What is the sum of the squares of the roots of #x^2-5x+4=0#?

1 Answer
Shwetank Mauria
Dec 21, 2017

Sum of squares of roots is #17#.

Explanation:

In an equation of the type #ax^2+bx+c=0#, if roots are #alpha# and #beta#, then sum of roots #alpha+beta=-b/a# and product of the roots #alphabeta=c/a#.

As the given equation is #x^2-5x+4=0#, we have #alpha+beta=5# and #alphabeta=4#

As such sum of squares of roots i.e.

#alpha^2+beta^2#

= #alpha^2+beta^2+2alphabeta-2alphabeta#

= #(alpha+beta)^2-2alphabeta#

= #5^2-2xx4#

= #25-8#

= #17#

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