a bca2 b2c21+a31+b31+c3=0⇒a bca2 b2c2111+a bca2 b2c2a3 b3c3=0 (a−b)(b−c)(c−a)+abc(a−b)(b−c)(c−a)=0 (abc+1)[(a−b)(b−c)(c−a)]=0 As 111a bca2 b2c2=0 (given condition) ∴abc=−1
If abca2b2c21+a31+b31+c3=0 and vectors (1,a,a2),(a,b,b2) and (a,c,c2) are non-coplanar, then the product abc equals
Held on 30 Apr 2003 · Verified 6 Jul 2026.
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