It is given that complex numbers `z_1a n dz_2s a t i sfy|z_1|2a n d|z_2|=3.` If the included angled of their corresponding vectors is `60^0` , then find the value of `|(z_1+z_2)/(z_1-z_2)|` .

It is given the complex numbers z_(1) and z_(2) , |z_(1)| =2 and |z_(2)| =3 . If the included angle of their corresponding vectors is 60^(@) , then find value of |(z_(1) +z_(2))/(z_(1) -z_(2))|

Complex numbers z_(1) and z_(2) satisfy |z_(1)|=2 and |z_(2)|=3 . If the included angle of their corresponding vectors is 60^(@) , then the value of 19|(z_(1)-z_(2))/(z_(1)+z_(2))|^(2) is

It is given that complex numbers z_1 and z_2 satisfy |z_1| =2 and |z_2| =3 . If the included angle of their corresponding vectors is 60^@ , then |(z_1+z_2)/(z_1-z_2)| can be expressed as sqrtn/sqrt7 , where 'n' is a natural number then n=

Itis given that complex numbers z_(1) and z_(2) satisfy |z_(1)|=2 and |z_(2)|=3 If the included angle is 60^(@) then (z_(1)+z_(2))/(z_(1)-z_(2)) can be expressed as (sqrt(N))/(7) where N=

For complex numbers z_1 = 6+3i, z_2=3-I find (z_1)/(z_2)

Let z_1 and z_2 be two complex numbers satisfying |z_1|=9 and |z_2-3-4i|=4 Then the minimum value of |z_1-Z_2| is

If z_1 = 3i and z_2 = -1 -i , find the value of arg z_1/z_2 .

Complex number z_1 and z_2 satisfy z+barz=2|z-1| and arg (z_1-z_2) = pi/4 . Then the value of lm (z_1+z_2) is