Let | 1+x x x² |
| x 1+x x² | = -(x - α₁)(x – α₂)(x – α₃)(x – α₄) be an
| x² x 1+x |
identity in x, where α₁, α₂, α₃, α₄ are independent of x. The value of α₁ × α₂ × α₃ × α₄ is
Let | 1+x x x² |
| x 1+x x² | = -(x - α₁)(x – α₂)(x – α₃)(x – α₄) be an
| x² x 1+x |
identity in x, where α₁, α₂, α₃, α₄ are independent of x. The value of α₁ × α₂ × α₃ × α₄ is
Option 1 -
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Option 2 -
2
Option 3 -
4
Option 4 -
6
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1 Answer
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Correct Option - 1
Detailed Solution:| 1+x² |
| x 1+x | = − (x - α? ) (x − α? ) (x – α? ) (x – α? )
| x² x 1+x |Put x = 0
| 1 0 |
| 0 1 0 | = - (-α? ) (-α? ) (-α? ) (-α? )
| 0 1 |
α ⇒? α? α? α? = −1
Similar Questions for you
|2A| = 27
8|A| = 27
Now |A| = α2–β2 = 24
α2 = 16 + β2
α2– β2 = 16
(α–β) (α+β) = 16
->α + β = 8 and
α – β = 2
->α = 5 and β = 3
|A| = 3
|B| = 1
->|C| = |ABAT| = |A|B|A7| = |A|2|B|
= 9
->|X| = |A|C|2|AT|
= 3 * 92 * 3 = 9 * 92 = 729
|A| = 2
->
->, m ¬ even
7
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