a1, a2, a3, a4, an, . . .
Finding the nth term of a sequence is easy given a general equation. But doing it the other way around is a struggle. Finding a general equation for a given sequence requires a lot of thinking and practice but, learning the specific rule guides you in discovering the general equation. In this article, you will learn how to induce the patterns of sequences and write the general term when given the first few terms. There is a step-by-step guide for you to follow and understand the process and provide you with clear and correct computations.
An arithmetic series is a series of ordered numbers with a constant difference. In an arithmetic sequence, you will observe that each pair of consecutive terms differs by the same amount. For example, here are the first five terms of the series.
3, 8, 13, 18, 23
Do you notice a special pattern? It is obvious that each number after the first is five more than the preceding term. Meaning, the common difference of the sequence is five. Usually, the formula for the nth term of an arithmetic sequence whose first term is a1 and whose common difference is d is displayed below.
an = a1 + (n - 1) d
Source: teacherspayteachers.com
Steps in Finding the General Formula of Arithmetic and Geometric Sequences
1. Create a table with headings n and an where n denotes the set of consecutive positive integers, and an represents the term corresponding to the positive integers. You may pick only the first five terms of the sequence. For example, tabulate the series 5, 10, 15, 20, 25, . . .
2. Solve the first common difference of a. Consider the solution as a tree diagram. There are two conditions for this step. This process applies only to sequences whose nature are either linear or quadratic.
Condition 1: If the first common difference is a constant, use the linear equation ax + b = 0 in finding the general term of the sequence.
a. Pick two pairs of numbers from the table and form two equations. The value of n from the table corresponds to the x in the linear equation, and the value of an corresponds to the 0 in the linear equation.
b. After forming the two equations, calculate a and b using the subtraction method.
c. Substitute a and b to the general term.
d. Check if the general term is correct by substituting the values in the general equation. If the general term does not meet the sequence, there is an error with your calculations.
Condition 2: If the first difference is not constant and the second difference is constant, use the quadratic equation
a. Pick three pairs of numbers from the table and form three equations. The value of n from the table corresponds to the x in the linear equation, and the value of an corresponds to the 0 in the linear equation.
b. After forming the three equations, calculate a, b, and c using the subtraction method.
c. Substitute a, b, and c to the general term.
d. Check if the general term is correct by substituting the values in the general equation. If the general term does not meet the sequence, there is an error with your calculations.
This article was originally published on The owlcation. Read the original article.
Source:
https://owlcation.com/stem/How-to-Find-the-General-Term-of-Arithmetic-and-Geometric-Sequences
Tidak ada komentar:
Posting Komentar