Shana wants to use all 62 feet of the fencing.
Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. 3 answers; asked by jalisa; 1 year ago; 319 views; 0; 0
Learn. Intro to the coordinate plane. Solutions to 2-variable equations. Worked example: solutions to 2-variable equations. Completing solutions to 2-variable equations.Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l + 2w = 62 to find the width of the run. Which statements are true of the solution? Check all that apply. The value of w is 10 feet. The value of w can be zero.Question 810875: Amy wants to fence in a yard using 400 feet of fencing. I she wants the yard to be 30 feet wide, how long will it be Answer by TimothyLamb(4379) (Show Source): You can put this solution on YOUR website! p = 2L + 2W = 400 W = 30---2L + 2W = 400 2L + 2(30) = 400 2L + 60 = 400Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run.
Given that the total length of the fencing is 62 feet. As has to be fenced around a rectangular park , it would be the perimeter of the rectangular park. Also Shana wants the length of the run to be 20 feet. Hence the length of the park is 20 feet. Here we will use the formula for perimeter to find the width of the run . Perimeter = 2(l+w) 62=2 ... A coyote can jump an 8-foot fence. It is also very adept at climbing. To keep coyotes out of property, it is recommended to erect a wire fence that is at least 6 feet tall and topp...
Using an Equation with Two Variables to Solve a Problem Instruction 2 Slide Writing and Solving Equations in Two Variables greater less few Miranda has 55 feet of fencing. She wants to use all the fencing to create a rectangular garden. The equation 2𝑙+2 =55, where 𝑙is the length of the garden and is the width, models the scenario.... feet, far from any other plant, on a ... full use is legal, we have leased some land for farming. ... They decided, "All committee members want to start with Mrs.
Jun 12, 2020 · Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. Which statements are true of the solution? Mathematics. Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves …Correct answers: 1 question: Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. she decides to make the length of the run 20 feet. she writes and solves the equation 2l + 2w = 62 to find the width of the run. which statements are true of the solution? check all that apply. the value of w is 10 feet. the value of w can be …11.08.2020. Math. Secondary School. answered. Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length …Kevin has 65 feet of fencing. He wants to use all the fencing to create a rectangular fence around his pool. The equation 2L + 2W = 65, where l is the length of the fence and w is the width. If Kevin makes the length of the fence 13 feet long, how wide should he make it?
Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run.
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Get the correct answer Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. Which statements are true of the solution? Check all that apply. Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation to find the width of the run. Which statements are true of the solution? a. The value of w is 10 feet. b. The value of w can be zero. c.Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make tt length of the run 20 feet. She writes and solves the equation 21+2w=62 to find the width of the run. Which statements are true of the solution? Check all that apply. The value of w is 10 feet. The value of w can be zero.This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts. See Answer. Question: A person has 1800 feet of fencing and wants to enclose a rectangular plot that borders a straight road. If the person does not fence the side along the road, what is the largest area that can be ...
Given that the total length of the fencing is 62 feet. As has to be fenced around a rectangular park , it would be the perimeter of the rectangular park. Also Shana wants the length of the run to be 20 feet. Hence the length of the park is 20 feet. Here we will use the formula for perimeter to find the width of the run . Perimeter = 2(l+w) 62=2 ...Consider the following problem: a farmer with 950 feet of fencing wants to enclose a rectangular area and then divise it into four pens weh fencing parailel to one side of the rectangle. What is be iargest pessible total area of the four pens? (a) Draw several diagrams ifvitrating the stuation, some wath shalow, wise pens and some with dees ...You want to make a rectangular pen for Ellie, your pet elephant. What?! You don’t have a pet elephant? That’s rather unfortunate; they’re quite cute. Well, imagine you have one. You want to make sure Ellie has as much space as possible. Unfortunately, you only have 28 feet of fencing available. If you use all of your fencing toPrealgebra questions and answers. Ron has 146 feet of fencing to make a rectangular garden in his backyard. He wants the length to be 33 feet more than the width. Find the width. a) On your work, write an equation using the information as it is given above that can be solved to answer the question. b) Solve c) The width is feet.Step 1. Given that, a... Question A farmer wants to construct a fence around an area of 486 square feet in a rectangular field and then divide it in half with a fence parallel to one of the sides of the rectangle. What dimensions should the fenced area have in order to minimize the length of fencing used? See Answer. Question: Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. You'll get a detailed solution from a subject matter expert that helps you learn core concepts. Question: Jonny wants to build a fenced garden, and was able to purchase 44 feet of fencing on sale. He intends to use all of the fencing to fence the garden. If he wants the length of the garden to be 8 feet more than the width what must the width ...
Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. 1 month ago. Solution 1. Guest #11827991. 1 month ago. Answer: Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. There are 2 steps to solve this one. Expert-verified.
Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the …The width of rectangular run is 11 feet. Solution: Given that, Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. Therefore, Perimeter = 62 feet. Perimeter is given by formula: Perimeter = 2(length + width ) Therefore, 62 = 2(length + width ) She decides to make the length of the run 20 feet. Therefore ...Answer: The correct options are C, D and E. Step-by-step explanation: Consider the provided information. Perimeter of a rectangular field is: Shana wants to …VIDEO ANSWER: The given statement needs to be checked to see if it is true or false. There can be at most one triangle if you are…Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. Which statements are true of the solution?Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run.Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l + 2w = 62 to find the width of the run.
Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l + 2w = 62 to find the width of the run. Which statements are true of the solution?
2L + 2W = 100 feet. in English, "Two lengths plus two widths equal 100 feet." The second thing you know is that the length is 10 feet longer than the width, so the second equation you can write is . L = W + 10. Now that you have defined L in terms of W you can solve the problem. First substitute "W + 10" for L in the first equation. 2(W + 10 ...
A homeowner wants to fence a rectangular play yard using 80 feet of fencing. The side of the house will be used as one side of the rectangle. Find the dimensions for which the area of the play yard will be a maximum. There are 3 steps to solve this one. Expert-verified.w = 22/2. w = 11. So, the statement A is not true. The value of 'w' is 11 feet, not 10 feet. B. The value of w can be zero. To check if 'w' can be zero, we substitute 'w' with 0 in the equation and see if it is valid: 2 (20) + 2 (0) = 62. 40 + 0 = 62.Answer:62 is divided by 20 gets answer. cheyluna2005 cheyluna2005 11.06.2019 Math Secondary School answered Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation to find the width of the run.8 years ago. It says. "In the following inequality, C represents the number of cat videos..." It's telling you that the variable C represents how many cat videos there are. The coefficient 750 represents how many comments each cat video has. If there are C number of cat videos and there are 750 comments on each cat video, then the total number ...Mrs. Raboud has 24 feet of fencing. She wants to use all of the fencing to enclose a rectangular flower bed. The graph below shows how the area of the flower bed depends on the length of one of its sides. 3 Length (feet) What side length will give the flower bed the maximum area? A 18 ft B 6ft C 36 ft D 12 ftExpert-verified. Recognize that the perimeter of a rectangle is the sum of all sides, or 2 ( l + w) where l is length and w is width. Andrea wants to build a rectangular play area for her dog using 36 feet of fencing. She wants the play area to be as large as possible. Determine the length and width, in feet of the play area Andrea should bulld.The width of rectangular run is 11 feet. Solution: Given that, Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. Therefore, Perimeter = 62 feet. Perimeter is given by formula: Perimeter = 2(length + width ) Therefore, 62 = 2(length + width ) She decides to make the length of the run 20 feet. Therefore ...Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l+2w=62 to find the width of the run. Which statements are true of the solution? Check all that apply.Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. Which statements are true of the solution? Check all that apply. The value of w is 10 feet. The value of w can be ...Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l + 2w = 62 to find the width of the run. Which statements are true of … Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2 l plus 2 w equals 62 to find the width of the run. There are 2 steps to solve this one. Expert-verified. It is given in the problem that the equation to find the width of the run is 2l+2w=62 and l=20 feet. You can plug in 20 for l in the previous equation by using Substitution. It should look like this: 2(20)+2w=62. Next multiply 2 by 20 to get 40: 40+2w=62. Then subtract 40 from both sides: (Subtraction property of equality) 2w=22. Then divide 2 ...
Amy wants to fence in a yard using 400 feet of fencing. If she wants the yard to be 30 feet wide, how long will it be? (A) 170 feet (B) 175 feet (C) 180 feet (D) 185 feet. There are 2 steps to solve this one. Recognize that the total fencing used to fence the yard equals to the perimeter of the rectangular yard and that the perimeter of a ...FT EQUITY CLOSED-END 62 RE- Performance charts including intraday, historical charts and prices and keydata. Indices Commodities Currencies StocksA farmer has 10,000 feet of fencing. He wants to build a rectangular enclosure along the side of a long river, and, as such, he does not need any fencing along the river. See the figure below. Which of the following functions should be maximized to make the rectangular enclosure as large as possible? A(x)=10000x−x2 A(x)=x+ x10000 A(x)=2x ...Instagram:https://instagram. dmv elyria ohprotogen lethal companyhow do you remove a pella sliding screen door3kh0 slope You want to make a rectangular pen for Ellie, your pet elephant. What?! You don’t have a pet elephant? That’s rather unfortunate; they’re quite cute. Well, imagine you have one. You want to make sure Ellie has as much space as possible. Unfortunately, you only have 28 feet of fencing available. If you use all of your fencing toSep 19, 2016 · Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l + 2w = 62 to find the width of the run. Which statements are true of the solution? Check all that apply. The value of w is 10 feet. The value of w can be zero. hotels near i 40 albuquerque new mexicodeez nuts joke Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation to find the width of the run. Which statements are true of the solution? a. The value of w is 10 feet. b. The value of w can be zero. c.Shana wants to use all 62 feet of the fencing she has to make a rectangular run for her dog. She decides to make the length of the run 20 feet. She writes and solves the equation 2l + 2w =62 to find the width of the run. Which statements are true of the solution? Check all that apply. freeprints invite code 2L + 2W = 100 feet. in English, "Two lengths plus two widths equal 100 feet." The second thing you know is that the length is 10 feet longer than the width, so the second equation you can write is . L = W + 10. Now that you have defined L in terms of W you can solve the problem. First substitute "W + 10" for L in the first equation. 2(W + 10 ...2L + 2W = 100 feet. in English, "Two lengths plus two widths equal 100 feet." The second thing you know is that the length is 10 feet longer than the width, so the second equation you can write is . L = W + 10. Now that you have defined L in terms of W you can solve the problem. First substitute "W + 10" for L in the first equation. 2(W + 10 ...