028.43. Решите уравнение: a) $8x(1 + 2x) - (4x + 3)(4x - 3) = 2x$; б) $x - 3x(1 - 12x) = 11 - (5 - 6x)(6x + 5)$; в) $(6x - 1)(6x + 1) - 4x(9x + 2) = -1$; г) $(8 - 9x)x = -40 + (6 - 3x)(6 + 3x)$.

a) $8x(1 + 2x) - (4x + 3)(4x - 3) = 2x$; $8x + 16x^2 - (16x^2 - 9) = 2x$; $8x + 16x^2 - 16x^2 + 9 = 2x$; $8x + 9 = 2x$; $6x = -9$; $x = -\frac{9}{6} = -\frac{3}{2} = -1.5$. б) $x - 3x(1 - 12x) = 11 - (5 - 6x)(6x + 5)$; $x - 3x + 36x^2 = 11 - (25 - 36x^2)$; $-2x + 36x^2 = 11 - 25 + 36x^2$; $-2x = -14$; $x = 7$. в) $(6x - 1)(6x + 1) - 4x(9x + 2) = -1$; $36x^2 - 1 - 36x^2 - 8x = -1$; $-8x = 0$; $x = 0$. г) $(8 - 9x)x = -40 + (6 - 3x)(6 + 3x)$; $8x - 9x^2 = -40 + (36 - 9x^2)$; $8x - 9x^2 = -40 + 36 - 9x^2$; $8x = -4$; $x = -\frac{4}{8} = -\frac{1}{2} = -0.5$.