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18 February, 12:49

Find two numbers differing by 46 whose product is as small as possible.

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  1. 18 February, 16:16
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    Let the numbers be x and y. They differ by 46. Then x = y + 46.

    Their product is P = xy. Since x = y + 46, P = xy = (y + 46) y, or

    P = y^2 + 46y. You could graph this and then identify the coordinates of the vertex, which would give you the minimum value of P.

    Or you could differentiate P (y) with respect to y, set the result = to 0, and solve for y:

    2y + 46 = 0; y = - 23. x = y + 46, or + 23.

    The vertex of the graph of this parabola represents the minimum value of the product P. It is (23, 46), and 46 is the smallest possible product here.
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