Given that `|z-1|=1,` where z is a point
on the argand planne , show that `(z-2)/(z)=itan (arg z),`
where `i=sqrt(-1).`

If |z-1|=1, where z is a point on the argand plane, show that (z-2)/(z)=i tan (argz),where i=sqrt(-1).

If |z-1|=1, where z is a point on the argand plane, show that (z-2)/(z)=i tan (argz),where i=sqrt(-1).

If |z-1|=1, where is a point on the argand plane, show that (z-2)/(z)=i tan (argz),where i=sqrt(-1).

If |z-1|=1, where is a point on the argand plane, show that |(z-2)/(z)|= tan (argz), where i=sqrt(-1).

If arg z = alpha and given that |z-1|=1, where z is a point on the argand plane , show that |(z-2)/z| = |tan alpha |,

If arg z = alpha and given that |z-1|=1, where z is a point on the argand plane , show that |(z-2)/z| = |tan alpha |,

Given that,|z-1|=1, where 'z' is a point on the argand plane.(z-2)/(2z)=alpha tan(arg z) Then determine (1)/(alpha^(4))

Let z be a non-real complex number lying on |z|=1, prove that z=(1+itan((arg(z))/2))/(1-itan((arg(z))/(2))) (where i=sqrt(-1).)

Let z be a non-real complex number lying on |z|=1, prove that z=(1+itan((arg(z))/2))/(1-itan((arg(z))/(2))) (where i=sqrt(-1).)

Let z be a non-real complex number lying on |z|=1, prove that z=(1+itan((arg(z))/2))/(1-itan((arg(z))/(2))) (where i=sqrt(-1).)