If z and bar{z} are conjugate complex numbers ,find two complex numbers, z=z_1 and z=z_2 , that satisfy the equation 3z\bar{z}+2(z-\bar{z})=39+j12

pedzenekO

pedzenekO

Answered question

2021-09-12

If z and z are conjugate complex numbers , find two complex numbers, z=z1  and  z=z2 , that satisfy the equation 3zz+2(zz)=39+j12

Answer & Explanation

liannemdh

liannemdh

Skilled2021-09-13Added 106 answers

Step 1
The given equation is:
3zz+2(zz)=39+j12
Let z=x+jy
then z=xjy
Step 2
Using the given equation
3(x+jy)(xjy)+2[(x+jy)(xjy)]=39+j12
3[x2(jy)2]+2[2jy]=39+j12
3[x2+y2]+4jy=39+j12
on comparing real and imaginary coefficients
3(x2+y2)=39x2+y2=13s˙(1)
4y=12y=3
by using equation (1)
x2+32=13
x2=139
x2=4
x=±2
z=2+j3
z=2+j3

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