How do you form a polynomial function whose zeros are 3 and 4 + i?
1 Answer
Feb 14, 2016
Convert zeros to factors and multiply out to find the simplest possible polynomials.
Explanation:
If
So the simplest polynomial with these zeros is:
(x-3)(x-(4+i)) = x^2-(7+i)x+(12+3i)
If you want Real coefficients, then the Complex conjugate
(x-3)(x-(4+i))(x-(4-i))
=(x-3)((x-4)^2-i^2)
=(x-3)(x^2-8x+17)
=x^3-11x^2+41x-51
Any polynomial with these zeros must be a multiple (scalar or polynomial) of these 'simplest' polynomials.
