`(n+2)^n C_0 2^(n+1)-(n+1)^n C_1 2^n^n C_2 2^(n-1)-` is equal to `4` b. `4n` c. `4(n+1)` d. `2(n+2)`
`(n+2)^n C_0 2^(n+1)-(n+1)^n C_1 2^n^n C_2 2^(n-1)-`
is equal to
`4`
b. `4n`
c. `4(n+1)`
d. `2(n+2)`
A. 4
B. 4n
C. 4(n+1)
D. 2(n+2)
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1 Answers
Correct Answer - C
`t_(r+1)=(-1)^(r)(n-r+2).^(n)C_(r)2^(n-r+1)`
`= (n+2)2^(n+1)(-1)^(r).^(n)C_(r)(1/2)^(r)-2^(n+1)r.^(n)C_(r)(1/2)^(r)`
`= (n+2)2^(n+1).^(n)C_(r)(-1/2)^(r) + 2^(n)n.^(n-1)C_(r-1)(-1/2)^(r-1)`
`:.` Sum `= (n+2)2^(n+1){.^(n)C_(0) - .^(n)C_(1) xx 1/2 .^(n)C_(2)xx(1/2)^(2)-"...."}`
`+2^(n){.^(n-1)C_(0)-.^(n-1)C_(1)xx1/2+.^(n-1)C_(2)xx(1/2)^(2)+"...."}`
`= (n+2)2^(n+1)(1-1/2)^(n)+n2^(n)(1-1/2)^(n-1)`
`= 2(n+2)+2n`
`= 4n+4`
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Answered