" If "z" is any complex number satisfying "|z-3-2i|<=2." Then the minimum value of "|(2z-6+

If z is any complex number satisfying |z - 3 - 2i | less than or equal 2, then the minimum value of |2z - 6 + 5i| is (1) 2 (2) 1 (3) 3 (4) 5

If z is any complex number satisfying abs(z-3-2i) le 2 , where i=sqrt(-1) , then the minimum value of abs(2z-6+5i) , is

If z is any complex number satisfying abs(z-3-2i) le 2 , where i=sqrt(-1) , then the maximum value of abs(2z-6+5i) , is

If z is any complex number satisfying abs(z-3-2i) le 2 , where i=sqrt(-1) , then the minimum value of abs(2z-6+5i) , is

If z is any complex number satisfying abs(z-3-2i) le 2 , where i=sqrt(-1) , then the minimum value of abs(2z-6+5i) , is

if z is any complex number satisfying abs(z-3-2i)le2 then the minimum value of abs(2z-6+5i) is

If z=x +iy is a complex number satisfying |z+i//2|^2=|z-i//2|^2 then the locus of z is

If z=x+iy is a complex number satisfying |z+i/2|^2=|z-i/2|^2 , then the locus of z is

If z is any complex number which satisfies |z-2|=1, then show that sin(argz)=((z-1)(z-3)i)/(2|z|(2-z))