The least value of | z| where z is complex number which satisfies the inequality `(((|z|+3)(|z|-1))/||z|+1|log_e2)gelog_(sqrt2)|5sqrt7+9i|,i=sqrt(-1)` is equal to

The least value of |z| where z is complex number which satisfies the inequality exp (((|z|+3)(|z|-1))/(|z|+1|)log_(e)2)gtlog_(sqrt2)|5sqrt7+9i|,i=sqrt(-1) is equal to :

Find a complex number z satisfying the equation z+sqrt(2)|z+1|+i=0

If |z-3i| ltsqrt5 then prove that the complex number z also satisfies the inequality |i(z+1)+1| lt2sqrt5 .

Fid the number of complex numbers which satisfies both the equations |z-1-i|=sqrt(2) and |z+1+i|=2

The complex number z which satisfy the equations |z|=1 and |(z-sqrt(2)(1+i))/(z)|=1 is: (where i=sqrt(-1) )

The greatest value of the modulus of the complex number 'z' satisfying the equality |z+(1)/(z)|=1 is: (-1+sqrt(5))/(2) (b) sqrt((3+sqrt(5))/(2))sqrt((3-sqrt(5))/(2))(d)sqrt(5+1)

The focus of the complex number z in argand plane satisfying the inequality log_((1)/(2))((|z-1|+4)/(3|z-1|-2))>1(where|z-1|!=(2)/(3))

If a complex number z satisfies z + sqrt(2) |z + 1| + i=0 , then |z| is equal to :

Let z_(1), z_(2) be two complex numbers satisfying the equations |(z-4)/(z-8)|= 1 and |(z-8i)/(z-12)|=(3)/(5) , then sqrt(|z_(1)-z_(2)|) is equal to __________