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Question
If ∣∣
∣∣x+y+2zxyzy+z+2xyzxz+x+2y∣∣
∣∣=k(x+y+z)3, then the value of k is
If ∣∣
∣∣x+y+2zxyzy+z+2xyzxz+x+2y∣∣
∣∣=k(x+y+z)3, then the value of k is
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Solution
The correct option is B 2
Let △=∣∣
∣∣x+y+2zxyzy+z+2xyzxz+x+2y∣∣
∣∣
=∣∣
∣
∣∣2(x+y+z)xy2(x+y+z)y+z+2xy2(x+y+z)xz+x+2y∣∣
∣
∣∣
(Using C1→C1+C2+C3)
Take out 2(x+y+z) common from C1, we get
△=2(x+y+z)∣∣
∣∣1xy1y+z+2xy1xz+x+2y∣∣
∣∣
=2(x+y+z)∣∣
∣∣1xy0y+z+x000z+x+y∣∣
∣∣
(using R2→R2−R1,R3→R3−R1)
Take out (x+y+z) common from R2 and R3,
we get
△=2(x+y+z)(x+y+z)(x+y+z)×∣∣
∣∣1xy010001∣∣
∣∣
Expanding along R3, we get
△=2(x+y+z)3[(1)(1−0)]
=2(x+y+z)3=k(x+y+z)3 (given)
Therefore, k=2
Let △=∣∣ ∣∣x+y+2zxyzy+z+2xyzxz+x+2y∣∣ ∣∣
=∣∣ ∣ ∣∣2(x+y+z)xy2(x+y+z)y+z+2xy2(x+y+z)xz+x+2y∣∣ ∣ ∣∣
(Using C1→C1+C2+C3)
Take out 2(x+y+z) common from C1, we get
△=2(x+y+z)∣∣ ∣∣1xy1y+z+2xy1xz+x+2y∣∣ ∣∣
=2(x+y+z)∣∣ ∣∣1xy0y+z+x000z+x+y∣∣ ∣∣
(using R2→R2−R1,R3→R3−R1)
Take out (x+y+z) common from R2 and R3,
we get
△=2(x+y+z)(x+y+z)(x+y+z)×∣∣ ∣∣1xy010001∣∣ ∣∣
Expanding along R3, we get
△=2(x+y+z)3[(1)(1−0)]
=2(x+y+z)3=k(x+y+z)3 (given)
Therefore, k=2
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