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Question

Consider the following system of equations :
ax+by+cz=0az+bx+cy=0ay+bz+cx=0
List - I List - II(I)If a+b+c0 and (P) Planes meet only at one point(ab)2+(bc)2+(ca)2=0.(II)If a+b+c=0 and (Q) Equations represent the line x=y=z(ab)2+(bc)2+(ca)20(III) If a+b+c0 and (R) Equations represent identical planes(ab)2+(bc)2+(ca)20(IV)If a+b+c=0 and (S) The solution of the system represents (ab)2+(bc)2+(ca)2=0 whole of the three dimensional space


Which of the following is the "INCORRECT" option?

A
(IV)(S)
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B
(II)(Q)
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C
(I)(S)
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D
(III)(P)
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Solution

The correct option is C (I)(S)
Δ=∣ ∣abcbcacab∣ ∣Δ=a(cba2)b(b2ac)+c(abc2)Δ=3abca3b3c3Δ=12(a+b+c)[(ab)2+(bc)2+(ca)2]

(I)
a+b+c0 and (ab)2+(bc)2+(ca)2=0a=b=c
So, the system of equations represents identical planes.
(I)(R)

(II)
a+b+c=0 and (ab)2+(bc)2+(ca)20
c=(a+b)
The system of equations becomes
ax+by=(a+b)zaz+bx=(a+b)yay+bz=(a+b)x
This represents the line x=y=z
(II)(Q)

(III)
a+b+c0 and (ab)2+(bc)2+(ca)20
Δ0
So, there is only trivial solution, (0,0,0)
Hence, planes intersect only at a point.
(III)(P)

(IV)
a+b+c=0 and (ab)2+(bc)2+(ca)2=0
a=b=c=0
The solution of the system is R3,
i.e., whole three dimensional space.
(IV)(S)

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