Integrals
(the database of solved problems)
All the problems and solutions shown below were generated using the Integral Calculator.
| ID |
Problem |
Count |
| 3901 | $$ $$ | 1 |
| 3902 | $$ $$ | 1 |
| 3903 | $$ $$ | 1 |
| 3904 | $$ \displaystyle\int^{1}_{0} sq{\cdot}\sqrt{t}{\cdot}\left({x}^{2}-2x+1\right)\, \mathrm d x $$ | 1 |
| 3905 | $$ \displaystyle\int^{1}_{0} \sqrt{{x}^{2}-2x+1}\, \mathrm d x $$ | 1 |
| 3906 | $$ \displaystyle\int 14{\cdot}\sqrt{5}\, \mathrm d x $$ | 1 |
| 3907 | $$ \displaystyle\int 1-{x}^{2}\, \mathrm d x $$ | 1 |
| 3908 | $$ \displaystyle\int \dfrac{x}{\sin\left(x\right)}\, \mathrm d x $$ | 1 |
| 3909 | $$ \displaystyle\int^{10}_{5} \sqrt{x+\sqrt{20x-100}}+\sqrt{x-\sqrt{20x-100}}\, \mathrm d x $$ | 1 |
| 3910 | $$ \displaystyle\int {x}^{3}-\dfrac{1}{1}\, \mathrm d x $$ | 1 |
| 3911 | $$ \displaystyle\int \dfrac{{x}^{3}}{{\left(2{x}^{4}-8x\right)}^{3.2}}-\dfrac{1}{{\left(2{x}^{4}-8x\right)}^{3.2}}\, \mathrm d x $$ | 1 |
| 3912 | $$ \displaystyle\int 60{\cdot}\sin\left(x\right)\, \mathrm d x $$ | 1 |
| 3913 | $$ \displaystyle\int -60{\cdot}\sin\left(2\right){\cdot}x\, \mathrm d x $$ | 1 |
| 3914 | $$ \displaystyle\int 60{\cdot}\sin\left(2x\right)\, \mathrm d x $$ | 1 |
| 3915 | $$ \displaystyle\int -60{\cdot}\sin\left(2x\right)\, \mathrm d x $$ | 1 |
| 3916 | $$ \displaystyle\int -60{\cdot}\sin\left(2x\right)+60{\cdot}\sin\left(x\right)-60{\cdot}\sin\left(2x\right)\, \mathrm d x $$ | 1 |
| 3917 | $$ \displaystyle\int^{3.14}_{1.317} -60{\cdot}\sin\left(2x\right)+60{\cdot}\sin\left(x\right)-60{\cdot}\sin\left(2x\right)\, \mathrm d x $$ | 1 |
| 3918 | $$ \displaystyle\int^{7}_{4} 11-2x\, \mathrm d x $$ | 1 |
| 3919 | $$ \displaystyle\int^{4}_{0} \sqrt{1+x}\, \mathrm d x $$ | 1 |
| 3920 | $$ \displaystyle\int^{1}_{0} \sqrt{\dfrac{1}{1+x}}\, \mathrm d x $$ | 1 |
| 3921 | $$ \displaystyle\int^{2}_{0} {3}^{-x}\, \mathrm d x $$ | 1 |
| 3922 | $$ \displaystyle\int \dfrac{1}{x{\cdot}{\left(\ln\left(x\right)\right)}^{4}}\,rb1=def $$ | 1 |
| 3923 | $$ \displaystyle\int \ln\left(x+\sqrt{x}\right)\, \mathrm d x $$ | 1 |
| 3924 | $$ \displaystyle\int 0.75x+0.2\, \mathrm d x $$ | 1 |
| 3925 | $$ \displaystyle\int^{4}_{3} 0.75x+0.2\, \mathrm d x $$ | 1 |
| 3926 | $$ \int^{8}_{2} {x}^{{2}}{\ln{{\left({3}\right)}}} \, d\,x $$ | 1 |
| 3927 | $$ \int^{3}_{1} \frac{{2}}{\pi} \, d\,x $$ | 1 |
| 3928 | $$ \displaystyle\int \cos\left(\dfrac{n{\cdot}{\pi}{\cdot}x}{10}\right){\cdot}\cos\left({\pi}{\cdot}x\right)\, \mathrm d x $$ | 1 |
| 3929 | $$ \displaystyle\int^{20}_{0} \sin\left(\dfrac{n{\cdot}{\pi}{\cdot}x}{20}\right){\cdot}\sin\left({\pi}{\cdot}x\right)\, \mathrm d x $$ | 1 |
| 3930 | $$ $$ | 1 |
| 3931 | $$ $$ | 1 |
| 3932 | $$ $$ | 1 |
| 3933 | $$ $$ | 1 |
| 3934 | $$ $$ | 1 |
| 3935 | $$ $$ | 1 |
| 3936 | $$ $$ | 1 |
| 3937 | $$ $$ | 1 |
| 3938 | $$ $$ | 1 |
| 3939 | $$ $$ | 1 |
| 3940 | $$ $$ | 1 |
| 3941 | $$ $$ | 1 |
| 3942 | $$ $$ | 1 |
| 3943 | $$ $$ | 1 |
| 3944 | $$ $$ | 1 |
| 3945 | $$ $$ | 1 |
| 3946 | $$ $$ | 1 |
| 3947 | $$ $$ | 1 |
| 3948 | $$ $$ | 1 |
| 3949 | $$ $$ | 1 |
| 3950 | $$ $$ | 1 |
