In the binomial expansion of (1 + x)n, where n is a natural number, the co-efficient of 5th, 6th and 7th terms are in A.P., then n is equal to

Question

In the binomial expansion of (1 + x)n, where n is a natural number, the co-efficient of 5th, 6th and 7th terms are in A.P., then n is equal to (A) 7 and 13 (B) 7 and 14 (C) 7 and 17 (D) none of these

Tardigrade Admin · Accepted Answer

Since co-eff. of 5th, 6th, 7th terms are in A.P. ∴ nc4+ nc6 = 2⋅nc5 ⇒ (n !/n-4 ! 4 !)+(n !/n-6 ! 6 !) = (n !/2n-5 ! 5 !) ⇒ 6⋅5 +(n-4) (n-5) =2(n-4)⋅6 ⇒ 30 + n2 - 9n + 60 = 12n - 48 ⇒ n2 - 21n + 98 = 0 ⇒ n = 7, 14

Q. In the binomial expansion of (1+x)n, where n is a natural number, the co-efficient of 5th, 6th and 7th terms are in A.P., then n is equal to

7 and 13

7 and 14

7 and 17

none of these

Since co-eff. of 5th, 6th, 7th terms are in A.P. ∴nc4​+nc6​=2⋅nc5​ ⇒n−4!4!n!​+n−6!6!n!​ =2n−5!5!n!​ ⇒6⋅5+(n−4)(n−5)=2(n−4)⋅6 ⇒30+n2−9n+60=12n−48 ⇒n2−21n+98=0 ⇒n=7, 14

Q. In the binomial expansion of $(1 + x)^{n}$ , where $n$ is a natural number, the co-efficient of 5th, 6th and 7th terms are in A.P., then $n$ is equal to