.2x}\, \mathrm d x $$ | 1 |
| 3452 | $$ \displaystyle\int 30{\mathrm{e}}^{-0.2x}\, \mathrm d x $$ | 1 |
| 3453 | $$ \displaystyle\int^{4}_{0} \sqrt{{\left(3{t}^{2}-12t+9\right)}^{2}+{\left(4t-8\right)}^{2}}\, \mathrm d x $$ | 1 |
| 3454 | $$ \displaystyle\int^{4}_{0} sq{\cdot}\sqrt{t}{\cdot}\left({\left(3{t}^{2}-12t+9\right)}^{2}+{\left(4t-8\right)}^{2}\right)\, \mathrm d x $$ | 1 |
| 3455 | $$ \displaystyle\int^{4}_{0} \sqrt{{\left(3{x}^{2}-12x+9\right)}^{2}+{\left(4x-8\right)}^{2}}\, \mathrm d x $$ | 1 |
| 3456 | $$ \displaystyle\int^{2}_{0} \sqrt{81}{\cdot}{x}^{4}+1\, \mathrm d x $$ | 1 |
| 3457 | $$ \displaystyle\int^{2}_{0} \sqrt{81{x}^{4}+1}\, \mathrm d x $$ | 1 |
| 3458 | $$ \displaystyle\int 6x-1\, \mathrm d x $$ | 1 |
| 3459 | $$ \displaystyle\int \dfrac{x-1}{{x}^{2}}\, \mathrm d x $$ | 1 |
| 3460 | $$ \displaystyle\int^{1}_{0} \sqrt{1+\dfrac{1}{4}{\cdot}{x}^{2}}\, \mathrm d x $$ | 1 |
| 3461 | $$ \displaystyle\int^{4}_{2} {\mathrm{e}}^{3}{\cdot}x\, \mathrm d x $$ | 1 |
| 3462 | $$ \displaystyle\int \ln\left(x\right){\cdot}\cos\left(x\right)\, \mathrm d x $$ | 1 |
| 3463 | $$ \displaystyle\int {\mathrm{e}}^{-x}{\cdot}\sinh\left(x\right)\, \mathrm d x $$ | 1 |
| 3464 | $$ \displaystyle\int 0.1{\cdot}\sin\left(1000\right)\, \mathrm d x $$ | 1 |
| 3465 | $$ \displaystyle\int {\left(9-4{x}^{2}\right)}^{0.5}\, \mathrm d x $$ | 1 |
| 3466 | $$ \displaystyle\int \dfrac{x}{15x-14}\, \mathrm d x $$ | 1 |
| 3467 | $$ \displaystyle\int n-l{\cdot}{\mathrm{e}}^{-ax}\, \mathrm d x $$ | 1 |
| 3468 | $$ \displaystyle\int \sqrt{1}-\cos\left(x\right)\, \mathrm d x $$ | 1 |
| 3469 | $$ \displaystyle\int sq{\cdot}\sqrt{1-\cos\left(x\right)}\, \mathrm d x $$ | 1 |
| 3470 | $$ \displaystyle\int sqsq{\cdot}\sqrt{t}{\cdot}\left(1-\cos\left(x\right)\right)\, \mathrm d x $$ | 1 |
| 3471 | $$ $$ | 1 |
| 3472 | $$ $$ | 1 |
| 3473 | $$ $$ | 1 |
| 3474 | $$ \displaystyle\int \dfrac{1}{{x}^{2}+2x+1}\, \mathrm d x $$ | 1 |
| 3475 | $$ \displaystyle\int^{1}_{0} \dfrac{2x}{\sqrt{{x}^{2}+1}}\, \mathrm d x $$ | 1 |
| 3476 | $$ \displaystyle\int 1-3{\mathrm{e}}^{-0.2{x}^{0.5}}\, \mathrm d x $$ | 1 |
| 3477 | $$ \displaystyle\int expr901110000+831685215 \, \mathrm d x $$ | 1 |
| 3478 | $$ \displaystyle\int x{\cdot}{\mathrm{e}}^{2x}\, \mathrm d x $$ | 1 |
| 3479 | $$ \displaystyle\int \dfrac{x}{{\mathrm{e}}^{{2}^{x}}}\, \mathrm d x $$ | 1 |
| 3480 | $$ \displaystyle\int {\left(\sin\left(3x\right)\right)}^{4}\, \mathrm d x $$ | 1 |
| 3481 | $$ \displaystyle\int^{3}_{0} -\sqrt{x}+1\, \mathrm d x $$ | 1 |
| 3482 | $$ \displaystyle\int^{3}_{0} -sq{\cdot}\sqrt{t}{\cdot}x+1\, \mathrm d x $$ | 1 |
| 3483 | $$ \displaystyle\int \dfrac{1}{6-0.02x}\, \mathrm d x $$ | 1 |
| 3484 | $$ \displaystyle\int^{10}_{0} \dfrac{1}{6-0.02x}\, \mathrm d x $$ | 1 |
| 3485 | $$ $$ | 1 |
| 3486 | $$ \displaystyle\int^{5}_{1} {x}^{2}+1\, \mathrm d x $$ | 1 |
| 3487 | $$ \displaystyle\int 34xco+1\, \mathrm d x $$ | 1 |
| 3488 | $$ $$ | 1 |
| 3489 | $$ $$ | 1 |
| 3490 | $$ $$ | 1 |
| 3491 | $$ $$ | 1 |
| 3492 | $$ $$ | 1 |
| 3493 | $$ $$ | 1 |
| 3494 | $$ $$ | 1 |
| 3495 | $$ $$ | 1 |
| 3496 | $$ $$ | 1 |
| 3497 | $$ $$ | 1 |
| 3498 | $$ $$ | 1 |
| 3499 | $$ $$ | 1 |
| 3500 | $$ $$ | 1 |
