0.3,0.33,0333,... is this an A.P.?
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Answered by
13
Hey There!
For a sequence to be an AP, the difference of consecutive terms must be same
Here, 0.33-0.3 = 0.03
And, 0.333 - 0.33 = 0.003
As the difference of consecutive terms is not same, It is NOT an AP
Hope it helps
Purva
Brainly Community
For a sequence to be an AP, the difference of consecutive terms must be same
Here, 0.33-0.3 = 0.03
And, 0.333 - 0.33 = 0.003
As the difference of consecutive terms is not same, It is NOT an AP
Hope it helps
Purva
Brainly Community
vanshikac27:
Okay
Well I just passed School this year. Gave 12th exams recently
Good luck for results!
@purva, I'm a tarot reader, I know that already ! XD
Haha :))
Well, I supposed you'll frea.k out... anyways, this is Sly !
And not any tarot reader, lol
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Yeah, Hail Uni-eX !
Hail Uni-eX !
Answered by
4
Step-by-step explanation:
Hello
Here:
0.3 is (a)(first term) (t1)
0.33 is (second term) (t2)
0.333 is (third term)(t3)
d = t2-t1 = 0.33-0.3 = 0.3
d = t3 -t2 = 0.333- 0.33 = 0.003
since common difference (d) is not same
so they are not in A. P
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