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26 February, 13:23

Find two consecutive odd integers such that their product is 119 more than 7 times their sum.

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  1. 26 February, 14:00
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    Answer - (19 and 21) or (-7 and - 5)

    Solution -

    let the first odd number is x, then its next odd number will be x+2.

    So sum of these numbers = x + (x+2) and product of these numbers x * (x+2)

    from the question it can be concluded that

    x (x+2) = 7 (x+x+2) + 119

    ⇒ x² + 2x = 7 (2x+2) + 119

    ⇒ x² + 2x = 14x + 133

    ⇒ x² - 12x - 133 = 0

    ⇒ x² - 19x + 7x - 133 = 0

    ⇒ x (x-19) + 7 (x-19) = 0

    ⇒ (x-19) (x+7) = 0

    ⇒ x = 19, - 7

    so here the value of x is either 19 or - 7

    if the first odd number is 19, then the next odd number is 21 and if the first number is - 7, then the next number should be - 5.
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