Introduction to sequences

2010010301

Level:

Which of the following sequences given by the formula for the \(n\)th term is not decreasing?

\( (\log n)^{\infty}_{n=1}\)

\( (4-n^2)^{\infty}_{n=1}\)

\( \left( \frac{2n+1}{n}\right)^{\infty}_{n=1}\)

\( \left( \frac{1}{2^n}\right)^{\infty}_{n=1}\)

2010010302

Level:

Which of the following sequences given by the formula for the \(n\)th term is not increasing?

\( (n^{-4})^{\infty}_{n=1}\)

\( (\sqrt{n})^{\infty}_{n=1}\)

\( \left( -\frac{n+1}{n}\right)^{\infty}_{n=1}\)

\( \left( {2^n}\right)^{\infty}_{n=1}\)

2010010303

Level:

We are given a sequence \( \left( \frac{2n+1}{n+3}\right)^{\infty}_{n=1}\). What are the properties of this sequence?

increasing and bounded

neither increasing nor decreasing

decreasing and bounded above

increasing and not bounded above

decreasing and not bounded above

2010010304

Level:

We are given a sequence \( \left( \frac{n+5}{n+1}\right)^{\infty}_{n=1}\). What are the properties of this sequence?

decreasing and bounded above

increasing and not bounded below

neither increasing nor decreasing

increasing and bounded below

decreasing and not bounded above

Which of following statements about the sequence \( \left( \frac{n+3}{2n}\right)^{\infty}_{n=1} \) is true? \[\] (Help: A sequence is bounded below if all its terms are greater than or equal to a real number \(L\), which is called the lower bound of the sequence. Similarly, a sequence is bounded above if all its terms are less than or equal to a real number \(U\), which is called the upper bound of the sequence.)

one of lower bounds is \(\frac12\), one of upper bounds is \(2\)

one of lower bounds is \(\frac12\), upper bound does not exist

lower bound does not exist, one of upper bounds is \(2\)

there exists neither lower bound nor upper bound

2010010306

Level:

Which of following statements about the sequence \( \left( \frac{n-2}{n+1}\right)^{\infty}_{n=1} \) is true? \[\] (Help: A sequence is bounded below if all its terms are greater than or equal to a real number \(L\), which is called the lower bound of the sequence. Similarly, a sequence is bounded above if all its terms are less than or equal to a real number \(U\), which is called the upper bound of the sequence.)

one of lower bounds is \(-\frac12\), one of upper bounds is \(1\)

one of lower bounds is \(-\frac12\), upper bound does not exist

lower bound does not exist, one of upper bounds is \(1\)

there exists neither lower bound nor upper bound

9000063801

Level:

We are given the sequence \(\left (an + b\right )_{n=1}^{\infty }\). This sequence satisfies \(a_{2} = 2\) and \(a_{4} = 8\). Use this information to find \(a\).

\(a = 3\)

\(a = 1\)

\(a = 2\)

\(a = 4\)

9000063802

Level:

We are given the sequence \(\left (an + b\right )_{n=1}^{\infty }\). This sequence satisfies \(a_{4} - a_{1} = 6\). Use this information to find \(a\).

\(a = 2\)

\(a = -2\)

\(a = -1\)

\(a = 1\)

9000063806

Level:

Consider the sequence \(a_{n+1} = a_{n} - 2a_{n-1}\) with \(a_{3} = 0\) and \(a_{4} = -16\). Find \(a_{2} - a_{1}\).

\(4\)

\(16\)

\(- 4\)

\(8\)

9000063808

Level:

Given the sequence \(\left (2n + 3\right )_{n=1}^{\infty }\), find the recurrence relation for this sequence.

\(a_{n+1} = a_{n} + 2,\ a_{1} = 5\)

\(a_{n+1} = a_{n} + 3,\ a_{1} = 5\)

\(a_{n+1} = a_{n} + 4,\ a_{1} = 5\)

\(a_{n+1} = a_{n} + 5,\ a_{1} = 5\)

Introduction to sequences

2010010301

2010010302

2010010303

2010010304

2010010305

2010010306

9000063801

9000063802

9000063806

9000063808

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