The given position vectors can be written as
A(α,10,13)
B(6,11,11)
C(29,β,−8)
Also given that these three points are collinear.
Let us assume that the point B divides AB,BC in the ratio k:1.
Since, A,B,C are collinear

On applying section formula for z co-ordinate we get,
11=k+1−8k+13
⇒11k+11=−8k+13
⇒19k=2
⇒k=192
∴Ratio=2:19
Now, 2+19α×19+(29)×2=6
⇒19α=117
⇒α=19117
Now similarly, 212β+190=11
⇒β=241
∴(19α−6β)2=(117−123)2=36
Hence this is the correct option.