Let S1 be the sum of first 2n terms of an arithemetic progression. Let S2 be the sum of first 4n terms of the same arithmetic progression. If (S2−S1) is 1000 then sum of the first 6n terms of the arithmetic progression is equal to :
A
3000
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B
7000
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C
5000
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D
1000
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Solution
The correct option is A3000 S4n−S2n=1000⇒4n2(2a+(4n−1)d)−2n2(2a+(2n−1)d)=1000⇒n(2a+(6n−1)d)=1000⇒6n2(2a+(6n−1)d)=3000∴S6n=3000