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CBSE Class 12 Math 2013 Solved Paper

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Question : 13
Total: 29
Using properties of determinants prove the following:
|
1xx2
x21x
xx21
| = (1−x3)2
Solution:  
|
1xx2
x21x
xx21
|
Applying R1 → R1+R2+R3, we have:
Δ =
|
1+x+x21+x+x21x+x+x2
x21x
xx21
|

= 1 + x + x2 |
111
x21x
xx21
|
Applying C2 → C2−C1 and C3 → C3−C1, we have:
Δ = 1 + x + x2 |
100
x21−x2x−x2
xx2−x1−x
|
= (1 + x + x2) (1 - x) (1 - x) |
100
x21+xx
x−x1
|
= (1 - x3) (1 - x) |
100
x21+xx
x−x1
|
Expanding along R1, we have:
Δ = (1 - x3) (1 - x) (1) |
1+xx
−x1
|
= (1 - x3) (1 - x) (1 + x + x2)
= (1 - x3) (1 - x2)
= (1−x3)2
Hence proved.
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