N-2-C- n- n-3-C-n-1- n-4-C-n-2 1n-3-C-n-1- n-4-C-n-2- n-5-C-n-3 1n-4-C-n-2- n-5-C-n-3- n-6-C-n-4lend vmatrix is equal toA- 3B- -1C- -5D- -9

The correct option is B 1n_C_r=n_C_n r ∴ n+2_C_2 amp; n+3_C_2 amp; n+4_C_2 n+3_C_2 amp; n+4_C_2 amp; n+5_C_2 n+4_C_2 amp; n+5_C_2 amp; n+6_C_2 ...

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Properties of Determinants

n+2-C- n& n+3...

Question

If n is positive integer, then $∣ ∣ ∣ ∣ ∣ \begin{matrix} {n + 2}_{C_{n}} & n + 3_{C_{n + 1}} & n + 4_{C_{n + 2}} n + 3_{C_{n + 1}} & n + 4_{C_{n + 2}} & n + 5_{C_{n + 3}} n + 4_{C_{n + 2}} & n + 5_{C_{n + 3}} & n + 6_{C_{n + 4}} \end{matrix} ∣ ∣ ∣ ∣ ∣$ is equal to

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-1

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-5

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-9

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Solution

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