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What is the closed linear form for this sequence given a1 = 0.3 and an + 1 = an + 0.75?
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What is the closed linear form for this sequence given a1 = 0.3 and an + 1 = an + 0.75?

User Carlens
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1 Answer

4 votes

Answer:

The closed linear form of the given sequence is
a_(n)=0.75n-0.45

Explanation:

Given that the first term
a_(1)=0.3 and
a_(n+1)=a_(n)+0.75

To find the closed linear form for the given sequence

The formula for arithmetic sequence is


a_(n)=a_(1)+(n - 1)d (where d is the common difference)

The above equation is of the given form
a_(n+1)=a_(n)+0.75

Comparing this we get d=0.75

With
a_(1)=0.3 and d=0.75

We can substitute these values in
a_(n)=a_(1)+(n - 1)d


a_(n)=a_(1)+(n - 1)d


=0.3+(n-1)(0.75)


=0.3+0.75n-0.75


=-0.45+0.75n

Rewritting as below


=0.75n-0.45

Therefore
a_(n)=0.75n-0.45

Therefore the closed linear form of the given sequence is
a_(n)=0.75n-0.45

User Humanaut
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