a)Find the roots of z^2 -6z+25=0 where zEC, and hence find the sum of the roots.
Completing the square of this gives you
and
as the roots, hence their sum is
(the sum is going to be a real number, as a simple consequence of the conjugate roots theorem).
b) Let u and v be the roots of the equation z^2+bz+c=0 where, b,c zEC.
i) show that u+v=-b and uv=c
We can rewrite a monic polynomial in terms of its roots, that is as
(z - v))
. Expanding this out and equating coefficients (since our rewrite is true for all
), you find the desired result.
ii) Hence show that if u=p=iq where p,q ER and u and v are complex conjugates, then b and c are real.
I don't quite understand what you've written here - you might need to retype this, unless I'm having a really bad day.
c) Find the quadratic equation in z which has the roots 2+root(5)i and -2+root(5)i
We can find the polynomial using our result b)i), which gives us
, unless you've mistyped the roots or I've misread them
d) A quadratic equation in z has roots u and v. The sum of the roots is -3 and the product of the roots is 4. Find a quadratic equation in z which roots (u+v) and (u-v).
Since the sum of the roots of our quadratic is real, then we know that u and v are complex conjugates (this might be what we wanted to prove in b)ii)?). This means that the real part of both of our roots will be
. Hence taking the product of our roots, we get the equation
^2 + r^2 = 4)
, where
is the imaginary part of
(where I just chose to say that
has a non-negative imaginary part). From this, we gather that
. Hence we say that one possible equation is
(z - \sqrt{7}i))
.
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