If a neq 0, b neq 0, c neq 0,then which of th | vedclass

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(C) Given the properties of the vector cross product,we know that the cross product is anticommutative,i.e.,$u 	imes v = -(v 	imes u)$.Consider the

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$a 	imes (b - c) = (c - b) 	imes a$

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(C) Given the properties of the vector cross product,we know that the cross product is anticommutative,i.e.,$u 	imes v = -(v 	imes u)$.Consider the expression $a 	imes (b - c)$.Using the distributive property,we have $a 	imes (b - c) = a 	imes b - a 	imes c$.Now consider the right-hand side: $(c - b) 	imes a = c 	imes a - b 	imes a$.Using the anticommutative property,$c 	imes a = -(a 	imes c)$ and $b 	imes a = -(a 	imes b)$.Substituting these into the expression,we get $(c - b) 	imes a = -(a 	imes c) - (-(a 	imes b)) = a 	imes b - a 	imes c$.Since both sides are equal,the statement $a 	imes (b - c) = (c - b) 	imes a$ is true.

If $a \neq 0, b \neq 0, c \neq 0$,then which of the following statements is true?

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