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28 July, 00:30

The product of two numbers is 48. The first number is positive, and the second is four more than twice the first number. Find the 2 numbers.

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  1. 28 July, 00:34
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    The first number is positive, so the second has to be positive too so that their product can be a positive number which is 48.

    Suppose the first number is x and the second number is y.

    We know that:

    y = 4 + 2x (4 more meaning adding 4 to sthing and that sthing is twice x hence the 2x)

    Moving on, we have x. y = 48 (we replace y by its other value that has x in it so that we have only one unknown variable that we need to find)

    x. (4 + 2x) = 48

    4x + 2x^2 = 48

    2x^2 + 4x - 48 = 0 (we add (-48) on both sides)

    Now we have to solve the second degree equation, I don't know the exact names of things since I didn't study math in English, but we have to calculate the value of, say, b^2 - 4ac (ax^2 + bx + c)

    in this case b = 4, a = 2, c = - 48

    so b^2 - 4ac = 16 + 384 = 400, so the square root of that equals 20

    now, we have two possible values for x, suppose x1 and x2

    x1 = (-4 + 20) / 2. a = (-4 + 20) / 4 = 16/4 = 4

    x2 = (-4 - 20) / 2. a = (-4 - 20) / 4 = (-24) / 4 = (-6) (which is impossible giving that the two numbers must be positive)

    So x has to be equal to x1 = > x = 4

    We find x, and since y = 4 + 2x y = 4 + 2.4 = 4 + 8 = 12

    As a conclusion, x = 4, y = 12
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