Question 1119470
<font face="Times New Roman" size="+2">


The smallest perimeter for a rectangle with a given area is a square with sides equal to the square root of the area.  So take the square root of the area.  Round to the nearest integer.  Check to see if this integer is a factor of the area.  If it is, then this integer and the other factor of the area are the desired integer dimensions that yield the minimum perimeter.  If not, you need to find the integer that is closest to the square root of the area and is also a factor of the area.  For your problem, you are going to be done on the first try.  Other values for the area could be a bit more challenging.  Extra credit:  What would the smaller dimension of a minimum perimeter rectangle be if the area were a prime number?
								
								
John
*[tex \LARGE e^{i\pi}\ +\ 1\ =\ 0]
My calculator said it, I believe it, that settles it
<img src="http://c0rk.blogs.com/gr0undzer0/darwin-fish.jpg">
*[tex \Large \ \
*[tex \LARGE \ \ \ \ \ \ \ \ \ \  
								
{{n}\choose{r}}

</font>