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find the sum of the first 40 posative integers divisible by 6​

By Charlotte

find the sum of the first 40 posative integers divisible by 6​

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Charlotte


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the fuse of rating 3A, 5A, 7A are available.Which one of these will be most suitable to operate an electric iron of 1KW power at 2

2 thoughts on “find the sum of the first 40 posative integers divisible by 6​”

  2. Answer:

    The first 40 positive integers that are divisible by 6 are 6,12,18,24…

    a=6 and d=6.

    We need to find S

    40

    S

    n

    =

    2

    n

    [2a+(n−1)d]

    S

    40

    =

    2

    40

    [2(6)+(40−1)6]

    =20[12+(39)6]

    =20(12+234)

    =20×246

    =4920

    Reply

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