Find two positive numbers that satisfy the given requirements. The sum of the first number squared and the second number is 60 and the product is a maximum?

1 Answer
Apr 12, 2017

The numbers are #40# and #2sqrt(5)#. I know these aren't integers (and #sqrt(5)# isn't a rational number), but this is the most logical solution to this problem.

Explanation:

Let the numbers be #x# and #y#.

#x^2 + y = 60 -> y = 60 - x^2#

The product will be #P = xy#. Substituting from the first equation, we get:

#P = (60 - x^2)x#

#P = -x^3 + 60x#

We now find the derivative with respect to #x#.

#P' = -3x^2 + 60#

Now determine the critical numbers, which will occur when #P' = 0#.

#0 = -3x^2 + 60#

#0 = -3(x^2 - 20)#

#x = +- sqrt(20)#

#x= +- 2sqrt(5)#

We must check to make sure #x = + 2sqrt(5)# is indeed a maximum.

Test point #1#: #x = 4#

#P'(4) = -3(4)^2 + 60 = "positive"#

Test point #2#:#x = 5#

#P'(5) = -3(5)^2 + 60 = "negative"#

By increasing/decreasing rules, we can conclude that #2sqrt(5)# is a local maximum (this function has no absolute maximum).

This means that #y = 60 - (2sqrt(5))^2 = 40#.

Hopefully this helps!