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

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

Let a, b, c be positive and not all equal. Show that the value of the determinant |[a,b,c],[b,c,a],[c,a,b]| is negative

If, a,b,c are positive and unequal,show that value of the determinant Delta ={:[( a,b,c),( b,c,a),( c,a,b)]:} is negative

If a gt 0, b gt 0, c gt0 are respectively the pth, qth, rth terms of a G.P., then the value of the determinant |(log a,p,1),(log b,q,1),(log c,r,1)| , is

If a^(2) + b^(2) + c^(3) + ab + bc + ca le 0 for all, a, b, c in R , then the value of the determinant |((a + b +2)^(2),a^(2) + b^(2),1),(1,(b +c + 2)^(2),b^(2) + c^(2)),(c^(2) + a^(2),1,(c +a +2)^(2))| , is equal to

Find (1)/(2)(A+A') and (1)/(2)(A-A') , when A=[(0, a, b),(-a,0,c),(-b,-c,0)]

witout expanding at any stage Prove that |{:(0,,a,,-b),(-a,,0,,-c),(b,,c,,0):}| =0

Using the property of determinants and without expanding {:[( 0,a,-b),(-a,0,-c),( b,c,0) ]:}=0