totallybord
Member
- Joined
- Mar 13, 2006
- Messages
- 209
- Gender
- Female
- HSC
- 2008
hi!
help me with my complex no.s plz
1) how do you convert (2-2√3i)^-4 to mod-arg form? is there a really easy way?
2) if the mod-arg form is in degrees eg. cis35 is that still calld mod-arg?
3) how do i no that z^6 +1 = (z^2+1) (z^4+z^2+1) i havnet done polynomials...is there some kind of rule or is it common sense
4) i dun get why if |z1| =|z2| not equal to 0, why is arg (z2-z1/z2+z1) = plus or minus pi/2? what the hell is it talking abt? what does the putting z2-z1 over z2+z1mean anyway?
5) what are real quadratic factors and what are comples linear factors ?
6)prove that for any 2 complex no.s z1 and z2
|z1+z2|>or equal to |z1|-|z2| assuming |z1>|z2|...when does the equality sing hold? i no this is the whole triangular inequality thingy, bt how do i prove it and write the working out for it?
thanks!
help me with my complex no.s plz
1) how do you convert (2-2√3i)^-4 to mod-arg form? is there a really easy way?
2) if the mod-arg form is in degrees eg. cis35 is that still calld mod-arg?
3) how do i no that z^6 +1 = (z^2+1) (z^4+z^2+1) i havnet done polynomials...is there some kind of rule or is it common sense
4) i dun get why if |z1| =|z2| not equal to 0, why is arg (z2-z1/z2+z1) = plus or minus pi/2? what the hell is it talking abt? what does the putting z2-z1 over z2+z1mean anyway?
5) what are real quadratic factors and what are comples linear factors ?
6)prove that for any 2 complex no.s z1 and z2
|z1+z2|>or equal to |z1|-|z2| assuming |z1>|z2|...when does the equality sing hold? i no this is the whole triangular inequality thingy, bt how do i prove it and write the working out for it?
thanks!
