1 Answer

Kristijan Delivuk · Answer 1 · 2020-05-22T17:52:46+0000

Answer:

37th term of given arithmetic sequence
a_1 = 2.3; d = -2.3 is -80.5.

Solution:

Given that

Need to determine 37th term, when
a_1 = 2.3, d = -2.3

Means first term of arithmetic sequence =
a_1 = 2.3 and common difference d = -2.3

Formula for nth term of arithmetic sequence is

$\mathrm{a}_{\mathrm{n}}=\mathrm{a}_(1)+(\mathrm{n}-1) \mathrm{d}$ --- equation 1

$\text { In our case } a_(1)=2.3, d=-2.3$

We need to determine 37th term so n = 37.

On substituting given values in equation (1) we get

$\mathrm{a}_(37)=\mathrm{a}_(1)+(37-1) \mathrm{d}$

$\begin{array}{l}{\Rightarrow a_(37)=2.3+(37-1)(-2.3)} \\\\ {\Rightarrow a_(37)=2.3(1-36)=2.3 * 35=-80.5}\end{array}$

Hence 37th term of given arithmetic sequence is -80.5

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