If a1 = 4 and an+1=an+4n for n ge1. then the value of a100 is

Question

If a1 = 4 and an+1=an+4n for n ge1. then the value of a100 is (A) 19804 (B) 18904 (C) 18894 (D) 19904

Tardigrade Admin · Accepted Answer

Given, an+1=an+4 n and a1=4 ⇒ an+1-an=4 n Put n=1, a2-a1=4 ⋅ 1 Put n=2 a3-a2=4 ⋅ 2 Put n=3, a4-a3=4 ⋅ 3 â¦â¦ â¦â¦ â¦â¦ â¦â¦ â¦â¦ â¦â¦ Put n=99, a100-a99=4 ⋅ 99 On adding, we get a100-a1=4(1+2+ ldots+99) ⇒ a100-4=4 ⋅ (99(99+1)/2) [∵ ∑ n=(n(n+1)/2)] ∴ a100=19804

Q. If a $_{1}$ = 4 and $a_{n + 1} = a_{n} + 4 n f or n \geq 1.$ then the value of a $_{100}$ is

19804

18904

18894

19904

19894

Q. If a1​ = 4 and an+1​=an​+4nforn≥1. then the value of a100​ is

19804

18904

18894

19904

19894

Q. If a $_{1}$ = 4 and $a_{n + 1} = a_{n} + 4 n f or n \geq 1.$ then the value of a $_{100}$ is