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Transcript
Chapter 3.7–4 Find two positive numbers whose product is 154 and whose sum is a minimum. Solution: Let the two points be represented by the symbols x and y . The phrase “two positive numbers whose product is 154” can be represented by the equation xy = 154 . This is the equation that shows the relationship between x and y . The phrase “whose sum is a minimum “ can be represented by the equation x + y = S , where S is a real number. This is the equation where we minimize the sum. From the equation xy = 154 , y = 154 154 . Substitute this value in the equation x + =S. x x Take the derivative, find the critical number(s), and test them. x+ 154 = x + 154 x −1 = S x S ' ( x ) = 1 − 154 x −2 = 0 x 2 = 154 x = ± 154 We delete the negative number because the problem stated positive numbers. Let’s test the critical number. S ' (150 ) = 1 − 154 ( 150 ) 2 < 0 . This means the function is decreasing to the left of the critical number. S ' (160 ) = 1 − 154 ( 160 ) 2 > 0 This means the function is increasing to the right of the critical number. This means that x = 154 is the location of a local minimum. The other number is y= 154 154 = = 154 . x 154 The two numbers are both 154 . The product of the numbers is 154 and the sum is 2 154 .
