Question

asked Jun 12, 2022 2.3k views

1 Answer

Atlantis · Answer 1 · 2022-06-17T11:35:47+0000

Answer:

Please check the explanation.

Explanation:

Given the sequence

0.4, 0.8, 1.2, 1.6, ...

An Arithmetic sequence has a constant difference 'd' and is defined by

$a_n=a_1+\left(n-1\right)d$

Computing the differences of all the adjacent terms

$0.8-0.4=0.4,\:\quad \:1.2-0.8=0.4,\:\quad \:1.6-1.2=0.4$

The difference between all the adjacent terms is the same and equal to

d=0.4

As the first element of the sequence is

a_1=0.4

Thus, the relationship between the terms in each arithmetic sequence can be determined by using the formula

$a_n=a_1+\left(n-1\right)d$

substituting
a_1=0.4 , and
d=0.4

$a_n=0.4\left(n-1\right)+0.4$

a_n=0.4n

Therefore, the relationship between the terms in each arithmetic sequence is:

Finding the next three terms:

Given the sequence

a_n=0.4n

putting n = 5 to determine the 5th term

$a_5=0.4\left(5\right)$

a_5=2

putting n = 6 to determine the 6th term

$a_6=0.4\left(6\right)$

a_6=2.4

putting n = 7 to determine the 7th term

$a_7=0.4\left(7\right)$

a_7=2.8

Therefore, the next three terms are:

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