Let a = i - k, b = xi + j + (1 - x)k, and c = | vedclass

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(C) The scalar triple product $[a\,b\,c]$ is given by the determinant of the components of the vectors $a$, $b$, and $c$: $[a\,b\,c] = \begin{vmatrix}

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Neither $x$ nor $y$

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(C) The scalar triple product $[a\,b\,c]$ is given by the determinant of the components of the vectors $a$, $b$, and $c$: $[a\,b\,c] = \begin{vmatrix} 1 & 0 & -1 \ x & 1 & 1 - x \ y & x & 1 + x - y \end{vmatrix}$ Applying the column operation $C_3 	o C_3 + C_1$: $[a\,b\,c] = \begin{vmatrix} 1 & 0 & 0 \ x & 1 & 1 \ y & x & 1 + x \end{vmatrix}$ Expanding along the first row: $[a\,b\,c] = 1 	imes \begin{vmatrix} 1 & 1 \ x & 1 + x \end{vmatrix} - 0 + 0 = (1 + x) - x = 1$. Since the result is a constant $1$, the value of $[a\,b\,c]$ does not depend on $x$ or $y$.

Let $a = i - k$, $b = xi + j + (1 - x)k$, and $c = yi + xj + (1 + x - y)k$. Then $[a\,b\,c]$ depends on

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