If the vectors 2i - j + k,i + 2j - 3k,and 3i | vedclass

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(D) Three vectors $\vec{a}, \vec{b}, \vec{c}$ are coplanar if and only if their scalar triple product is zero,i.e.,$[\vec{a} \, \vec{b} \, \vec{c}] =

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$-4$

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(D) Three vectors $\vec{a}, \vec{b}, \vec{c}$ are coplanar if and only if their scalar triple product is zero,i.e.,$[\vec{a} \, \vec{b} \, \vec{c}] = 0$.The scalar triple product is given by the determinant of the components of the vectors:$\begin{vmatrix} 2 & -1 & 1 \ 1 & 2 & -3 \ 3 & \lambda & 5 \end{vmatrix} = 0$Expanding the determinant along the first row:$2(2 	imes 5 - (-3) 	imes \lambda) - (-1)(1 	imes 5 - (-3) 	imes 3) + 1(1 	imes \lambda - 2 	imes 3) = 0$$2(10 + 3\lambda) + 1(5 + 9) + 1(\lambda - 6) = 0$$20 + 6\lambda + 14 + \lambda - 6 = 0$$7\lambda + 28 = 0$$7\lambda = -28$$\lambda = -4$Therefore,the correct option is $D$.

If the vectors $2i - j + k$,$i + 2j - 3k$,and $3i + \lambda j + 5k$ are coplanar,then $\lambda = $

Similar Questions

If $\vec{a}, \vec{b}, \vec{c}$ are non-coplanar vectors and $\lambda$ is a real number,then for what value of $\lambda$ are the vectors $\vec{a} + 2\vec{b} + 3\vec{c}$,$\lambda\vec{b} + 4\vec{c}$,and $(2\lambda - 1)\vec{c}$ non-coplanar?

$(\bar{a}+2 \bar{b}-\bar{c}) \cdot \{(\bar{a}-\bar{b}) \times (\bar{a}-\bar{b}-\bar{c})\} = $

If $\bar{a}$,$\bar{b}$,and $\bar{c}$ are non-coplanar vectors and $(\bar{a} + \bar{b} + \bar{c}) \cdot (\bar{a} \times \bar{b} + \bar{b} \times \bar{c} + \bar{c} \times \bar{a}) = k[\bar{a} \bar{b} \bar{c}]$,then the value of $k$ is:

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