If the equation `z^3 + (3 + l)^(z^2) - 32 - (m + l)= 0,` `m in R` , has at least one real root, then sum of possible values of m, is

If the equation z^(3)+(3+i)z^(2)-3z-(m+i)=0, " where " i=sqrt(-1) " and " m in R , has atleast one real root, value of m is

If the equation (1+m)x^(2)-2(1+3m)x+(1+8m)=0 where m in R-{-1}, has at least one root is

If 3x^(2) -17x+10 =0 and x^(2)-5x+m =0 has a common root, then sum of all possible real values of 'm' is:

The equation z^2 - (3 + i) z + (m + 2i) = 0 m in R , has exactly one real and one non real complex root, then product of real root and imaginary part of non-real complex root is:

If m in Z and the equation m x^(2) + (2m - 1) x + (m - 2) = 0 has rational roots, then m is of the form

Let A={a in R} the equation (1+2i)x^(3)-2(3+i)x^(2)+(5-4i)x+a^(2)=0 has at least one real root.Then the value of (sum a^(2))/(2) is

The azimathal quantum number l of an arbital is 3 what are the possible values of m ?

What are the possible values of m_(l) for an electron with l=2 ?

Let z be a complex number satisfying the equation z^(2)-(3+i)z+m+2i=0, wherem in R Suppose the equation has a real root.Then root non-real root.