1.Let ω\omegaω (ω≠1\omega \ne 1ω=1) is a cube root of unity, such that (1+ω2)8=a+bω(1 + \omega^2)^8 = a + b\omega(1+ω2)8=a+bω where a,b∈Ra, b \in \mathbb{R}a,b∈R, then ∣a+b∣|a + b|∣a+b∣ is equal toa.111b.333c.000d.222Login to continueOnly logged in users canattempt or see the solution.