The correct option is C If k=2cosπ5 then the system will be inconsistent.
Δ=∣∣
∣∣kc−11ck+1k1c1∣∣
∣∣=k((k+1)−ck)−(c−1)(c−k)+(c2−(k+1))
=(1−c)k2+(c−1)k+(c−1)
=(1−c)(k2−k−1)
If Δ=0⇒c=1 or k=1±√1+42⇒k=1±√52k=1+√52=2 cosπ5
Δ1=∣∣
∣∣2c−114k+1k1c1∣∣
∣∣=2(k+1−ck)−(c−1)(4−k)+1(4c−k−1)
=2k+2−2ck−4c+ck+4−k+4c−k−1=−ck+5
For c =1 and infinitely many solutions,
Δ1=0⇒(5−k)=0⇒k=5
Δ2=∣∣
∣∣k21c4k111∣∣
∣∣=k(4−k)−2(c−k)+1(c−4)
=4k−k2−2c+2k+c−4
=(−k2+6k−c−4)
For c =1 and infinitely many solutions,
Δ2=0⇒−(k2−6k+5)=0⇒k=1 or 5
Δ3=∣∣
∣∣kc−12ck+141c1∣∣
∣∣=k(k+1−4c)−(c−1)(c−4)+2(c2−k−1)=k2+k−4ck−c2+4c+c−4+2c2−2k−2=k2+c2−4ck−k+5c−6
For c =1 and infinitely many solutions,
Δ3=0⇒k2−5k=0⇒k=0 or 5
For c = 1 and k = 5, we have
Δ1, Δ2, Δ3=0
Therefore, the given system of equations can have infinitely many solutions for c = 1 and k =5.
If k=2 cos π5
Δ1, Δ2, Δ3 are not simultaneously zero for any value c, so the system will be inconsistent.