Log₂₄(72) = log₆ 72 /log₆ 24 = log₆ (36*2) / log₆ (2*2*6) =
= [log₆ (6²) + log₆ 2] / [ log₆ 2 + log₆ 2 + log₆ 6]
Если log₆ 2 = m , то
[2m + m] / [m + m + 1] = <span> 3m / (2m+1)
</span>
2·(х²-2х+1)=2·(х-1)²
(1;0)- координаты вершины параболы
1) Умножаем на 25
x^3 - 625x = x(x^2 - 625) = x(x - 25)(x + 25) = 0
x1 = -25; x2 = 0; x3 = 25
2) x^2 = 25/64
x1 = -5/8; x2 = 5/8
3) Умножаем на 9
4x^3 - 144x = 4x(x^2 - 36) = 4x(x - 6)(x + 6) = 0
x1 = -6; x2 = 0; x3 = 6