damilysgonzalez2
29.07.2019 •
Mathematics
Jim wants to build a rectangular parking lot along a busy street but only has 2400 feet of fencing available. if no fencing is required along the street, find the maximum area of the parking lot.
Solved
Show answers
More tips
- S Sport Running: How to Do It Right?...
- F Food and Cooking How to Cook Spaghetti Right – Secrets and Tips...
- P Philosophy Personal attitude towards Confession: how to prepare and undergo the procedure correctly?...
- H Health and Medicine Flu: How to Recognize It by the First Symptoms?...
- F Food and Cooking How to Sober Up Quickly? Important Facts and Tips...
- H Health and Medicine How to Properly Take a Blood Sugar Test?...
- H Health and Medicine Simple and Effective: How to Get Rid of Cracked Heels...
- O Other How to Choose the Best Answer to Your Question on The Grand Question ?...
- L Leisure and Entertainment History of International Women s Day: When Did the Celebration of March 8th Begin?...
- S Style and Beauty Intimate Haircut: The Reasons, Popularity, and Risks...
Answers on questions: Mathematics
- M Mathematics Can someone help out with this...
- M Mathematics What is the image of (-8,-8) after dilation by a scale factor of {1/4} centered at the origin?...
- M Mathematics PLEASE CAN U HELP ME ...
- M Mathematics Find the area of the triangle. 10 ft 14 ft The area of the triangle is square feet....
- M Mathematics Please answer you can take a wild guess if you would like but here is my question How long do you think it would take to mow 96 acres of land?....
- M Mathematics Need help solving this...
- M Mathematics A field is surrounded b a racetrack. It is getting sodded with new grass. The racetrack has a rectangular center and a semicircle. The length of the rectangle measures is...
- M Mathematics If a sequence is defined recursively by f(0) = 2 and f(n + 1) = 2f(n) + 3 for n ≥ 0, then f(2) is equal to...
- M Mathematics If you get this right i’ll give the brainliest answer...
- M Mathematics Select the correct answer from each drop-down menu. Consider the following polynomials equations. A = 3x^2(x-1) B = -3x^3+4c^2-2x+1...
Ответ:
First, let's create an equation for the area based upon the length. Since we have a total of 2400 feet of fence and only need to fence three sides of the region, we can define the width based upon the length as: W = (2400 - L)/2
And area is: A = LW
Substitute the equation for width, giving: A = LW A = L(2400 - L)/2
And expand: A = (2400L - L^2)/2 A = 1200L - (1/2)L^2
Now the easiest way of solving for the maximum area is to calculate the first derivative of the expression above, and solve for where it's value is 0. But since this is supposedly a high school problem, and the expression we have is a simple quadratic equation, we can solve it without using any calculus. Let's first use the quadratic formula with A=-1/2, B=1200, and C=0 and get the 2 roots which are 0 and 2400. Then we'll pick a point midway between those two which is (0 + 2400)/2 = 1200. And that should be your answer. But let's verify that by using the value (1200+e) and expand the equation to see what happens:
A = 1200L - (1/2)L^2
A = 1200(1200+e) - (1/2)(1200+e)^2
A = 1440000+1200e - (1/2)(1440000 + 2400e + e^2)
A = 1440000+1200e - (720000 + 1200e + (1/2)e^2)
A = 1440000+1200e - 720000 - 1200e - (1/2)e^2
A = 720000 - (1/2)e^2
And notice that the only e terms is -(1/2)e^2. ANY non-zero value of e will cause this term to be non-zero and negative meaning that the total area will be reduced. Therefore the value of 1200 for the length is the best possible length that will get the maximum possible area.
Ответ:
Both pure tessellations and regular tessellations are formed by repeating a single shape. However, regular tessellations are formed using only regular polygons (triangles, squares, or hexagons). Pure tessellations can be any shape that can be repeated without overlap or gaps.
Step-by-step explanation: