If `alpha, beta` are real and `alpha^2,-beta^2` are the roots of the equation `a^2x^2+x+(1-a^2)=0(a > 1),` then `beta^2`

If alpha,beta are real and alpha^(2),-beta^(2) are the roots of the equation a^(2)x^(2)+x+(1-a^(2))=0(a>1), then beta^(2)

If alpha,beta are real and alpha^(2),-beta^(2) are the roots of the equation a^(2)x^(2)+x+(1-a^(2))=0(a>1) then beta^(2)= 1) a^(2)2113)1-a^(2)4)1+a^(2)

If alpha, beta are real and alpha^(2), beta^(2) are the roots of the equation a^(2)x^(2)-x+1-a^(2)=0 (1/sqrt2 lt a lt 1) and beta^(2) ne 1," then "beta^(2)=

IF alpha , beta are real and alpha ^2 , - beta ^2 are the roots of a ^2 x^2+x+1-a^2=0 (A gt 1) then beta ^2 =

IF alpha , beta are real and alpha ^2 , - beta ^2 are the roots of a ^2 x^2+x+1-a^2=0 (A gt 1) then beta ^2 =

If alpha and beta are real and alpha^(2) and -beta^(2) are roots of a^(2)x^(2)+x+1-a^(2)=0a>1 then beta^(2) is

If alpha and beta are the roots of the equations x^2-x+1 = 0 , then (alpha)^2+(beta)^2 is

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 roots of the equation x^(2) + x + 1 = 0, then alpha^(2) + beta^(2) is