Number of positive terms in the sequence...

Number of positive terms in the sequence `x_n=195/(4.np_n)-(n+3p_3)/(n+1p_(n+1)), n in N` (here `p_n=|anglen`)

Text Solution

Verified by Experts

The correct Answer is:

4

We have, `x_(n)=(195)/(4P_(n))-(.^(n+3)A_(3))/(P_(n+1))`
`thereforex_(n)=(195)/(4*n!)-((n+3)(n+2)(n+1))/((n+1)!)`
`=-(195)/(4*n!)-((n+3)(n+2))/(n!)`
`=(195-4n^(2)-20n-24)/(4*n!)=(171-4n^(2)-20n)/(4*n!)`
`becausex_(n)` is positive
`therefore(171-4n^(2)-20n)/(4*n!) gt0`
`implies4n^(2)+20n-171 lt0`
which is true for n=1,2,3,4
Hence, the given sequence `(x_(n))` has 4 positive terms.

Similar Questions

Explore conceptually related problems

Write first three terms of the sequence a_n=(n-3)/(4) .

Find the sixth term of the sequence a_(n) =(n)/(n+1) ?

Write the first five terms of the sequence defined by a_n = ( n)/( n+1) where n in N

Write the first three terms of the sequence a_(n)=(-1)^(n-1) 5^(n+1)

Find the negative terms of the sequence X_(n)=(.^(n+4)P_(4))/(P_(n+2))-(143)/(4P_(n))

Write the first three terms of the sequence a_n=(-1)^(n-1)5^(n+1) .

The number of positive integers satisfying the inequality C(n+1,n-2) - C(n+1,n-1)<=100 is

If n^(th) term of the sequences is a_(n)= (-1)^(n-1)5^(n+1) , Find a_(3) ?

What is the 20^("th") term of the sequence defined by a_n=(n-1) (2-n) (3+n) ?

The greatest positive integer, which divides (n+1)(n+2)(n+3)(n+4) for all n in N is

Number of positive terms in the sequence `x_n=195/(4.np_n)-(n+3p_3)/(n+1p_(n+1)), n in N` (here `p_n=|anglen`)

Text Solution

Similar Questions

Recommended Questions