Right Triangle
(the database of solved problems)
All the problems and solutions shown below were generated using the Right Triangle Calculator.
| ID |
Problem |
Count |
| 3951 | Find the angle $ \alpha $ of a right triangle if leg $a = 3900\, \text{cm}$ and angle $\alpha = 3^o$. | 2 |
| 3952 | Find the leg $ b $ of a right triangle if leg $a = 3900\, \text{cm}$ and angle $\alpha = 3^o$. | 2 |
| 3953 | Find the hypotenuse $ c $ of a right triangle if leg $a = 2\, \text{cm}$ and leg $b = \frac{ 6 }{ 5 }\, \text{cm}$. | 2 |
| 3954 | Find the hypotenuse $ c $ of a right triangle if leg $a = \frac{ 19 }{ 10 }\, \text{cm}$ and leg $b = \frac{ 59 }{ 50 }\, \text{cm}$. | 2 |
| 3955 | Find the hypotenuse $ c $ of a right triangle if leg $a = 11\, \text{cm}$ and leg $b = \frac{ 221 }{ 4 }\, \text{cm}$. | 2 |
| 3956 | Find the angle $ \alpha $ of a right triangle if leg $a = 11\, \text{cm}$ and leg $b = \frac{ 221 }{ 4 }\, \text{cm}$. | 2 |
| 3957 | Find the leg $ a $ of a right triangle if leg $a = \frac{ 3 }{ 2 }\, \text{cm}$ and leg $b = \frac{ 7 }{ 2 }\, \text{cm}$. | 2 |
| 3958 | Find the leg $ b $ of a right triangle if leg $a = 17\, \text{cm}$ and hypotenuse $c = 34\, \text{cm}$. | 2 |
| 3959 | Find the leg $ a $ of a right triangle if leg $a = 931\, \text{cm}$ and leg $b = 74\, \text{cm}$. | 2 |
| 3960 | Find the hypotenuse $ c $ of a right triangle if leg $a = \frac{ 5 }{ 4 }\, \text{cm}$, angle $\alpha = 75^o$ and angle $\beta = 15^o$. | 2 |
| 3961 | Find the leg $ a $ of a right triangle if hypotenuse $c = \frac{ 5 }{ 4 }\, \text{cm}$ and angle $\beta = 15^o$. | 2 |
| 3962 | Find the leg $ a $ of a right triangle if hypotenuse $c = \frac{ 113 }{ 10 }\, \text{cm}$ and angle $\alpha = 30^o$. | 2 |
| 3963 | Find the leg $ a $ of a right triangle if hypotenuse $c = \frac{ 86 }{ 25 }\, \text{cm}$ and angle $\alpha = 30^o$. | 2 |
| 3964 | Find the hypotenuse $ c $ of a right triangle if leg $a = 35\, \text{cm}$ and leg $b = 35\, \text{cm}$. | 2 |
| 3965 | Find the angle $ \beta $ of a right triangle if leg $b = 76\, \text{cm}$ and hypotenuse $c = 84\, \text{cm}$. | 2 |
| 3966 | Find the leg $ a $ of a right triangle if leg $a = 50\, \text{cm}$ and angle $\beta = 60^o$. | 2 |
| 3967 | Find the leg $ a $ of a right triangle if leg $b = 80\, \text{cm}$ and hypotenuse $c = 75\, \text{cm}$. | 2 |
| 3968 | Find the leg $ a $ of a right triangle if leg $b = 50\, \text{cm}$ and hypotenuse $c = 45\, \text{cm}$. | 2 |
| 3969 | Find the area $ A $ of a right triangle if hypotenuse $c = 80\, \text{cm}$ and angle $\beta = 60^o$. | 2 |
| 3970 | Find the area $ A $ of a right triangle if leg $a = 7\, \text{cm}$, leg $b = 80\, \text{cm}$ and hypotenuse $c = 6\, \text{cm}$. | 2 |
| 3971 | Find the area $ A $ of a right triangle if leg $a = 8\, \text{cm}$ and hypotenuse $c = 70\, \text{cm}$. | 2 |
| 3972 | Find the angle $ \beta $ of a right triangle if leg $a = 7\, \text{cm}$ and leg $b = 7\, \text{cm}$. | 2 |
| 3973 | Find the hypotenuse $ c $ of a right triangle if leg $b = 6000\, \text{cm}$ and angle $\alpha = 45^o$. | 2 |
| 3974 | Find the leg $ b $ of a right triangle if leg $b = 9000\, \text{cm}$ and angle $\alpha = 3^o$. | 2 |
| 3975 | Find the leg $ a $ of a right triangle if leg $a = 66\, \text{cm}$, hypotenuse $c = 486\, \text{cm}$ and angle $\alpha = 12^o$. | 2 |
| 3976 | Find the leg $ a $ of a right triangle if leg $a = 1\, \text{cm}$ and angle $\alpha = 27^o$. | 2 |
| 3977 | Find the hypotenuse $ c $ of a right triangle if leg $a = 32\, \text{cm}$ and angle $\alpha = 59^o$. | 2 |
| 3978 | Find the leg $ a $ of a right triangle if leg $a = 20\, \text{cm}$ and angle $\beta = 80^o$. | 2 |
| 3979 | Find the leg $ a $ of a right triangle if hypotenuse $c = 10$ and angle $\alpha = 72^o$. | 2 |
| 3980 | Find the leg $ b $ of a right triangle if hypotenuse $c = 6$ and angle $\alpha = 50^o$. | 2 |
| 3981 | Find the leg $ a $ of a right triangle if leg $a = 6$ and angle $\beta = 7^o$. | 2 |
| 3982 | Find the leg $ a $ of a right triangle if hypotenuse $c = \frac{ 5919 }{ 100 }$ and angle $\alpha = 66^o$. | 2 |
| 3983 | Find the angle $ \alpha $ of a right triangle if leg $b = 4$ and hypotenuse $c = 6$. | 2 |
| 3984 | Find the leg $ a $ of a right triangle if leg $a = 9$ and hypotenuse $c = 18$. | 2 |
| 3985 | Find the leg $ a $ of a right triangle if hypotenuse $c = 4$, angle $\alpha = 45^o$ and angle $\beta = 45^o$. | 2 |
| 3986 | Find the leg $ a $ of a right triangle if leg $a = 1$, leg $b = 1$, hypotenuse $c = 4$, angle $\alpha = 45^o$ and angle $\beta = 45^o$. | 2 |
| 3987 | Find the leg $ b $ of a right triangle if hypotenuse $c = 4$, angle $\alpha = 45^o$ and angle $\beta = 45^o$. | 2 |
| 3988 | Find the hypotenuse $ c $ of a right triangle if leg $b = 5$, angle $\alpha = 60^o$ and angle $\beta = 30^o$. | 2 |
| 3989 | Find the leg $ a $ of a right triangle if leg $a = 27$ and angle $\alpha = \frac{ 45 }{ 2 }^o$. | 2 |
| 3990 | Find the leg $ a $ of a right triangle if leg $a = \frac{ 221 }{ 5 }$ and angle $\alpha = 3^o$. | 2 |
| 3991 | Find the hypotenuse $ c $ of a right triangle if leg $b = 9$ and angle $\beta = \frac{ 5631 }{ 100 }^o$. | 2 |
| 3992 | Find the hypotenuse $ c $ of a right triangle if leg $b = 6$ and angle $\alpha = 60^o$. | 2 |
| 3993 | Find the leg $ a $ of a right triangle if hypotenuse $c = 48$, angle $\alpha = \frac{ 69 }{ 10 }^o$ and angle $\beta = \frac{ 831 }{ 10 }^o$. | 2 |
| 3994 | Find the leg $ a $ of a right triangle if hypotenuse $c = 48$ and angle $\alpha = \frac{ 69 }{ 10 }^o$. | 2 |
| 3995 | Find the leg $ b $ of a right triangle if hypotenuse $c = 48$ and angle $\alpha = \frac{ 69 }{ 10 }^o$. | 2 |
| 3996 | Find the angle $ \alpha $ of a right triangle if leg $a = \frac{ 67 }{ 10 }$ and leg $b = 2$. | 2 |
| 3997 | Find the angle $ \beta $ of a right triangle if leg $a = \frac{ 67 }{ 10 }$ and leg $b = 2$. | 2 |
| 3998 | Find the leg $ a $ of a right triangle if hypotenuse $c = 7$ and angle $\alpha = 57^o$. | 2 |
| 3999 | Find the hypotenuse $ c $ of a right triangle if leg $a = \frac{ 59 }{ 25 }$ and angle $\alpha = 45^o$. | 2 |
| 4000 | Find the hypotenuse $ c $ of a right triangle if leg $b = 72$ and angle $\alpha = 15^o$. | 2 |
