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

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

Let z _(1) and z _(2) be two complex numberjs satisfying |z _(1)|=3 and |z _(2) -3-4i|=4. Then the minimum value of |z_(1) -z _(2)| is

For all complex numbers z_(1),z_(2) satisfying |z_(1)|=12 and |z_(2)-3-4i|=5, the minimum value of |z_(1)-z_(2)| is

For all complex numbers z_(1),z_(2) satisfying |z_(1)|=12 and |z_(2)-3-4i|=5, find the minimum value of |z_(1)-z_(2)|

For all complex numbers z1,z2 satisfying |z1|=12 and |z2-3-4 iota|=5, the minimum value of |z1-z2| is: a.0 b.2c.7d .

If z is a complex number satisfying |z^(2)+1|=4|z| , then the minimum value of |z| is

For all complex numbers z_1,z_2 satisfying |z_1|=12 and |z_2-3-4i|=5 the minimum value of |z_1-z_2| is (A) 0 (B) 2 (C) 7 (D) 17

Let z be a complex number satisfying |z+16|=4|z+1| . Then

Let a = 3 + 4i, z_(1) and z_(2) be two complex numbers such that |z_(1)| = 3 and |z_(2) - a| = 2 , then maximum possible value of |z_(1) - z_(2)| is ___________.

If z is a complex number satisfying ∣ z + 16 ∣ = 4 | z+1 | , then the minimum value of | z | is