What is a Sequence? (GMAT/GRE/CAT/Bank PO/SSC CGL)  Don't Memorise  Summary and Q&A
TL;DR
Sequences are sets of numbers that follow a pattern, and finding the nth term is crucial in defining a sequence.
Key Insights
 😫 A sequence is a set of numbers following a specific order or pattern.
 🍉 The nth term formula (ft = first term + (n1) * D) helps find any term in a sequence.
 🍉 The first term and common difference are essential in defining and understanding a sequence.
 ❓ Sequences can have various patterns and may involve different increments or decrements.
 The three dots (ellipses) represent an infinite continuation of a sequence.
 🍉 The value of n in the nth term formula denotes the term number to be found.
 💭 The formula for finding the nth term can be derived but is not necessary for exams.
 🍉 The formula simplifies the process of finding any term in a sequence without writing out the entire sequence.
Transcript
a sequence is simply a set of numbers in a particular order or a set of numbers which follow a pattern the most basic example of a sequence is that of counting numbers 1 2 3 4 and so on the numbers follow an increasing pattern the three dots mean the list goes on forever and are referred to as the ellipses the numbers don't necessarily have to be c... Read More
Questions & Answers
Q: What is a sequence in mathematics, and how are they defined?
A sequence in mathematics is a set of numbers in a particular order or pattern. It can be defined using the nth term formula, which involves the first term, the term number (n), and the common difference.
Q: How do you find the nth term of a sequence?
To find the nth term of a sequence, you can use the formula ft = first term + (n1) * D. Substituting the value of n will give you the desired term. The formula works by considering the common difference between consecutive terms.
Q: What is the significance of the first term and common difference in a sequence?
The first term of a sequence, denoted as S1, helps define the starting point of the sequence. The common difference (D) represents the constant increment or decrement between consecutive terms. These values are crucial in determining the pattern and nature of the sequence.
Q: Can sequences have noncontinuous numbers?
Yes, sequences can have noncontinuous numbers. For example, a sequence like 0, 5, 10, 15, and so on, still follows a pattern and is considered a sequence. The common difference between consecutive terms remains the same.
Summary & Key Takeaways

A sequence is a set of numbers in a specific order or pattern.

The nth term formula (ft = first term + (n1) * D) helps find any term in a sequence.

The first term and the common difference are essential in defining a sequence.