If a, b, c are linearly independent vectors and `delta =|(a,b,c),(a.a,a.b,a.c),(a.c,b.c,c.c)|` then (a)`delta = 0` (b) `delta = 1` (C) A=any non-zero volue (d)None of theseA. 1B. 0C. `-1`D. None of these

If a, b, c are linearly independent vectors and `delta =|(a,b,c),(a.a,

1.	If a, b, c are linearly independent vectors and `delta =\|(a,b,c),(a.a,a.b,a.c),(a.c,b.c,c.c)\|` then (a)`delta = 0` (b) `delta = 1` (C) A=any non-zero volue (d)None of theseA. 1B. 0C. `-1`D. None of these
Answer» Correct Answer - B Since a, b and c are coplanar, there must exist three scalars x,y and z not all zero such that `ax+yb+zc=0" "…(i)` ON multiplyaing both sids of Eq (i) by a and b respectively we get `xaa+ya.b+za.c =0:" "…(ii)` `ab.a+yb.b+zb.c=0" "...(iii)` On eliminating x,y and z from Eqs, (i), (ii) and (iii), we get `\|{:(a,b,c),(a.a., a.b.,b.c),(b.a, a.b, b.c):}\|=0`

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If a, b, c are linearly independent vectors and `delta =|(a,b,c),(a.a,a.b,a.c),(a.c,b.c,c.c)|` then (a)`delta = 0` (b) `delta = 1` (C) A=any non-zero volue (d)None of theseA. 1B. 0C. `-1`D. None of these

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