Show that `6i^(50)+5i^(17)-i^(11)+6i^(28)` is an imaginary number.

Show that i^(15)+i^(17)+i^(19)+i^(21)+i^(24) is a real number.

i^(14)+i^(15)+i^(16)+i^(17)=

Show that 1+i^(10)+i^(20)+i^(30) is a real number.

Let z!=i be any complex number such that (z-i)/(z+i) is a purely imaginary number. Then z+ 1/z is

Evaluate 2i^(2)+ 6i^(3)+3i^(16) -6i^(19) + 4i^(25)

If z is a unimodular number (!=+-i) then (z+i)/(z-i) is (A) purely real (B) purely imaginary (C) an imaginary number which is not purely imaginary (D) both purely real and purely imaginary

Find the value of i^(4) + i^(5) + i^(6) + i^(7) .

If z=|[-5, 3+4i,5-7i],[3-4i,6 ,8+7i],[5+7i,8-7i,9]|,t h e nz is (a) purely real (b)purely imaginary (c)an imaginary number that is not purely imaginary,a+i b , w h e r ea!=0,b!=0 (d)both purely real and purely imaginary

Show that (√5+i √2)/(√5-i√2) + (√5-i√2)/(√5+i√2) is real.