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 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 …

Shana wants to use all 62 feet of the fencing. Things To Know About Shana wants to use all 62 feet of the fencing.

Correct answers: 3 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 to find the width of the run. Which statements are true of the solution? Check all that apply.Mark wants to fence 4 rectangular gardens, each with a length of feet 9¼ and a width of feet 4½ . What is the total length of fencing Mark needs to surround all 4 gardens? Answer: The total length of fencing Mark needs to surround all 4 gardens is 110ft. Step-by-step explanation: Given. 4 rectangles of equal dimension. Length of a a garden ...Describing Steps to Solve a 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. ... Step 1: Substitute the length value of 20 into the equation: 21+2w=62 becomes 21+2w=62. Step 2: Use subtraction property of equality to isolate w. Subtract 21 from both ...Math. Calculus. Calculus questions and answers. ample 5 FENCING Vanessa has 180 feet of fencing that she intends to use to build a rectangular play area for her dog. She wants the play area to enclose at least 1800 square feet. What are the possible widths of …Expert-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.

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.A farmer wants to construct a fence around an area of 4056 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 they use in order to minimize the amount of fencing used?A farmer with 5,000 feet of fencing wants to enclose a rectangular field and then divide it into two plots by adding a fence in the middle parallel to one of the sides. Using the function A(x) = (x)(Sam has 1200 feet of fencing and wants to fence off a rectangular field that borders a straight river. He needs no fence along the river.

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.

Shana correctly used the perimeter formula for a rectangle and found the width of the dog run to be 11 feet. Explanation: Shana is using the formula for the perimeter of a rectangle, which is P = 2l + 2w, where P is the perimeter, l is the length, and w is the width. She knows the length (l) is 20 feet and the total perimeter is 62 feet.15 Sept 2006 ... ... all inquiries regarding its efforts to ... fencing, and hockey, all of which ranked ... use, a climbing wall, a weight room, a fitness room ...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 …1. A gardener wants to enclose a rectangular garden with area 600 square feet. She wants to use fencing on three sides of the garden that costs $4 per foot. She wants to use a fancier fencing on the front side of the garden that costs $8 per foot. (a) Draw a picture of the situation, and label the side lengths of the rectangle with variables.To find the width of a dog run for which Shana has 62 feet of fencing and plans a length of 20 feet, we use the equation 2l + 2w = 62, which reveals the width is 11 feet. Explanation: Finding the Width of a Rectangular Enclosure.

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 ...

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 = 400

ye has 44 feet of fencing to enclose a rectangular garden. She wants to to enclose as much area as possible. use trial and error; You are in the process of planning a garden in your back yard. The garden will be rectangular in shape. Determine the best; Jose wants to put fencing around his rectangular garden. His garden measures 31 feet by 33 feet.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 …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.Suppose you decide to fence the rectangular garden in the corner of your yard. Then two sides of the garden are bounded by the yard fence which is already there, so you only need to use the 80 feet of fencing to enclose the other two sides. What are the dimensions of the new garden of largest area?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 ... 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 ...

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.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? Problem 1100 feet of fencing. He wants to use all 1100 feet to construct a rectangle and two interior separators that together form three rectangular pens. o I W is the with of the larger rectangle, express the length L, of the rectangle in terms of W b) Egprss the total aren, /W),of the three pens as polynomial in terms of W.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.The longer sides are 16 ft. Rectangles have four sides, and sides opposite each other are always the same length. You know one side is 12 feet, so you know there is another side that is also 12 feet. 44-12=32. There are 32 feet of fencing to split between the two remaining sides, which means each one of them is 16 feet. long.

Precalculus questions and answers. A farmer wants to make a rectangular enclosure using 1600 feet of fencing. She wants to partition it into three parts, as shown in the following figure. If W is the width of the enclosure (as seen in the provided figure) and L is the length, find an expression giving L in terms of W. (Express numbers in exact ...Mark wants to fence 4 rectangular gardens, each with a length of feet 9¼ and a width of feet 4½ . What is the total length of fencing Mark needs to surround all 4 gardens? Answer: The total length of fencing Mark needs to surround all 4 gardens is 110ft. Step-by-step explanation: Given. 4 rectangles of equal dimension. Length of a a garden ...

Click an Item in the list or group of pictures at the bottom of the problem and, holding the button down, drag it into the correct position in the answer box. Release your mouse button when the item is place. If you change your mind, drag the item to the trashcan. Click the trashcan to clear all your answers. 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. 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 …14 Jun 2016 ... ... any other use that is not in conformity with ... all new fences ... That 128 notices of public hearing were mailed to all property owners of record.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?Core Connections Course 2. Find step-by-step Pre-algebra solutions and your answer to the following textbook question: Casey was building a rectangular pen for his pigs. He has 62 feet of fencing. The length of his pen is 9 feet longer than the width. Write and solve an equation to find the dimensions of the pen.. 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. 1 month ago. Solution 1. Guest #11827991. 1 month ago. Answer:

1. A gardener wants to enclose a rectangular garden with area 600 square feet. She wants to use fencing on three sides of the garden that costs $4 per foot. She wants to use a fancier fencing on the front side of the garden that costs $8 per foot. (a) Draw a picture of the situation, and label the side lengths of the rectangle with variables.

List the smallest width firsti ft to. FENCING Vanessa has 180 feet of fencing that she intends to use to build a rectangular play area for her dog. She wants the play area to enclose at least 1800 square feet. What are the possible widths of the play area?

FT BALANCED INCOME 62 F RE- Performance charts including intraday, historical charts and prices and keydata. Indices Commodities Currencies StocksA farmer has 216 feet of fencing and wants to build two identical pens for his prize-winning pigs. The pens will be arranged as shown so that the 216 = 3 x + 4 y. Use the steps below to determine the dimensions of a pen that will maximize its area A = L ⋅ W = 2 y ⋅ x a) Solve 3 x + 4 y = 216 for y.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.Answers: 3 on a 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. Which statements are true of the solution? Check all that apply. The value of w is 10 feet. The value of w …Having #70# ft of fencing with a #w# idth of #x# feet and knowing the perimeter of a rectangle is #p = 2w + 2l# we can state the length of the garden as: #70 = 2x + 2l# and solving for #l# we know the length with be: #2l = 70 - 2x# or #l = 35 - x# And then knowing the formula for the area of a rectangle is #a = w * l# we can write the equation as:The width of pen is, 11 feet. And, The length of pen = 9 + 11 = 20 feet. What is mean by Rectangle? A rectangle is a two dimension figure with 4 sides, 4 corners and 4 right angles. The opposite sides of the rectangle are equal and parallel to each other. Given that; Casey was building a rectangular pen for his pigs. And, He has 62 feet of 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 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 ...9 Feb 2009 ... ... ft. of ... fencing to karate under one organization, covering all in great detail. ... For example, if a neighborhood or a business wants to put all ...Core Connections Course 2. Find step-by-step Pre-algebra solutions and your answer to the following textbook question: Casey was building a rectangular pen for his pigs. He has 62 feet of fencing. The length of his pen is 9 feet longer than the width. Write and solve an equation to find the dimensions of the pen..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. A. The value of w is 10 feet. B. The value of w can be zero. C.

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.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. 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 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. 1. The value of w is 10 feet. 2. The value of w ... Problem 1100 feet of fencing. He wants to use all 1100 feet to construct a rectangle and two interior separators that together form three rectangular pens. o I W is the with of the larger rectangle, express the length L, of the rectangle in terms of W b) Egprss the total aren, /W),of the three pens as polynomial in terms of W.Instagram:https://instagram. why is dasher direct not workinghappy birthday daughter in law gifsavana cheshiremax's water dog races Having #70# ft of fencing with a #w# idth of #x# feet and knowing the perimeter of a rectangle is #p = 2w + 2l# we can state the length of the garden as: #70 = 2x + 2l# and solving for #l# we know the length with be: #2l = 70 - 2x# or #l = 35 - x# And then knowing the formula for the area of a rectangle is #a = w * l# we can write the equation as: wyze api keycommunity garage sales in san antonio tx She wants to use all the fencing to create a rectangular garden. The equation 2l+2w=55, where l is the length of the garden and w is the width, models the scenario. This equation can be used to find on dimension of the garden if the other dimension is known. If Miranda makes the garden 17.5 feet long, how wide should she make it? PLEASE HURRYThis 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 ... is virginia beach schools closed tomorrow Answer. First, divide both sides of the equation by 2 to get l + w = 33. Then, subtract w from both sides to get l = 33 - w. So, the function for the length, given the width, is l (w) = 33 - w. Calculus 1 / AB Notes.City of Milwaukee | Home