The sequence a1, a2, a3, ldots satisfies a1=19, a9=99, and for all n ≥ 3, an is the arithmetic mean of the first (n-1) terms. Then a2 is equal to

Question

The sequence a1, a2, a3, ldots satisfies a1=19, a9=99, and for all n ≥ 3, an is the arithmetic mean of the first (n-1) terms. Then a2 is equal to (A) 179 (B) 99 (C) 79 (D) 59

Tardigrade Admin · Accepted Answer

n ≥ 3, a 3=( a 1+ a 2/2)...(1) a 4=(( a 1+ a 2)+ a 3/3)=(2 a 3+ a 3/3) ⇒ a 4= a 3 a5=((a1+a2+a3+a4)/4)=(3 a4+a4/4)=a4 a3=a4=a5= ldots ldots ldots=a9=99 put in equation ( 1 ) 99=(19+ a 2/2) ⇒ a 2=179

Q. The sequence a1​,a2​,a3​,… satisfies a1​=19,a9​=99, and for all n≥3,an​ is the arithmetic mean of the first (n−1) terms. Then a2​ is equal to

179

99

79

59

n≥3,a3​=2a1​+a2​​...(1) a4​=3(a1​+a2​)+a3​​=32a3​+a3​​⇒a4​=a3​ a5​=4(a1​+a2​+a3​+a4​)​=43a4​+a4​​=a4​ a3​=a4​=a5​=………=a9​=99 put in equation ( 1 ) 99=219+a2​​⇒a2​=179

Q. The sequence $a_{1}, a_{2}, a_{3}, \dots$ satisfies $a_{1} = 19, a_{9} = 99$ , and for all $n \geq 3, a_{n}$ is the arithmetic mean of the first $(n - 1)$ terms. Then $a_{2}$ is equal to