if alpha and beta are the zeros of the polynomial x²-7x+10 where alpha is greater than beta find alpha and beta
Answers
Answered by
1
Answer:
x2+7x+10=0
(x+2)(x+5)=0
α,β=−2or−5
α3+β3=(−2)3+(−5)3=(−8)+(−125)=−133
The following alternate method can be used without actually calculating zeros. This method is especially useful when we have more complicated zeros.
For quadratic polynomial: ax2+bx+c
Sum of zeros =−ba
Product of zeros =ca
Quadratic polynomial x2+7x+10 has zeros α and β
α+β=−7
αβ=10
(α+β)3=(−7)3
α3+3α2β+3αβ2+β3=−343
α3+3αβ(α+β)+β3=−343
α3+3(10)(−7)+β3=−343
α3−210+β3=−343
α3+β3=−343+210
α3+β3=−133
Step-by-step explanation:
hope it is helpful for you and please mark me brainiest please follow and give lots of thanks also
Similar questions