consider the fourth -degree polynomial equation `|{:(a_(1)+b_(1)x,,a_( – InterviewSolution

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1.	consider the fourth -degree polynomial equation `\|{:(a_(1)+b_(1)x,,a_(1)x^(2)+b_(1),,c_(1)),(a_(2)+b_(2)x^(2),,a_(2)x^(2)+b_(2),,c_(2)),(a_(3)+b_(3)x^(2),,a_(3)x^(2)+b_(3),,c_(3)):}\|=0` Without expanding the determinant find all the roots of the equation.
Answer» `\|{:(a_(1)+b_(1)x,,a_(1)x^(2)+b_(1),,c_(1)),(a_(2)+b_(2)x^(2),,a_(2)x^(2)+b_(2),,c_(2)),(a_(3)+b_(3)x^(2),,a_(3)x^(2)+b_(3),,c_(3)):}\|=0 ("As " C_(1) " and " C_(2) " are indentical")` So `x= +-1` are roots of the given equation . From Sarrus rule we observe that the degree of equation is 4.

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