• (3c² - 6b³)·(6c³ - 3x^-1) =
• (8b^-2 + 7x²)·(8b^-2 - 7x²) =
• (7b - 5c^-1)·(7b³ - 7a^-1) =
• (3c - 3cos(π)^-1)·(3cos(0)² - 3c²) =
• (3c³ + c)·(6cos(2π/3)² + 3cos(0)^-2) =
• (7a^-1 + 5x²)² =
• (cos(2π/3) + 3c³)·(cos(2π/3) - 3c³) =
• (7b^-1 - 5cos(π/2)^-2)·(7b^-1 + 5cos(π/2)^-2) =
• (3a^-1 - 5a²)·(c - a^-2) =
• (5x^-2 + 3b^-1)·(5x^-2 - 3b^-1) =
• (3a³ + 5a²)² =
• (6cos(2π/3)^-2 - 6c^-2)² =
• (8cos(π)^-2 - 8x²)·(8cos(π)^-2 + 8x²) =
• (3cos(0) + 3cos(π/2)³)² =
• (5x^-2 + 5b)·(5x^-2 - 5b) =
• (6a³ - 3cos(2π/3))² =
• (a³ - 8c)·(8cos(π)^-2 - 7b) =
• (c - b)² =
• (8b² - 6b^-1)·(8b² + 6b^-1) =
• (5x + 8cos(π)^-2)·(8cos(π/2)² - 5a³) =
• (3a - 7x³)² =
• (5x² + 7cos(π)^-2)·(3b^-1 - 7a^-1) =
• (8c² - 5x³)·(x² - 3x) =
• (7x³ - 6x²)·(7x³ + 6x²) =
• (6c^-2 - 5cos(π/2)²)² =