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2.9 2.9 Score: 0/1000/10 answered Question 1 A piece of cardboard measuring 10 inches by 8...
To create an open-top box out of a sheet of cardboard that is 6 inches long...
To create an open-top box out of a sheet of cardboard that is 6 inches long and 5 inches wide, you make a square flap of side length x inches in each corner by cutting along one of the flap's sides and folding along the other. Once you fold up the four sides of the box, you glue each flap to the side it overlaps. To the nearest tenth, find the value of x that maximizes the volume of the...
An open box is made from a square piece of cardboard 20 inches on a side by cutting identical squares from the corners and turning up the sides
An open box is made from a square piece of cardboard 20 inches on a side by cutting identical squares from the corners and turning up the sides.(a) Express the volume of the box, V , as a function of the length of the side of the square cut from each corner, x. (b) Find and interpret V (1),V (2),V (3),V (4), and V (5). What is happening to the volume of the box as the length of the side...
You construct an open box from a square piece of cardboard, 24 inches on a side,...
You construct an open box from a square piece of cardboard, 24 inches on a side, by cutting out equal squares with sides of length from the corners and turning up the sides (see figure below). Write a function V, in terms of 2, that represents the volume of the box. Then use a calculator to graph V and use the graph to estimate the value of that produces a maximum volume. - - - - x - - x...
please help asap This Question: 4 pts 2 of 5 (1 complete) A box (with no...
please help asap
This Question: 4 pts 2 of 5 (1 complete) A box (with no top) will be made by cutting squares of equal size out of the corners of a 40 inch by 53 inch rectangular piece of cardboard, then folding the side flaps up. Find the maximum volume of such a box. ROUND TO THE NEAREST CUBIC INCH. The maximum volume is cubic inches Enter your answer in the answer box.
(1 point) An open box is to be made from a flat piece of material 8...
(1 point) An open box is to be made from a flat piece of material 8 inches long and 3 inches wide by cutting equal squares of length x from the corners and folding up the sides. Write the volume V of the box as a function of x. Leave it as a product of factors, do not multiply out the factors, V(x) = If we write the domain of V(x) as an open interval in the form (a, b),...
An open box is to be made from a rectangular piece of tin 12 inches long and 10 inches wide by cutting pieces of x-inch square from each corner and bonding up the sides
An open box is to be made from a rectangular piece of tin 12 inches long and 10 inches wide by cutting pieces of x-inch square from each corner and bonding up the sides. find the formula that expresses the volume of the box as a function of x.
0/17 points Previous Answers TanApMath7 10.5 006 MI This question has severaf parts that must be ...
0/17 points Previous Answers TanApMath7 10.5 006 MI This question has severaf parts that must be completed sequentialy. If you skip a part of the question, you wll not receive any points for the skipped part, and you will not be able to come back to the skipped part. Tutorial Exercise By cutting away identical squares from each corner of a rectangular piece of cardboard and folding up the resulting flaps, an open box may be made. If the cardboard...
Please answer the questions using MATLAB Exercise 1 Dimensions of the Largest Box An open bols to be made rom ฮ rectangular poce of cardboard measuring 8 x48. The box s made by cutting o ual squares...
Please answer the questions using MATLAB
Exercise 1 Dimensions of the Largest Box An open bols to be made rom ฮ rectangular poce of cardboard measuring 8 x48. The box s made by cutting o ual squares rom cach of its 4 corners and turning up the sides. Suggestion: you can try making one yourself with of paper) spare piece u8. 1. Let x be the side of a square removed from each corner. Express the volume v of the...
A candy box is made from a piece of cardboard that measures 25 by 14 inches. Squares of equal size will be cut out of each corner. The sides will then be folded up to form a rectangular box....
A candy box is made from a piece of cardboard that measures 25 by 14 inches. Squares of equal size will be cut out of each corner. The sides will then be folded up to form a rectangular box. Find the length of the side of the square that must be cut out if the volume of the box is to be maximized. What is the maximum volume? 14 in. A square with a side of length of 2.88 inches...
What point on the line y-7x + 8 is closest to the origin? Let D be the distance between the two p...
in urgent need with help on these three
What point on the line y-7x + 8 is closest to the origin? Let D be the distance between the two points. What is the objective function in terms of the x-coordinate? (Type an expression.) a. Find the radius and height of a cylindrical soda can with a volume of 398 cm3 that minimize the surface area. b. Compare your answer in part (a) to a real soda can, which has a...
To create an open-top box out of a sheet of cardboard that is 6 inches long and 5 inches wide, you make a square flap of side length x inches in each corner by cutting along one of the flap's sides and folding along the other. Once you fold up the four sides of the box, you glue each flap to the side it overlaps. To the nearest tenth, find the value of x that maximizes the volume of the...
You construct an open box from a square piece of cardboard, 24 inches on a side, by cutting out equal squares with sides of length from the corners and turning up the sides (see figure below). Write a function V, in terms of 2, that represents the volume of the box. Then use a calculator to graph V and use the graph to estimate the value of that produces a maximum volume. - - - - x - - x...
please help asap
This Question: 4 pts 2 of 5 (1 complete) A box (with no top) will be made by cutting squares of equal size out of the corners of a 40 inch by 53 inch rectangular piece of cardboard, then folding the side flaps up. Find the maximum volume of such a box. ROUND TO THE NEAREST CUBIC INCH. The maximum volume is cubic inches Enter your answer in the answer box.
(1 point) An open box is to be made from a flat piece of material 8 inches long and 3 inches wide by cutting equal squares of length x from the corners and folding up the sides. Write the volume V of the box as a function of x. Leave it as a product of factors, do not multiply out the factors, V(x) = If we write the domain of V(x) as an open interval in the form (a, b),...
0/17 points Previous Answers TanApMath7 10.5 006 MI This question has severaf parts that must be completed sequentialy. If you skip a part of the question, you wll not receive any points for the skipped part, and you will not be able to come back to the skipped part. Tutorial Exercise By cutting away identical squares from each corner of a rectangular piece of cardboard and folding up the resulting flaps, an open box may be made. If the cardboard...
Please answer the questions using MATLAB
Exercise 1 Dimensions of the Largest Box An open bols to be made rom ฮ rectangular poce of cardboard measuring 8 x48. The box s made by cutting o ual squares rom cach of its 4 corners and turning up the sides. Suggestion: you can try making one yourself with of paper) spare piece u8. 1. Let x be the side of a square removed from each corner. Express the volume v of the...
A candy box is made from a piece of cardboard that measures 25 by 14 inches. Squares of equal size will be cut out of each corner. The sides will then be folded up to form a rectangular box. Find the length of the side of the square that must be cut out if the volume of the box is to be maximized. What is the maximum volume? 14 in. A square with a side of length of 2.88 inches...
in urgent need with help on these three
What point on the line y-7x + 8 is closest to the origin? Let D be the distance between the two points. What is the objective function in terms of the x-coordinate? (Type an expression.) a. Find the radius and height of a cylindrical soda can with a volume of 398 cm3 that minimize the surface area. b. Compare your answer in part (a) to a real soda can, which has a...
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