Complex no has both real and imaginary part.
It is represent by A+Bi
where A is real part and B is imaginary part.
i is the iota and its value i=√-1
Complex no. also represent by eiθ or cosθ+isinθ
1. Addition of complex no.
1. Addition of complex no.
z1=x+yi and z2=x1+y1i
then
z1+z2=x+yi+x1+y1i
z1+z2=x+x1+yi+y1i
z1+z2=x+x1+yi+y1i
z1+z2=x+x1+(yi+y1)i
2. Subtraction of two complex no.
z1=x+yi and z2=x1+y1i
then
z1-z2=x+yi-(x1+y1i)
z1-z2=x-x1+yi-y1i
z1-z2=x-x1+yi-y1i
z1-z2=x-x1+(yi-y1)i
3. Product of two complex no.
z1=x+yi and z2=x1+y1i
then
Z1.Z2=(x+yi).(x1+y1i)
Z1.Z2=(xx1+x1yi+xy1i+yy1i)
Z1.Z2=(xx1+(x1y+xy1)i+yy1i²)
Z1.Z2=(xx1+(x1y+xy1)i-yy1)
Z1.Z2=(xx1-yy1+(x1y+xy1)i
4. Product of two complex no.
z1=x+yi and z2=x1+y1i
then
z1/z2=(x+yi)/(x1+y1i)