# if you have 100 feet of fencing

how many posts for 100 feet of fence? | hunker, dec 8 2009 . fences can add privacy and help increase the value of your home. there are many types of fencing material and posts are generally required to help provide a structurally sound fence. the number of posts used and the positioning of the posts are critical to the appearance and longevity of the structure.

suppose you have 200 feet of fencing to enclose a rectangular plot ., may 3 2017 . this implies that each of the 4 sides are the same length and 200 feet4=50 feet ~~~~~~~~~~~~~~~~~~~~~~~. suppose we didn't know or didn't remember this fact: if we let the length be a and the width be b then. xxx2a+2b=200 (feet). xxx→a+b=100 or. xxxb=100−a. let f(a) be a function for the area of.

length/width math problem (296575) | wyzant resources, you have 600 feet of fencing to enclose a rectangular plot that borders on a river. if you do not fence the side along the river find the length and the width of the plot that will maximize the area. what is the largest area that can be enclosed? i've been having a lot of trouble with setting this equation up since.

optimization - asu, have some amount of fencing and i want to find out the dimensions that would give me the largest area? . we know that the perimeter of fence = 2400. in our case that means . if width (x) = 600 feet then length (y) = 2400- 2x = 2400 – 1200 = 1200 feet. thus the rectangular field should be 600 feet wide and 1200 feet long.

solution: if i have 100 ft. of fencing and i want to enclose the most ., you can put this solution on your website! if i have 100 ft. of fencing and i want to enclose the most area should i make the enclosure a circle triangle or a square prove your answer. -------------------------- with only 3 to choose from it's a matter of determining area vs. perimiter. circle: c = 2*pi*r = 100 r = 50/pi. area = pi*r^2

math quick take: optimizing your garden's area - bob sutor, jul 27 2011 . vacation gardening mathematics i'm on vacation this week and taking it easy so i thought i would do a post that appealed both to gardeners and math afficionados. here's the problem we're going to solve: suppose you buy 100 feet of wire fencing. what's the largest rectangular area garden you can.

if you have 100 ft. of fencing and want to enclose a rectangular ., if l is the size of the rectangle and w is the width then ______ |__|__|__|__| the completed fencing is 2l + 5w = 800 or l = 4 hundred - 5/2 w section = lw section = -2.5 w^2 + 400w darea/dw = -5 w + 4 hundred d2area/dw2 = -5 meaning the zeros of darea/dw are a optimal -5w +4 hundred = 0 w = 80 ft.

solution: you have 100 feet of fencing for a garden to be built ., solution: you have 100 feet of fencing for a garden to be built along the long wall at the back of your yard. what are the dimensions of the largest garden that can be enclosed by this fenci. algebra -> rectangles -> solution: you have 100 feet of fencing for a garden to be built along the long wall at the back of your yard.

solved: you have 100 ft of fencing to build a circular she ., answer to you have 100 ft of fencing to build a circular sheep den a.what is the diameter of the largest pen you can build? b.what.