2. Представьте в виде дроби: a) $$rac{3-2a}{2a} - \frac{1-a^2}{a^2}$$; б) $$rac{1}{3x+y} - \frac{1}{3x-y}$$; в) $$rac{4-3b}{b^2-2b} + \frac{3}{b-2}$$

a) $$\frac{3-2a}{2a} - \frac{1-a^2}{a^2} = \frac{a(3-2a) - 2(1-a^2)}{2a^2} = \frac{3a - 2a^2 - 2 + 2a^2}{2a^2} = \frac{3a-2}{2a^2}$$ б) $$\frac{1}{3x+y} - \frac{1}{3x-y} = \frac{(3x-y) - (3x+y)}{(3x+y)(3x-y)} = \frac{3x - y - 3x - y}{9x^2 - y^2} = \frac{-2y}{9x^2 - y^2}$$ в) $$\frac{4-3b}{b^2-2b} + \frac{3}{b-2} = \frac{4-3b}{b(b-2)} + \frac{3}{b-2} = \frac{4-3b + 3b}{b(b-2)} = \frac{4}{b(b-2)}$$