Show that 
where α, β and γ are in A.P.
Let 
Recall that the value of a determinant remains same if we apply the operation Ri→ Ri + kRj or Ci→ Ci + kCj.
Applying R1→ R1 + R3, we get
Given that α, β and γ are in an A.P. Using the definition of an arithmetic progression, we have
β – α = γ – β
⇒ β + β = γ + α
⇒ 2β = γ + α
∴ α + γ = 2β
By substituting this in the above equation to find Δ, we get
Taking 2 common from R1, we get
Applying R1→ R1 – R2, we get
∴ Δ = 0
Thus, 
when α, β and γ are in A.P.
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