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If
\(x_0 = 1, x_1 = 2, and \space x_{n + 2} =\frac{ 1+x_{n+1}}{x_n}, n = 0, 1, 2, 3,...,\)
then
\(x_{2021}\)
is equal to?
CAT - 2021
CAT
Quantitative Aptitude
Sequences & Series
Consider a sequence of real numbers
\(x_1,x_2,x_3,…\)
such that
\(x_{n+1}=x_n+n−1\)
for all
\(n≥1\)
. If
\(x_1=−1\)
then
\(x_{100}\)
is equal to
CAT - 2021
CAT
Quantitative Aptitude
Sequences & Series
The natural numbers are divided into groups as (1), (2, 3, 4), (5, 6, 7, 8, 9), …..and so on. Then, the sum of the numbers in the 15th group is equal to
CAT - 2021
CAT
Quantitative Aptitude
Sequences & Series
If n is a positive integer such that
\((^7\sqrt{10})(^7\sqrt{10})^2).....(^7\sqrt{10})^n) > 999\)
, then the smallest value of n is
CAT - 2021
CAT
Quantitative Aptitude
Sequences & Series
For a sequence of real numbers
\(x_1, x_2, ..., x_n,\)
if
\(x_1 - x_2 + x_3 - ... + (-1)^{n + 1}x_n =n^2 + 2n\)
for all natural numbers n, then the sum
\(x_{49} + x_{50}\)
equals
CAT - 2021
CAT
Quantitative Aptitude
Sequences & Series
If
\(x_m +1\)
and
\(x_m=x_{m+1}+(m+1)\)
for every positive integer
\(m\)
, then
\(x_{100 }\)
equals
CAT - 2020
CAT
Quantitative Aptitude
Sequences & Series
Let the m-th and n-th terms of a geometric progression be
\(\frac{3}{4}\)
and
\(12\)
, respectively, where m<n. If the common ratio of the progression is an integer r, then the smallest possible value of r + n - m is
CAT - 2020
CAT
Quantitative Aptitude
Sequences & Series