Complex numbers Flashcards
What is i?
The square root of negative 1
What is an imaginary number ?
Any multiple of i
What is a complex number ?
An imaginary number and a real number
How is the equality different for complex numbers?
What is a conjugate ?
A change in the sign in the middle of two terms
What do you know about the roots of a quadratic equation that are non- real complex numbers?
The roots are conjugate.
If f(z)=0 (a+bi)
Then f(z*)=0 (a-bi)
formula
z^2 - (2a)+ a^2b^2
what always must be done to complex numbers before they can be manipulated
when in fraction form
- check the denominator
- if i is present in the denominator then rationalise by multiplying by the conjugate
- once rationalised (no conjugate in the denominator) then manipulate normally
how would you determine a quadratic equation given one complex root?
considering co efficents are real numbers
- know that the other root must be the conjuagte
- if root in the form (a+bi)
- -2a is the b term
- a squared + b square is the c term
What is the Argand diagram?
Plot the points
How would two conjugate pairs be represented geometrically? (On the Angrand diagram)
Reflection on the x axis
why are complex numbers used?
to represent roots of quadratics that we previously couldn’t represent with real numbers
what are the possible root outcomes for a cubic?
- 3 real roots
- 1 real root, 2 conjuagtes
must have at least 1 real root
Make sure to highlight the a , b c … terms to make sure you don’t make a sign error
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