Let k1=4λ1+r1,r1∈{0,1,2,3} k2=4λ2+r2 $\begin{aligned}
& (i)^{k_1}+(i)^{k_2}=(i)^{r_1}+(i)^{r_2} \
& (i)^{r_1} \in{1, i,-1,-i}
\end{aligned}\text { Zero } \Rightarrow 1,(-1) \text { pair } \quad \Rightarrow\left{\begin{array}{cc}
1, & -1 \
i, & -i \
-i,+i \
-1, & 1
\end{array}\right}i,(-i)pair\begin{aligned} & \text { Zero probability }=\frac{4}{{ }^4 C_1 \cdot{ }^4 C_1}=\frac{1}{4} \ & \text { Probability (non-zero) }=1-\frac{1}{4}=\frac{3}{4}\end{aligned}$