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Question

The value of the determinant ∣ ∣1+a1111+a1111+a∣ ∣ is

A
a3(12a)
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B
a3(1+3a)
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C
a3(13a)
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D
a3(1+2a)
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Solution

The correct option is C a3(1+3a)
Let Δ=∣ ∣1+a1111+a1111+a∣ ∣

Expand the above determinant as shown below:

Δ=(1+a)[(1+a)(1+a)(1)(1)]1[(1)(1+a)(1)(1)]+1[(1)(1)(1)(1+a)]

Δ=(1+a)[(1+a)21]1[1+a1]+1[11a]

Δ=(1+a)[1+a2+2a1]1[a]+1[a]

Δ=(1+a)[a2+2a]aa

Δ=a2+2a+a3+2a22a

Δ=a3+3a2

Δ=a3(1+3a)

Hence, option B is correct.

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