If `alpha` and `beta` are the roots of the equation `1+ x+ x^2 =0`, then the matrix product is equal to `[[1,beta],[alpha,alpha]].[[alpha,beta],[1,beta]]`

2x^(2) + 3x - alpha - 0 " has roots "-2 and beta " while the equation "x^(2) - 3mx + 2m^(2) = 0 " has both roots positive, where " alpha gt 0 and beta gt 0. If alpha and beta are the roots of the equation 1+x+x^(2) = 0 , then the matrix product [{:(1,beta),(alpha,alpha):}],[{:(alpha,beta),(1,beta):}] is equal to

If alpha , beta are the roots of the equation 1 + x + x^(2) = 0 , then the matrix product [{:( 1 , beta) , (alpha , alpha):}] [{:(alpha , beta) , (1 , beta):}] is equal to

If alpha and beta are the roots of the equation 1+x+x^(2)=0 , then the matrix product [{:(1, beta),(alpha,alpha):}][{:(alpha, beta),(1,beta):}] is equal to :

If alpha and beta are the roots of the equations x^2-p(x+1)-c=0 , then (alpha+1)(beta+1)_ is equal to:

If alpha and beta are the roots of the equation x^2+x+1=0 , then alpha^2+beta^2 is equal to:

If alpha" and "beta are the roots of the equation x^(2)+3x-4=0 , then (1)/(alpha)+(1)/(beta) is equal to

If alpha and beta are the roots of the equation x ^(2) + 3x - 4 = 0 , then (1)/(alpha ) + (1)/(beta) is equal to