Given the three vectors are coplanar.
Hence, ∣μ111μ111μ∣=0
⇒μ(μ2−1)−1(μ−1)+1(1−μ)=0
⇒μ(μ−1)(μ+1)−2(μ−1)=0[∵a2−b2=(a−b)(a+b)]
⇒(μ−1)(μ(μ+1)−2)=0
⇒(μ−1)(μ2+μ+2)=0
⇒(μ−1)(μ−1)(μ+2)=0
⇒μ=1,1,−2
Therefore, the sum of the distinct real values of μ=−2+1=−1.