The ratio of the fifth term from the beginning to the fifth term from the end in the expansion of (√[4]2 + (1/√[4]3))n is √6:1. If n=(20/λ ), then the value of λ is

Question

The ratio of the fifth term from the beginning to the fifth term from the end in the expansion of (√[4]2 + (1/√[4]3))n is √6:1. If n=(20/λ ), then the value of λ is (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

(T5/Tn - 5 + 2)= (n C4 (2(1/4))n - 4 ⋅ (3- (1/4))4/n Cn - 4 (2(1)4)4 ⋅ (3- (1)4)n - 4 (T5/Tn - 5 + 2)= (2(n - 4/4) ⋅ 3(n - 4/4)/6)=√/6) ⇒ 6(n - 4/4)=6(3/2) ⇒ n=10=(20/λ ) ⇒ λ =2

Q. The ratio of the fifth term from the beginning to the fifth term from the end in the expansion of (42​+43​1​)n is 6​:1. If n=λ20​, then the value of λ is

Tn−5+2​T5​​=nCn−4​(241​)4⋅(3−41​)n−4nC4​(241​)n−4⋅(3−41​)4​ Tn−5+2​T5​​=624n−4​⋅34n−4​​=6​ ⇒64n−4​=623​ ⇒n=10=λ20​ ⇒λ=2

Q. The ratio of the fifth term from the beginning to the fifth term from the end in the expansion of $(42 + \frac{1}{4 3})^{n}$ is $6 : 1.$ If $n = \frac{20}{λ},$ then the value of $λ$ is