Polynomial From Roots – Solved Problems Database
All the problems and solutions shown below were generated using the Polynomial From Roots Calculator.
ID |
Problem |
Count |
3001 | Find the polynomial having roots at $ \dfrac{ 3 }{ 2 } $ and $ \dfrac{ 1 }{ 3 } $ . | 1 |
3002 | Find the polynomial having roots at $ 2 $ , $ -1 $ and $ \dfrac{ 173 }{ 100 } $ . | 1 |
3003 | Find the polynomial having roots at $ 6 $ and $ 36 $ . | 1 |
3004 | Find the polynomial having roots at $ 5 $ , $ -20 $ and $ -10 $ . | 1 |
3005 | Find the polynomial having roots at $ \dfrac{ 113 }{ 100 } $ . | 1 |
3006 | Find the polynomial having roots at $ 1 $ , $ 1 $ , $ 1 $ and $ -2 $ . | 1 |
3007 | Find the polynomial having roots at $ -3 $ and $ -2 $ . | 1 |
3008 | Find the polynomial having roots at $ -3 $ and $ 2 $ . | 1 |
3009 | Find the polynomial having roots at $ 1 $ and $ 16 $ . | 1 |
3010 | Find the polynomial having roots at $ \dfrac{ 2729 }{ 1000 } $ and $ -\dfrac{ 2729 }{ 1000 } $ . | 1 |
3011 | Find the polynomial having roots at $ -1 $ , $ 4 $ and $ -7 $ . | 1 |
3012 | Find the polynomial having roots at $ \dfrac{ 3 }{ 5 } $ and $ 4 $ . | 1 |
3013 | Find the polynomial having roots at $ -5 $ , $ -5 $ , $ -4 $ and $ -4 $ . | 1 |
3014 | Find the polynomial having roots at $ 0 $ and $ -6 $ . | 1 |
3015 | Find the polynomial having roots at $ 15 $ and $ 22 $ . | 1 |
3016 | Find the polynomial having roots at $ -2 $ , $ \dfrac{ 9 }{ 20 } $ and $ 3 $ . | 1 |
3017 | Find the polynomial having roots at $ 3 $ , $ -6 $ , $ -7 $ and $ 1 $ . | 1 |
3018 | Find the polynomial having roots at $ -1 $ , $ 3 $ and $ 4 $ . | 1 |
3019 | Find the polynomial having roots at $ 3 $ , $ -2 $ and $ -1 $ . | 1 |
3020 | Find the polynomial having roots at $ -3 $ , $ 3 $ and $ 8 $ . | 1 |
3021 | Find the polynomial having roots at $ -5 $ , $ 5 $ , $ 4 $ and $ 0 $ . | 1 |
3022 | Find the polynomial having roots at $ \dfrac{ 233 }{ 189 } $ . | 1 |
3023 | Find the polynomial having roots at $ -7 $ , $ 0 $ and $ 6 $ . | 1 |
3024 | Find the polynomial having roots at $ -828 $ . | 1 |
3025 | Find the polynomial having roots at $ 2 $ , $ 2 $ and $ 2 $ . | 1 |
3026 | Find the polynomial having roots at $ 420 $ and $ 69 $ . | 1 |
3027 | Find the polynomial having roots at $ -5 $ and $ 20 $ . | 1 |
3028 | Find the polynomial having roots at $ -5 $ , $ 3 $ and $ 3 $ . | 1 |
3029 | Find the polynomial having roots at $ -5 $ , $ -4 $ , $ 1 $ and $ 3 $ . | 1 |
3030 | Find the polynomial having roots at $ 5 $ , $ 0 $ and $ -2 $ . | 1 |
3031 | Find the polynomial having roots at $ -7 $ , $ -3 $ , $ 1 $ and $ 0 $ . | 1 |
3032 | Find the polynomial having roots at $ 5 $ , $ -2 $ and $ 3 $ . | 1 |
3033 | Find the polynomial having roots at $ 555 $ , $ 5555 $ and $ 555 $ . | 1 |
3034 | Find the polynomial having roots at $ -3 $ , $ 0 $ , $ 0 $ and $ 5 $ . | 1 |
3035 | Find the polynomial having roots at $ 5 $ , $ -4 $ and $ -\dfrac{ 1 }{ 2 } $ . | 1 |
3036 | Find the polynomial having roots at $ 2 $ , $ -9 $ , $ -3 $ , $ -3 $ and $ 5 $ . | 1 |
3037 | Find the polynomial having roots at $ -4 $ and $ -8 $ . | 1 |
3038 | Find the polynomial having roots at $ 6 $ and $ 9 $ . | 1 |
3039 | Find the polynomial having roots at $ 2 $ , $ 3 $ , $ -2 $ and $ -2 $ . | 1 |
3040 | Find the polynomial having roots at $ 2 $ , $ -2 $ , $ -3 $ and $ 5 $ . | 1 |
3041 | Find the polynomial having roots at $ -6 $ and $ -1 $ . | 1 |
3042 | Find the polynomial having roots at $ -\dfrac{ 2 }{ 3 } $ , $ 1 $ , $ -2 $ and $ 3 $ . | 1 |
3043 | Find the polynomial having roots at $ \dfrac{ 10 }{ 3 } $ . | 1 |
3044 | Find the polynomial having roots at $ 3 $ , $ -3 $ and $ 1 $ . | 1 |
3045 | Find the polynomial having roots at $ 1 $ and $ 8 $ . | 1 |
3046 | Find the polynomial having roots at $ 4 $ , $ -4 $ and $ 9 $ . | 1 |
3047 | Find the polynomial having roots at $ 5 $ and $ 55 $ . | 1 |
3048 | Find the polynomial having roots at $ -3 $ , $ 4 $ , $ -\dfrac{ 1 }{ 4 } $ , $ \dfrac{ 3 }{ 2 } $ , $ -6 $ , $ 8 $ and $ -5 $ . | 1 |
3049 | Find the polynomial having roots at $ -559 $ . | 1 |
3050 | Find the polynomial having roots at $ 5 $ , $ 5 $ and $ 5 $ . | 1 |