Let an= 16,4,1,… be a geometric sequence...

Let `a_n= 16,4,1,…` be a geometric sequence .Define `P_n` as the product of the first n terms. The value of `Sigma_(n=1)^(oo) nsqrtP_n` is _________.

Text Solution

Verified by Experts

The correct Answer is:

32

For the G.P. `a,ar,ar^(2),…`
`P_(n)=a(ar)(ar^(2))…(ar^(n-1))=a^(n)r^(n(n-1)//2)`
`thereforesum_(n=1)^(oo)rootn(P_(n))=sum_(n=1)^(oo)ar^((n-1)//2)`
Now, `sum_(n=1)^(oo)ar^((n-1)//2)=a[1+sqrtr+r+rsqrtr+..oo]=a/(1-sqrtr)`
Given, a=16 and r=1/4
`thereforeS=16/(1-(1//2))=32`

Promotional Banner

Promotional Banner

Topper's Solved these Questions

PROGRESSION AND SERIES
CENGAGE|Exercise JEE Main Previous Year|12 Videos
PROGRESSION AND SERIES
CENGAGE|Exercise JEE Advanced Previous Year|16 Videos
PROGRESSION AND SERIES
CENGAGE|Exercise EXERCIESE ( MATRIX MATCH TYPE )|3 Videos
PROBABILITY II
CENGAGE|Exercise NUMARICAL VALUE TYPE|2 Videos
PROPERTIES AND SOLUTIONS OF TRIANGLE
CENGAGE|Exercise JEE Advanced Previous Year|11 Videos

Similar Questions

Explore conceptually related problems

Let a_(n)=16,4,1, be a geometric sequence. Define P_(n) as the product of the first n terms. Then the value of (1)/(4)sum_(n=1)^(oo)P_(n)^((1)/(n)) is

Let a_(n)=16,4,1,……….. be a geometric sequence. The value of Sigma_(n=1)^(oo)rootn(P_(n)) , where P_(n) is the product of the first n terms, is equal to.

What is the product of first 2n+1 terms of a geometric progression ?

Let a_n , n ge 1 , be an arithmetic progression with first term 2 and common difference 4. Let M_n be the average of the first n terms. Then the sum_(n=1)^10 M_n is

Sigma_(n=1)^(oo) (x^(2n))/(2n-1) is equal to

Write the first five terms of the sequence defined by a_(n)=(-1)^(n-1).2^(n)

Give first 3 terms o the sequence defined by a_(n)=(n)/(n^(2)+1)

Show that for the sequence defined by a_(n) = (n -1) (n-2) ,the first two terms are zero and ltbRgt its fifth term is 12 .

CENGAGE-PROGRESSION AND SERIES-Exercise (Numerical)

Let a+a r1+a r1 2++ooa n da+a r2+a r2 2++oo be two infinite series of ...
Text Solution
|
If he equation x^3+a x^2+b x+216=0 has three real roots in G.P., then ...
Text Solution
|
Let an= 16,4,1,… be a geometric sequence .Define Pn as the product of ...
Text Solution
|
The terms a1, a2, a3 from an arithmetic sequence whose sum s 18. The t...
Text Solution
|
Let the sum of first three terms of G.P. with real terms be 13/12 and ...
Text Solution
|
The first term of an arithmetic progression is 1 and the sum of the fi...
Text Solution
|
A person drops a ball from an 80 m tall building and each time the bal...
Text Solution
|
The digits in units's place of number (10^(2013)-1)/(10^33-1) is..
Text Solution
|
The number of positive integral ordered pairs of (a ,b) such that 6,a ...
Text Solution
|
If the roots of 10 x^3-n x^2-54 x-27=0 are in harmonic oprogresi...
Text Solution
|
Given a,b,c are in A.P.,b,c,d are in G.P and c,d,e are in H.P .If a=2 ...
Text Solution
|
Let Sk be sum of an indinite G.P whose first term is 'K' and commmon r...
Text Solution
|
The value of the sum Sigma(i=1)^(20) i(1/i+1/(i+1)+1/(i+2)+.....+1/(2)...
Text Solution
|
The difference between the sum of the first k terms of the series 1^3+...
Text Solution
|
The vlaue of the Sigma(n=0)^(oo) (2n+3)/(3^n) is equal to .
Text Solution
|
The sum of the infinite Arithmetico -Geometric progression3,4,4,… is .
Text Solution
|
Sigma(r=1)^(50)(r^2)/(r^2+(11-r)^2) is equal to .
Text Solution
|
If Sigma(r=1)^(50) (2)/(r^2+(11-r^2)), then the value of n is
Text Solution
|
Let lt an gt be an arithmetic sequence of 99 terms such that sum of it...
Text Solution
|
Find the sum of series upto n terms ((2n+1)/(2n-1))+3((2n+1)/(2n-1))^2...
Text Solution
|