Integrals
(the database of solved problems)
All the problems and solutions shown below were generated using the Integral Calculator.
| ID |
Problem |
Count |
| 4751 | $$ \displaystyle\int^{1}_{0} \sin\left(x\right){\cdot}\cos\left(x\right)\, \mathrm d x $$ | 1 |
| 4752 | $$ \displaystyle\int^{2}_{1} {\left({x}^{2}-1\right)}^{\frac{1}{2}}\, \mathrm d x $$ | 1 |
| 4753 | $$ \displaystyle\int 0.62\, \mathrm d x $$ | 1 |
| 4754 | $$ \displaystyle\int^{0.77}_{0.50} 0.62\, \mathrm d x $$ | 1 |
| 4755 | $$ \displaystyle\int 1.12\, \mathrm d x $$ | 1 |
| 4756 | $$ \displaystyle\int -0.478\, \mathrm d x $$ | 1 |
| 4757 | $$ \displaystyle\int 0.62\, \mathrm d x $$ | 1 |
| 4758 | $$ \displaystyle\int \dfrac{1}{1+{\left(\cos\left(x\right)\right)}^{3}}\, \mathrm d x $$ | 1 |
| 4759 | $$ \displaystyle\int x+1\, \mathrm d x $$ | 1 |
| 4760 | $$ \displaystyle\int x+1\, \mathrm d x $$ | 1 |
| 4761 | $$ \displaystyle\int^{0}_{-1} x+1\, \mathrm d x $$ | 1 |
| 4762 | $$ \displaystyle\int^{0}_{-1} x+1\, \mathrm d x $$ | 1 |
| 4763 | $$ \displaystyle\int \dfrac{10{\mathrm{e}}^{x}+3{\mathrm{e}}^{-x}}{10{\mathrm{e}}^{x}-3{\mathrm{e}}^{-x}}\, \mathrm d x $$ | 1 |
| 4764 | $$ \displaystyle\int^{\pi/2}_{0} {\left(\cos\left(x\right)\right)}^{6}\, \mathrm d x $$ | 1 |
| 4765 | $$ $$ | 1 |
| 4766 | $$ $$ | 1 |
| 4767 | $$ $$ | 1 |
| 4768 | $$ \displaystyle\int x\, \mathrm d x $$ | 1 |
| 4769 | $$ \displaystyle\int^{2}_{0} x\, \mathrm d x $$ | 1 |
| 4770 | $$ \displaystyle\int 10+2{t}^{2}\, \mathrm d x $$ | 1 |
| 4771 | $$ \displaystyle\int 1+\dfrac{x}{1}-x\, \mathrm d x $$ | 1 |
| 4772 | $$ \displaystyle\int \dfrac{1}{\sqrt{2{\pi}}}{\cdot}\dfrac{1}{{x}^{4}+5{x}^{2}+4}{\cdot}{\mathrm{e}}^{i{\cdot}xa}\, \mathrm d x $$ | 1 |
| 4773 | $$ \displaystyle\int \dfrac{1}{s}{\cdot}q{\cdot}\sqrt{t}{\cdot}2{\pi}{\cdot}\dfrac{1}{{x}^{4}+5{x}^{2}+4}{\cdot}{\mathrm{e}}^{i{\cdot}x}\, \mathrm d x $$ | 1 |
| 4774 | $$ \displaystyle\int^{e^3}_{1} {x}^{4}{\cdot}\ln\left(x\right)\, \mathrm d x $$ | 1 |
| 4775 | $$ \displaystyle\int -c{x}^{-1}\, \mathrm d x $$ | 1 |
| 4776 | $$ \displaystyle\int -2{x}^{-1}\, \mathrm d x $$ | 1 |
| 4777 | $$ $$ | 1 |
| 4778 | $$ \displaystyle\int \dfrac{8}{5x+4}\, \mathrm d x $$ | 1 |
| 4779 | $$ \displaystyle\int^{3}_{1} \left(x-6\right){\cdot}{\left(x+2\right)}^{\frac{1}{7}}\, \mathrm d x $$ | 1 |
| 4780 | $$ \displaystyle\int \left(x-8\right){\cdot}{x}^{\frac{7}{2}}\, \mathrm d x $$ | 1 |
| 4781 | $$ \displaystyle\int \sqrt{25-{x}^{2}}\, \mathrm d x $$ | 1 |
| 4782 | $$ \displaystyle\int {x}^{3}{\cdot}{\left({x}^{2}+27\right)}^{0.5}\, \mathrm d x $$ | 1 |
| 4783 | $$ \displaystyle\int \dfrac{6x}{6x+2}\, \mathrm d x $$ | 1 |
| 4784 | $$ \displaystyle\int \cos\left(-7x\right)\, \mathrm d x $$ | 1 |
| 4785 | $$ \displaystyle\int^{15}_{0.5} x{\cdot}\cos\left(2x\right)\, \mathrm d x $$ | 1 |
| 4786 | $$ \displaystyle\int^{1.5}_{0.5} x{\cdot}\cos\left(2x\right)\, \mathrm d x $$ | 1 |
| 4787 | $$ \displaystyle\int \dfrac{1}{2}{\cdot}\left(x-3\right)+\dfrac{3}{2}-x\, \mathrm d x $$ | 1 |
| 4788 | $$ \displaystyle\int \dfrac{2{\cdot}\sqrt{t}}{\sqrt{t}}\, \mathrm d x $$ | 1 |
| 4789 | $$ \displaystyle\int^{1}_{0} {x}^{\frac{1}{x}}\, \mathrm d x $$ | 1 |
| 4790 | $$ \displaystyle\int^{1}_{0} {x}^{x}\, \mathrm d x $$ | 1 |
| 4791 | $$ \displaystyle\int^{1}_{0} 3{x}^{2}\, \mathrm d x $$ | 1 |
| 4792 | $$ \displaystyle\int 3{x}^{2}\, \mathrm d x $$ | 1 |
| 4793 | $$ x $$ | 1 |
| 4794 | $$ \displaystyle\int \dfrac{5}{x}\, \mathrm d x $$ | 1 |
| 4795 | $$ \displaystyle\int \dfrac{{x}^{2}-3x+2}{x+1}\, \mathrm d x $$ | 1 |
| 4796 | $$ $$ | 1 |
| 4797 | $$ $$ | 1 |
| 4798 | $$ \displaystyle\int 0.2{\cdot}\cos\left(x\right)+1.8\, \mathrm d x $$ | 1 |
| 4799 | $$ \displaystyle\int 3{x}^{3}-2x+1\, \mathrm d x $$ | 1 |
| 4800 | $$ \displaystyle\int^{10}_{0} 3{x}^{3}-2x+1\, \mathrm d x $$ | 1 |
