If a, b, c are non-coplanar vectors and lambda is a real number, then [lambda(A+b)lambda^(2)b lambdac]=[a(b+c)b] for

If a, b, c are non-coplanar vectors and lambda is a real number, then

1.	If a, b, c are non-coplanar vectors and lambda is a real number, then [lambda(A+b)lambda^(2)b lambdac]=[a(b+c)b] for
Answer» exactly TWO VALUES of `lambda` exactly THREE values of `lambda` no volue of `lambda` exactly one value of `lambda` SOLUTION :Given , `[lambda(a+b) lambda^(2)b lambdac]= [a(b+c)b]` `\|{:(lambda(a_(1)+b_(1)),lambda(a_(2)+b_(2)),lambda(a_(3) + b_(3))),(lambda^(2)b_(1),lambda^(2)b_(2),lambda^(2)b_(3)),(lambdac_(1),lambdac_(2),lambdac_(3)):}\|=\|{:(a_(1),b_(1)+c_(1),b_(1)),(a_(2),b_(2)+c_(2) ,b_(2)),(a_(3),b_(3)+c_(3),b_(3)):}\| = \|{:(a_(1),a_(2),a_(3)),(b_(1)+c_(1),b_(2)+c_(2),b_(3)+c_(3)),(b_(1),b_(2),b_(3)):}\|` `RARR lambda^(4)\|{:(a_(1),a_(2),a_(3)),(b_(1),b_(2),b_(3)),(c_(1),c_(2),c_(3)):}\|= - \|{:(a_(1),a_(2),a_(3)),(b_(1),b_(2),b_(3)),(c_(1),c_(2),c_(3)):}\|` `rArr lambda^(4) = - 1` So, no value of `lambda` exists.

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If a, b, c are non-coplanar vectors and lambda is a real number, then [lambda(A+b)lambda^(2)b lambdac]=[a(b+c)b] for

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