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Find the maximum or minimum value of the product of two numbers whose difference is 14.49343-56-49
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Find the maximum or minimum value of the product of two numbers whose difference is 14.49343-56-49

User Waaghals
by
8.2k points

1 Answer

2 votes

Given:

The difference between the two numbers is 14.

Required:

We need to find the maximum or minimum value of the product of two numbers whose difference is 14.

Step-by-step explanation:

Let x be the first number.

The difference between the two numbers is 14.

The second number is x-14.

The product of the two numbers is


x(x-14)
x^2-14x

Differentiate this with respect to x and equate it to zero.


2x-14=0
2x-14+14=0+14
2x=14

Divide both sides by 2.


(2x)/(2)=(14)/(2)
x=7

Substitute x =7 in the product.


(7)^2-14(7)=-49

Final answer:

The maximum or minimum value of the product of two numbers whose difference is 14 is -49.

User Mchinaloy
by
8.7k points
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