Question

check whether 301 is a term of the list of the number
5,11,17,23....

please answer me
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Answer 1

Step-by-step explanation:

an=301,a=5,d=6

an=a+(n-1)d

301=5+(n-1)6

301=5+6n-6

301=6n-1

301-1=6n

300/6=n

n=50

and by the by,my name is too Sarvesh sis,but a boy.hope this helps you sis!!!

Answer 2

Answer:

Hey!

Here's the step-by-step explanation from the start till the end:-

The given sequence is 5,11,17,23.

To check whether 301 is a term of this sequence, we need to derive algebraic expression of the sequence first.

Xn (algebraic expression) = dn+b

d means common difference and b means first term- common difference

Xn= 6n - 1

Now, to check if 301 belongs to this list, here's what to do:-

6n - 1 = 301

6n = 301 + 1

6n = 302

n = $\frac{302}{6}$

302 is not divisible by 6, the answer comes as a decimal.

Since the answer is in decimal,

301 isn't a term of this sequence.

Hope this helps  !

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