If `i=sqrt(-1),` the number of values of `i^(-n)` for a different `n inI ` is

If prod_(p=1)^(r) e^(iptheta)=1 , where prod denotes the continued product and i=sqrt(-1) , the most general value of theta is (where, n is an integer)

Let f(n) denotes the number of different ways, the positive integer n ca be expressed as the sum of the 1's and 2's. for example, f(4)=5. i.e., 4=1+1+1+1 =1+1+2=1+2+1=2+1+1=2+2 Q. The number of solutions of the equation f(n)=n , where n in N is

......... is the minimum value of n such that (1+i)^(2n) = (1 - i)^(2n) . Where n in N .

If z=(i)^(i)^(i) where i=sqrt(-1),t h e n|z| is equal to 1 b. e^(-pi//2) c. e^(-pi) d. none of these

If |z-i|le5 and z_(1)=5+3i (where, i=sqrt(-1), ) the greatest and least values of |iz+z_(1)| are

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 sum_(i=1)^(2n)cos^(-1)x_i=0 then find the value of sum_(i=1)^(2n)x_i

The straight lines I_(1),I_(2),I_(3) are paralled and lie in the same plane. A total number of m point are taken on I_(1),n points on I_(2) , k points on I_(3) . The maximum number of triangles formed with vertices at these points are