Rahul
Dead Member
got the answer thanx to monster.....
HEY its not monstEr, its monstAR, as in mon-star !!Originally posted by Rahul
got the answer thanx to monster.....
sure .........Originally posted by ND
Da Monstar, just a suggestion: why don't you post the solution on the board, for anyone else that may be having similar problems?
1. z^3 - 1 = (z-1)(z^2+z+1)Originally posted by Rahul
hey exam on friday...shit thats tmw....can some one help me out wid a few q's:
1. factorize z^3 -1. if z is one of teh 3 cube roots of unity find the two possible values of z^2+z+1.
is the answer cis 2pi/3, cis -2pi/3 ?
the cambridge book doesnt have the answers...so i am not sure
2. use de moivre's theom. to find in mod/arg form the cube roots of -2-2i?
i got sq rt2 cis -pi/4, sq rt2 cis 5pi/12, sq rt2 cis -pi/12 as my solution....not sure abt this question.
3. if |z| = r and arg z = @, show that z/z^2 + r^2 is real and give its value
this is about it....
cheers
Using r^2 = |z|^2 = z*zbarOriginally posted by Rahul
3. if |z| = r and arg z = @, show that z/z^2 + r^2 is real and give its value
So it's z/ (z^2 + r^2) not (z/z^2) - r^2. I should have deduced that from that fact that the way i saw it wasn't real.Originally posted by spice girl
Using r^2 = |z|^2 = z*zbar
z/ (z^2 + r^2) = z / (z^z + z*zbar)
= 1 / (z + zbar)
= 1 / 2Re(z)