Find two numbers whose difference is 200 and whose product is a minimum.

Solution:

Let one number be x and the second number be y.

x - y = 200 --- (1)

The product of two numbers is minimum therefore

P = xy is minimum which means

dP/dx = 0 and 

d²P/dx² should be +ve 

Rewriting (1) as below we have:

y = x - 200

dy/dx = dx/dx - d(200)/dx

Since 200 is constant d(200)/dx = 0

dy/dx = 1

Now,

dP/dx = ydx/dx + xdy/dx = 0 --- (2)

Since dy/dx = 1

dP/dx = y + x = 0

y = - x

Since 

y - x = 200

(-x) - x = 200

-2x = 200

x = -100

And hence

y = 100

Also

d²P/dx² = dy/dx + dx/dx =1 + 1 = 2

Since second derivative is +ve

P = xy is minimum when x = -100 and y = 100

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Find two numbers whose difference is 200 and whose product is a minimum.

Summary:

The two numbers whose difference is 200 and whose product is a minimum are 100 and -100