Prove that | (b+c)^2 a^2 a^2 | | b^2 (c+a)^2 b^2 | = 2abc(a+b+c)^3 | c^2 c^2 (a+b)^2 | This question has not been answered yet! Don't worry! You can check out similar questions with solutions below Prove that | (b+c)^2 a^2 a^2 | | b^2 (c+a)^2 b^2 | = 2abc ... Prove that the determinant (b+c)² ... c² (a+b)² =2abc(a+b+c)3Subtract: −2abc from −8abcWho it come 2abc ? 3/3 in down 2√2a³+8b³-27c³+18√2abc
