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Example Questions
Example Question #11 : Sequences And Series
Consider the sequence:
What is the fifteenth term in the sequence?
The sequence can be described by the equation , where is the term in the sequence.
For the 15th term, .
Example Question #12 : Sequences And Series
What are the first three terms in the series?
To find the first three terms, replace with , , and .
The first three terms are , , and .
Example Question #1 : Finding Terms In A Series
Find the first three terms in the series.
To find the first three terms, replace with , , and .
The first three terms are , , and .
Example Question #41 : Pre Calculus
Indicate the first three terms of the following series:
In the arithmetic series, the first terms can be found by plugging , , and into the equation.
Example Question #2051 : High School Math
Indicate the first three terms of the following series:
In the arithmetic series, the first terms can be found by plugging in , , and for .
Example Question #3 : Finding Terms In A Series
Indicate the first three terms of the following series:
The first terms can be found by substituting , , and for into the sum formula.
Example Question #4 : Finding Terms In A Series
Indicate the first three terms of the following series.
Not enough information
The first terms can be found by substituting , , and in for .
Example Question #5 : Finding Terms In A Series
What is the sixth term when is expanded?
We will need to use the Binomial Theorem in order to solve this problem. Consider the expansion of , where n is an integer. The rth term of this expansion is given by the following formula:
,
where is a combination. In general, if x and y are nonnegative integers such that x > y, then the combination of x and y is defined as follows: .
We are asked to find the sixth term of , which means that in this case r = 6 and n = 10. Also, we will let and . We can now apply the Binomial Theorem to determine the sixth term, which is as follows:
Next, let's find the value of . According to the definition of a combination,
.
Remember that, if n is a positive integer, then . This is called a factorial.
Let's go back to simplifying .
The answer is .
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