1.The value of ∑k=199(ik!+ωk!)\sum_{k=1}^{99} (i^{k!} + \omega^{k!})∑k=199(ik!+ωk!) is (where i=−1i = \sqrt{-1}i=−1 and ω\omegaω is non-real cube root of unity)a.190+ω190 + \omega190+ωb.192+ω2192 + \omega^2192+ω2c.190+i190 + i190+id.192+i192 + i192+iLogin to continueOnly logged in users canattempt or see the solution.