Dave's Math Tables: Complexity
(Math | OddsEnds | Complexity)

Basic Operations

i = sqrt(-1)

i 2 = -1

1 / i = -i

i 4k = 1; i (4k+1) = i; i (4k+2) = -1; i (4k+3) = -i (k = integer)

sqrt( i ) = sqrt(1/2)+ sqrt(1/2) i


Complex Definitions of Functions and Opperations

(a + bi) + (c + di) = (a+c) + (b + d) i

(a + bi) (c + di) = ac + adi + bci + bdi 2 = (ac - bd) + (ad +bc) i

1/(a + bi) = a/(a 2 + b 2) - b/(a 2 + b 2) i

(a + bi) / (c + di) = (ac + bd)/(c 2 + d 2) + (bc - ad)/(c 2 +d 2) i

e (i theta) = costheta + i sin theta

n (a + bi) = (cos(b ln n) + i sin(b ln n))n a

if z = r(cos theta+ i sin theta) then z n = r n ( cos ntheta+ i sin ntheta )(DeMoivre's Theorem)

if w = r(cos theta+ i sin theta);n=integer. then there are n complex nth roots (z) of w for k=0,1,..n-1:

z(k) = r (1/n) [ cos( (theta+ 2(PI)k)/n ) + i sin( (theta+ 2(PI)k)/n ) ]

if z = r (cos theta+ i sin theta) thenln(z) = ln r + i theta

sin(a + bi) = sin(a)cosh(b) + cos(a)sinh(b) i

cos(a + bi) = cos(a)cosh(b) - sin(a)sinh(b) i

tan(a + bi) = ( tan(a) + i tanh(b) ) / ( 1 - i tan(a) tanh(b))
= ( sech 2(b)tan(a) + sec 2(a)tanh(b) i ) / (1 + tan 2(a)tanh 2(b))


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