If both roots of the equation `x^2-2ax+a^2-1=0` lie between -3 and 4 and [a] denotes the integral part of a, then [a] cannot be

If both roots of the equation x^(2)-2ax+a^(2)-1=0 lie between (-2,2) then a lies in the interval

If both roots of the equation x^(2) -2ax+a^(2)-1=0 lie between -3 and 4 ,then [a] is/are , where [ ] represents the greatest ineger function

If the roots of x^(2)-2mx+m^(2)-1=0 lie between -2 and 4, then

If the roots of the equation x^(2)-4ax+4a^(2)+2a-3=0 are real and less than 3, then

Let alpha and beta (a lt beta) " be the roots of the equation " x^(2) + bx + c = 0," where " b gt 0 and c lt 0 . If both the roots of the equation x^(2) - 2 kx + k^(2) - 4 = 0 lie between -3 and 5 , then which one of the following is correct ?

If roots of the equation x^(2)-2ax+a^(2)+a-3=0 are real and less than 3 then a)a 4

If both the roots of the equation 4x^(2)-2x+m=0 lie in the interval (-1, 1) , then

If the roots of the equation x ^(2)-ax -b=0(a,b, in R) are both lying between -2 and 2, then :