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Chapter 11: Problem 28

Find the missing term of each arithmetic sequence. \(.65, \square,-60, \dots\)

Short Answer

Expert verified
The missing second term in the arithmetic sequence is -29.675

Step by step solution

01

Find the common difference

To find the common difference 'd', subtract the first term from the third term and divide it by 2 (because the missing term is the second term). So, \(d = \frac{-60 - .65}{2}\)
02

Evaluate the common difference

Simplify the value of 'd'. Therefore, \(d = -30.325\)
03

Determine the second term

The formula for the \(n^{th}\) term of an arithmetic sequence is \(a + (n-1)d\). Substitute 'a' with .65, 'd' with -30.325 and 'n' with 2 to find the second term. So, \(second \ term = .65 + (2-1)(-30.325)\)
04

Evaluate the second term

Calculate the answer, \(second \ term = -29.675\)

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Common Difference
In arithmetic sequences, the "common difference" is the amount by which consecutive terms in the sequence increase or decrease. It's crucial because it tells us how the sequence progresses. Here’s how you calculate it:
  • Pick two consecutive terms from the sequence. Let's call them the first term and the third term.
  • Subtract the first term from the third term. This gives you the total change between these positions.
  • Divide by the number of intervals between them. For example, if there’s one missing term in between, you’d divide by 2.
This gives you the average change per step, which is your common difference. In our example, by subtracting 0.65 from -60 and dividing by 2, we find the common difference to be -30.325. Knowing this difference helps us easily find any term in the sequence.
Nth Term Formula
The "nth term formula" for an arithmetic sequence is a handy mathematical tool. It allows you to calculate the value of any term in the sequence without needing to list all the preceding terms manually. The formula is:
\[ a_n = a_1 + (n-1) imes d \]
Where:
  • \(a_n\): the value of the nth term.
  • \(a_1\): the first term of the sequence.
  • \(d\): the common difference.
  • \(n\): the position of the term within the sequence.
To use the formula effectively, plug in the known values for the first term, the common difference, and the desired position (n).
For instance, in the example with the sequence starting at 0.65, to find the second term, we use the formula with n=2, resulting in -29.675.
Sequence Problems
Solving sequence problems requires a systematic approach, especially with arithmetic sequences. You will usually start by identifying the pattern or rule that defines the sequence. Here’s a structured approach:
  • First, determine if the sequence is arithmetic by checking if the difference between consecutive terms is constant.
  • Once confirmed, find the common difference, which is the key to unlocking further terms in the sequence.
  • Next, apply the nth term formula if you need to find a specific term or missing terms in a sequence.
These steps allow you to quickly and accurately solve problems related to arithmetic sequences. In our exercise, identifying the pattern and using the nth term formula helped us find the missing term robustly. Practice with these steps improves your ability to tackle various sequence-related challenges efficiently.

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Most popular questions from this chapter

Critical Thinking Find the specified value for each infinite geometric series. $$ S=12, r=\frac{1}{6} ; \text { find } a_{1} $$

Write and evaluate a sum to estimate the area under each curve for the domain \(0 \leq x \leq 2\) . a. Use inscribed rectangles 1 unit wide. b. Use eircumscribed rectangles 1 unit wide. $$ y=-x^{2}+5 $$

The function \(S(n)=\frac{10\left(1-0.8^{n}\right)}{0.2}\) represents the sum of the first \(n\) terms of an infinite geometric series. a. What is the domain of the function? b. Find \(S(n)\) for \(n=1,2,3, \ldots, 10 .\) Sketch the graph of the function. c. Find the sum \(S\) of the infinite geometric series.

Find the area under each curve for the domain \(0 \leq x \leq 1\) $$ f(x)=x+2 $$

Graph each curve. Use inscribed rectangles to approximate the area under the curve for the interval and rectangle width given. $$ y=3 x^{2}+2,2 \leq x \leq 4,1 $$
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