" 0.Show that "|[1,x,x^(2)],[x^(2),1,x],...

" 0.Show that "|[1,x,x^(2)],[x^(2),1,x],[x,x^(2),1]|=(1

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show that |[1,x,x^2],[x^2,1,x],[x,x^2,1]| = (1-x^3)^2

By using properties of determinants. Show that: |[1,x,x^2],[x^2, 1,x],[x,x^2, 1]|=(1-x^3)^2

By using properties of determinants, show that : |[1,x,x^2],[x^2,1,x],[x,x^2,1]| = (1-x^3)^2

By using properties of determinants.Show that: det[[1,x,x^(2)x^(2),1,xx,x^(2),1]]=(1-x^(3))^(2)

By using properties of determinants , show that : {:[( 1,x,x^(2) ),( x^(2) ,1,x) ,( x,x^(2), 1) ]:} =( 1-x^(3)) ^(2)

By using properties of determinants , show that : {:[( 1,x,x^(2) ),( x^(2) ,1,x) ,( x,x^(2), 1) ]:} =( 1-x^(3)) ^(2)

By using properties of determinants , show that : {:|( 1,x,x^(2) ),( x^(2) ,1,x) ,( x,x^(2), 1) |:} =( 1-x^(3)) ^(2)

By using properties of determinants , show that : {:|( 1,x,x^(2) ),( x^(2) ,1,x) ,( x,x^(2), 1) |:} =( 1-x^(3)) ^(2)

Prove that |(1,x,x^2),(x^2,1,x),(x,x^2,1)|=(1-x^2) .

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