If A=[(0,c,-b),(-c,0,a),(b,-a,0)] then A...

If `A=[(0,c,-b),(-c,0,a),(b,-a,0)]` then `A^(3)=`

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If /_\=|(0,c,b),(c,0,a),(b,a,0)|, then /_\=

|(0,b,-c),(-b,0,a),(c,-a,0)|=

|(0,a,-b),(-a,0,-c),(b,c,0)| = 0

The value of the determinant of A = [(0,a,-b),(-a,0,c),(b,-c,0)] is

The value of the determinant A=[(0,a,-b),(-a,0,c),(b,-c,0)] is

If {:A=[(a,0,0),(0,b,0),(0,0,c)]:}," then "A^(-1) , is..... a) [(a,0,0),(0,(1)/(b),0),(0,0,c)] b) [((1)/(0),0,0),(0,(1)/(b),0),(0,0,c)] c) [(a,0,0),(0,(1)/(b),0),(0,0,(1)/(c))] d) [((1)/(a),0,0),(0,(1)/(b),0),(0,0,(1)/(c))]

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