There is a set of rules to solve i to the power. First off, you need to know this: [tex]{i}^{1} = i \\ i^{2} = - 1 \\ {i}^{3} = - i \\ {i}^{4} = 1[/tex] After the power of 4, it just starts to loop from 1. Knowing this, we can say the following: [tex]i ^{4k} = 1 \\ {i}^{4k + 1} = i \\ {i}^{4k + 2} = - 1 \\ {i}^{4k + 3} = - i[/tex] Applying this, all we need to do is divide the power by 4 and determine the remainder. [tex]i ^{401} = \\ 401 \times 4 = 100 \: (1 \: left) \\ i^{401} = i^{4 \times 100 + 1} \\ k = 100 \\ {i}^{401} = i^{4 \times 100 + 1} = {i}^{4k + 1} = i[/tex] So the answer is: [tex]{i}^{401} = i[/tex]
