Нужно решение уравнения, желательно полностью

1/n*(n+1) = 1/n - 1/(n+1) используем эту формулу

1/(x + 2019)(x + 2020) + 1/(x + 2020)(x + 2021) + 1/(x + 2021)(x + 2022) + 1/(x + 2022)(x + 2023) = 1/999999

1/(x + 2019) - 1/(x + 2020) + 1/(x + 2020) - 1/(x + 2021) + 1/(x + 2021) - 1/(x + 2022) + 1/(x + 2022) - 1/(x + 2023) = 1/999999

1/(x + 2019) - 1/(x + 2023) = 1/999999

(x + 2023 - x - 2019)*999999 = (x + 2019)(x + 2023)

4*999999 = x² + 4042x + 2019*2023

x² + 4042x + 2019*2023 - 4*999999 = 0

4*999999 = 4*1000000 - 4 = 3999996

2019*2023 = (2021 - 2)(2021 + 2) = 4084441 - 4 = 4084437

x² + 4042 x + 84441 = 0

D = b² - 4ac = 4042² - 4*84441 = 4*2021² - 4*84441) = 4*(4084441 - 84441) = 4*4000000 = 2²*2000² = 4000²

x12 = (-4042 +- 4000)/2 = -4021  и -21

ответ -21 и -4021