Question

Write the first five terms of the arithmetic sequence whose first term is 5 and whose common difference is 6.

Answer 1

Answer:

11,17,23,29,35

Step-by-step explanation:

given a=5

common difference(d)=6

use: a + d =5 + 6=11

a +2d=5 + 2(6)=17

a +3d=5 + 3(6)=23

a +4d=5 + 4(6)=29

a +5d=5+ 5(6)=35

hope the answer is correct

Answer 2

Answer:

Step-by-step explanation:

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Given that:-

The first term is 5

The common difference is 6.

We need to find the first 5 terms of the Arithmetic Progression.

Let's Do!

We need to know that:-

$\sf{a_n = a + (n-1)d}$

Where a_n is the nth term.

Where a is the first term

And, n is the number if terms, followed by d, the common difference.

$\sf{a_n = a + (n-1)d}$

$\sf{a_n = 5 + (5-1)6}$

$\sf{a_n = 5 + 4 \times 6}$

$\sf{a_n = 5 + 24}$

$\sf{a_n = 29}$

So, we got the 5th term as 29.

So, the other terms will be 23, 17, 11, 5.

And the required sequence is :-

29,23,17,11, 5 is the answer.