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प्रश्न
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उत्तर १
The given sequence is 2, 4, 6, 8 ... 344, 346, 348
Now, surely the above-mentioned range is in an A.P. or Arithmetic Progression. (Because the difference between two consecutive numbers in the given series is always constant.)
The above sequence is an A.P. with
a = t1 = 2,
d = t2 - t1
= 4 - 2
= 2
tn = 348
Since tn = a + (n - 1) d
∴ 348 = 2 + (n - 1) 2
∴ 348 = 2 - 2n + 2
∴ 348 = 2 + 2n - 2
∴ 348 = 2n
∴ n = `348/2`
∴ n = 174
Thus, the number of terms (n) = 174.
Now, Sn = `n/2` [2a + (n - 1)d]
∴ S174 = `174/2` [2(2) + (174 - 1)2]
= 87 [4 + (173)2]
= 87 [4 + 346]
= 87 × 350
= 30450
Hence, the sum of all even numbers between 1 and 350 is 30450.
उत्तर २
All even numbers between 1 and 350,
2, 4, 6, 8 ... 344, 346, 348
Given sequence is an A.P.
a = 2, d = 2, tn = 348
tn = a + (n - 1)d
348 = 2 + (n - 1)2
348 - 2 = (n - 1)2
`346/2` = n - 1
173 + 1 = n
n = 174
t1 = 2, tn = 348
Sn = `n/2[t_1+t_n]`
S174 = `174/2[2+348]`
S174 = 87 × 350
S174 = 30450
Hence, the sum of all even numbers between 1 and 350 is 30450.
संबंधित प्रश्न
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an = 3 + 4n
Also, find the sum of the first 15 terms.
Find the sum of the first 15 terms of each of the following sequences having the nth term as
bn = 5 + 2n
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First term and the common differences of an A.P. are 6 and 3 respectively; find S27.
Solution: First term = a = 6, common difference = d = 3, S27 = ?
Sn = `"n"/2 [square + ("n" - 1)"d"]` - Formula
Sn = `27/2 [12 + (27 - 1)square]`
= `27/2 xx square`
= 27 × 45
S27 = `square`
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The sum of the first n terms of an A.P. is 4n2 + 2n. Find the nth term of this A.P.
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The sum of first n odd natural numbers is ______.
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Q.20
How many terms of the series 18 + 15 + 12 + ........ when added together will give 45?
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Find the sum of first 'n' even natural numbers.
If the first term of an A.P. is p, second term is q and last term is r, then show that sum of all terms is `(q + r - 2p) xx ((p + r))/(2(q - p))`.
