Area Questions and Answers

You are designing a rectangular swimming pool to be set into the ground. The width of the pool is 5 feet less than the length, and the depth is 40 feet less than the length. The pool holds 9000 cubic feet of water. What are the dimensions of the pool?
Math
Area
You are designing a rectangular swimming pool to be set into the ground. The width of the pool is 5 feet less than the length, and the depth is 40 feet less than the length. The pool holds 9000 cubic feet of water. What are the dimensions of the pool?
A tent is in the shape of a cylinder surmounted by a conical top. If the height and diameter of the cylindrical part are 2.1 m and 4 m respectively, and the slant height of the top is 2.8 m, find the area of the canvas used for making the tent. Also, find the cost of the canvas of the tent at the rate of ₹500 per m². (Note that the base of the tent will not be covered with canvas.)
Math
Area
A tent is in the shape of a cylinder surmounted by a conical top. If the height and diameter of the cylindrical part are 2.1 m and 4 m respectively, and the slant height of the top is 2.8 m, find the area of the canvas used for making the tent. Also, find the cost of the canvas of the tent at the rate of ₹500 per m². (Note that the base of the tent will not be covered with canvas.)
The lengths of the sides of a rectangular prism are made, twice as long to create a new prism. How does the surface area of the new, larger prism compare to the surface area of the original prism? The surface area of the new prism is twice as large as the surface area of the original prism. The surface area of the new prism is four times as large as the surface area of the original prism. The surface area of the new prism is six times as large as the surface area of the original prism. The surface area of the new prism is eight times as large as the surface area of the original prism.
Math
Area
The lengths of the sides of a rectangular prism are made, twice as long to create a new prism. How does the surface area of the new, larger prism compare to the surface area of the original prism? The surface area of the new prism is twice as large as the surface area of the original prism. The surface area of the new prism is four times as large as the surface area of the original prism. The surface area of the new prism is six times as large as the surface area of the original prism. The surface area of the new prism is eight times as large as the surface area of the original prism.
HAPPULO Box A: 7.5 in. by 6.25 in. by 10 in. Box B: 8 in. by 5.25 in. by 11.5 in. [] They need to decide which box will be less expensive for them to use. That is what you will figure out in # 1-5 below." (Note: The amount of cardboard needed to make a box is determined by the surface area of the box since the cardboard covers each surface. This is not a volume problem because we are not interested in the amount of space contained in the box.) 1. How much cardboard does it take to make Box A? (Ignore any overlapping of flaps.) 2. How much cardboard does it take to make Box B? (Ignore any over pping of flaps.) 3. The cardboard costs $0.04 per square inch. How much will it cost to make Box A?
Math
Area
HAPPULO Box A: 7.5 in. by 6.25 in. by 10 in. Box B: 8 in. by 5.25 in. by 11.5 in. [] They need to decide which box will be less expensive for them to use. That is what you will figure out in # 1-5 below." (Note: The amount of cardboard needed to make a box is determined by the surface area of the box since the cardboard covers each surface. This is not a volume problem because we are not interested in the amount of space contained in the box.) 1. How much cardboard does it take to make Box A? (Ignore any overlapping of flaps.) 2. How much cardboard does it take to make Box B? (Ignore any over pping of flaps.) 3. The cardboard costs $0.04 per square inch. How much will it cost to make Box A?
Evaluate the integral, where E is the solid that lies within the cylinder x² + y2 = 9, above the plane z = 0, and below the cone z² = 9x² +9y^2. Use cylindrical coordinates. ∫∫∫E x² dv
Math
Area
Evaluate the integral, where E is the solid that lies within the cylinder x² + y2 = 9, above the plane z = 0, and below the cone z² = 9x² +9y^2. Use cylindrical coordinates. ∫∫∫E x² dv
Sam wants to fence his rectangular garden plot along its length on the front side. The perimeter of the plot is 24 meters, and its length is 3 times its width. If x is the length and y is the width of the plot, set the equations of the system. Solve and determine the values of x and y. If the cost of fencing is $25 per meter, how much does Sam need to spend on fencing?
Math
Area
Sam wants to fence his rectangular garden plot along its length on the front side. The perimeter of the plot is 24 meters, and its length is 3 times its width. If x is the length and y is the width of the plot, set the equations of the system. Solve and determine the values of x and y. If the cost of fencing is $25 per meter, how much does Sam need to spend on fencing?
The width of a rectangle is two-thirds of its length, and its area is 216 square meters. What is the length? 27 m 12 m 18 m
Math
Area
The width of a rectangle is two-thirds of its length, and its area is 216 square meters. What is the length? 27 m 12 m 18 m
Tracy needs to find the length and width of the equipment storage room where she works. The room is 4 meters longer than it is wide. Its perimeter is 24 meters. Find the width in meters.
Math
Area
Tracy needs to find the length and width of the equipment storage room where she works. The room is 4 meters longer than it is wide. Its perimeter is 24 meters. Find the width in meters.
Water is leaking out of an inverted conical tank at a rate of 10,000 cm³/min at the same time that water is being pumped into the tank at a constant rate. The tank has height 6 m and the diameter at the top is 4 m. If the water level is rising at a rate of 20 cm/min when the height of the water is 2 m, find the rate at which water is being pumped into the tank.
Math
Area
Water is leaking out of an inverted conical tank at a rate of 10,000 cm³/min at the same time that water is being pumped into the tank at a constant rate. The tank has height 6 m and the diameter at the top is 4 m. If the water level is rising at a rate of 20 cm/min when the height of the water is 2 m, find the rate at which water is being pumped into the tank.
Directions: Design an ice cream cone and a scoop of ice cream so that if the ice cream melts completely: 1) It fits exactly in the cone. Show the picture with the dimensions. Justify that it satisfies the condition.
Math
Area
Directions: Design an ice cream cone and a scoop of ice cream so that if the ice cream melts completely: 1) It fits exactly in the cone. Show the picture with the dimensions. Justify that it satisfies the condition.
Tomás found the area of a rectangle to be square inch. Which could be the side lengths of the rectangle? A inch and inch 3 4 Ⓡinch and inch C inch and inch Ⓒinch and inch 1 12
Math
Area
Tomás found the area of a rectangle to be square inch. Which could be the side lengths of the rectangle? A inch and inch 3 4 Ⓡinch and inch C inch and inch Ⓒinch and inch 1 12
You read online that a 15 ft by 20 ft brick patio would cost about $2,275 to have professionally installed. Estimate the cost of having a 27 by 30 ft brick patio installed.
Math
Area
You read online that a 15 ft by 20 ft brick patio would cost about $2,275 to have professionally installed. Estimate the cost of having a 27 by 30 ft brick patio installed.
Consider the region enclosed by the graphs of 2y = 3√, y = 8, and 2y + 2x = 5. The area A of this region could be computed in two ways: 1) By integrating with respect to x, A = ∫h₁(x) dx + ∫h₂(x) dx where a = ,b = , c = , h₁(x) = ,and h₂(x)= The area A = . 2) By integrating with respect to y, A = ∫h3(y) dy where d = ,e = ,and h3(y)= The area A =
Math
Area
Consider the region enclosed by the graphs of 2y = 3√, y = 8, and 2y + 2x = 5. The area A of this region could be computed in two ways: 1) By integrating with respect to x, A = ∫h₁(x) dx + ∫h₂(x) dx where a = ,b = , c = , h₁(x) = ,and h₂(x)= The area A = . 2) By integrating with respect to y, A = ∫h3(y) dy where d = ,e = ,and h3(y)= The area A =
A rectangular field is 380 yards in length and 157 yards in width. Find the area of the field in ACRES (1 acre = 43,560 square feet). Round to the nearest tenth of an acre
Math
Area
A rectangular field is 380 yards in length and 157 yards in width. Find the area of the field in ACRES (1 acre = 43,560 square feet). Round to the nearest tenth of an acre
An interior decorator needs border trim for a home she is wallpapering. She needs 36 feet of border trim for the living room, 33 feet of border trim for the bedroom, and 45 feet of border trim for the dining room. How many yards of border trim does she need?
Math
Area
An interior decorator needs border trim for a home she is wallpapering. She needs 36 feet of border trim for the living room, 33 feet of border trim for the bedroom, and 45 feet of border trim for the dining room. How many yards of border trim does she need?
Non-calculator: Consider a circle with a radius of k. Explain and show why there must be a square that has a diagonal with a length between k and 2k and an area that is half the area of the circle.
Math
Area
Non-calculator: Consider a circle with a radius of k. Explain and show why there must be a square that has a diagonal with a length between k and 2k and an area that is half the area of the circle.
The campus of a college has plans to construct a rectangular parking lot on land bordered on one side by a highway. There are 640 ft of fencing available to fence the other three sides. Let x represent the length of each of the two parallel sides of fencing. (a) Express the length of the remaining side to be fenced in terms of x. (b) What are the restrictions on x? (c) Determine a function A that represents the area of the parking lot in terms of x. (d) Determine the values of x that will give an area between 30,000 and 40,000 ft². (e) What dimensions will give a maximum area, and what will this area be?
Math
Area
The campus of a college has plans to construct a rectangular parking lot on land bordered on one side by a highway. There are 640 ft of fencing available to fence the other three sides. Let x represent the length of each of the two parallel sides of fencing. (a) Express the length of the remaining side to be fenced in terms of x. (b) What are the restrictions on x? (c) Determine a function A that represents the area of the parking lot in terms of x. (d) Determine the values of x that will give an area between 30,000 and 40,000 ft². (e) What dimensions will give a maximum area, and what will this area be?
Sketch the following to help answer the question. Kite QRST has a short diagonal of QS and a long diagonal of RT. The diagonals intersect at point P. Side QR = 17 m, diagonal QS = 30 m, and segment PT = 25 m. Find the area of kite QRST. 8m² 33 m² 495 m² 990 m²
Math
Area
Sketch the following to help answer the question. Kite QRST has a short diagonal of QS and a long diagonal of RT. The diagonals intersect at point P. Side QR = 17 m, diagonal QS = 30 m, and segment PT = 25 m. Find the area of kite QRST. 8m² 33 m² 495 m² 990 m²
You have 200 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 width of the plot that will maximize the area. What is the largest area that can be contained by the fencing?
Math
Area
You have 200 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 width of the plot that will maximize the area. What is the largest area that can be contained by the fencing?
A high school is building a new gymnasium in the shape of a pyramid. Its base is a square with each side 500 feet long and has a slant height of 60 feet. What is closest to the surface area of this pyramid? 310,000 ft² 265,000 ft² 490,000 ft² 280,000 ft²
Math
Area
A high school is building a new gymnasium in the shape of a pyramid. Its base is a square with each side 500 feet long and has a slant height of 60 feet. What is closest to the surface area of this pyramid? 310,000 ft² 265,000 ft² 490,000 ft² 280,000 ft²
Use the Fundamental Theorem of Calculus to find the area of the region between the graph of the function 5/7 x(2/7) + 1/2 x(4/9) + 6 and the x-axis on the interval [4,8]. Round off your answer to the nearest integer. 52 units² 40 units² 33 units² 34 units²
Math
Area
Use the Fundamental Theorem of Calculus to find the area of the region between the graph of the function 5/7 x(2/7) + 1/2 x(4/9) + 6 and the x-axis on the interval [4,8]. Round off your answer to the nearest integer. 52 units² 40 units² 33 units² 34 units²
Sketch the region enclosed by the curves given below. Decide whether to integrate with respect to x or y. Then find the area of the region. 9y+ x = 9, y² − x = 1 Area = M
Math
Area
Sketch the region enclosed by the curves given below. Decide whether to integrate with respect to x or y. Then find the area of the region. 9y+ x = 9, y² − x = 1 Area = M
Sketch the region bounded by the given curves, then find the area of the region. y=18/x^3 , y= 3/x^2 , x=3 , x=4
Math
Area
Sketch the region bounded by the given curves, then find the area of the region. y=18/x^3 , y= 3/x^2 , x=3 , x=4
We spent a bit of time working with parallelograms, trapezoids and triangles. Suppose that a shape has an area of 30 square units. Draw and label it if it is a ... and show how you know. a) parallelogram b) trapezoid c) triangle
Math
Area
We spent a bit of time working with parallelograms, trapezoids and triangles. Suppose that a shape has an area of 30 square units. Draw and label it if it is a ... and show how you know. a) parallelogram b) trapezoid c) triangle
A farmer wants to make a rectangular pen for his sheep. He has 120m fencing material to cover three sides with the other side being a brick wall. What dimensions would maximize the space for his sheep? width 20, length 50 width 30, length 60 width 3, length 150 width 40, length 40
Math
Area
A farmer wants to make a rectangular pen for his sheep. He has 120m fencing material to cover three sides with the other side being a brick wall. What dimensions would maximize the space for his sheep? width 20, length 50 width 30, length 60 width 3, length 150 width 40, length 40
Your company wants to make the largest and most luxurious rectangular dog kennels possible with 56 feet of fencing. The design of the kennel is to use the back side of the dog owner's house as one side of the kennel. The other three sides of the kennel must be made from the fencing. What is the largest area your company can make for these new kennels? • Write answer as a number only. • Round answer to two decimal places if necessary.
Math
Area
Your company wants to make the largest and most luxurious rectangular dog kennels possible with 56 feet of fencing. The design of the kennel is to use the back side of the dog owner's house as one side of the kennel. The other three sides of the kennel must be made from the fencing. What is the largest area your company can make for these new kennels? • Write answer as a number only. • Round answer to two decimal places if necessary.
Jorge wants to make an open top box from a flat rectangular piece of cardboard measuring 12 inches by 24 inches. To do this Jorge will cut identical squares out of the corners of the cardboard and then fold up the sides. Jorge wants to use this box to store some of his card collection. He calculated that he will need the area of the base of the box to be 100 square inches to fit all the cards he has in mind. What is the length of the sides of the squares Jorge needs to cut out of his original cardboard to get the size of box he wants? . Write your answer as a number only. Round your answer to 2 decimal places if necessary.
Math
Area
Jorge wants to make an open top box from a flat rectangular piece of cardboard measuring 12 inches by 24 inches. To do this Jorge will cut identical squares out of the corners of the cardboard and then fold up the sides. Jorge wants to use this box to store some of his card collection. He calculated that he will need the area of the base of the box to be 100 square inches to fit all the cards he has in mind. What is the length of the sides of the squares Jorge needs to cut out of his original cardboard to get the size of box he wants? . Write your answer as a number only. Round your answer to 2 decimal places if necessary.
A piece of art is in the shape of an equilateral triangle with sides of 7 in. Find the area of the piece of art. Round your answer to the nearest tenth. None of these 42.4 in² 17.3 in2 21.2 in2
Math
Area
A piece of art is in the shape of an equilateral triangle with sides of 7 in. Find the area of the piece of art. Round your answer to the nearest tenth. None of these 42.4 in² 17.3 in2 21.2 in2
The length of a rectangle is modeled by l(x) = 3x² + 5x - 2 and its width is modeled by w(x) = 4x 1. Which of the following models the area of the rectangle A(x)? A(x) = 3x² + (4x-1) + 5x - 2(4x-1) A(x) = 12x³ + 17x² - 13x + 2 A(x) = 12x³ + 23x² - 3x - 2 A(x) = 12x³ + 17x² - 3x - 2
Math
Area
The length of a rectangle is modeled by l(x) = 3x² + 5x - 2 and its width is modeled by w(x) = 4x 1. Which of the following models the area of the rectangle A(x)? A(x) = 3x² + (4x-1) + 5x - 2(4x-1) A(x) = 12x³ + 17x² - 13x + 2 A(x) = 12x³ + 23x² - 3x - 2 A(x) = 12x³ + 17x² - 3x - 2
The base of a triangle is eight more than twice the height. The area of the triangle is 285 square feet. Find the measures of the base and height of the triangle. The base measures The height measures feet square feet
Math
Area
The base of a triangle is eight more than twice the height. The area of the triangle is 285 square feet. Find the measures of the base and height of the triangle. The base measures The height measures feet square feet
A regular heptagon with 7 sides is inscribed in a circle with radius 9 millimeters. What is the area of the figure? (3 points) 260.262 mm. 221.649 mm.² 189.985 mm.2 31.664 mm.²
Math
Area
A regular heptagon with 7 sides is inscribed in a circle with radius 9 millimeters. What is the area of the figure? (3 points) 260.262 mm. 221.649 mm.² 189.985 mm.2 31.664 mm.²
Mateo uses 94.5 feet of fence for a rectangular pen alongside his house. He only needs to fence three sides such that the pen's width is % of its length. He decides to put the shorter side (width) along the house as shown. What is the area inside the pen? Enter the value of the answer in the first blank and enter the units in the second. Enter your answer in decimal form. Round to the nearest tenth if rounding is necessary. Enter units as ft., square ft., or cubic ft. The area inside the pen is (about)
Math
Area
Mateo uses 94.5 feet of fence for a rectangular pen alongside his house. He only needs to fence three sides such that the pen's width is % of its length. He decides to put the shorter side (width) along the house as shown. What is the area inside the pen? Enter the value of the answer in the first blank and enter the units in the second. Enter your answer in decimal form. Round to the nearest tenth if rounding is necessary. Enter units as ft., square ft., or cubic ft. The area inside the pen is (about)
Roger will pour concrete to make a sidewalk with the dimensions, in feet, shown in the figure below. He will pour the concrete to a depth of 4 inches. One bag of concrete mix makes 0.6 cubic feet of concrete. What is the least whole number of bags of concrete mix that Roger needs in order to make the sidewalk?
Math
Area
Roger will pour concrete to make a sidewalk with the dimensions, in feet, shown in the figure below. He will pour the concrete to a depth of 4 inches. One bag of concrete mix makes 0.6 cubic feet of concrete. What is the least whole number of bags of concrete mix that Roger needs in order to make the sidewalk?
Select two solids for which the formula V = Bh applies. Cone Cylinder Pyramid Rectangular Prism Sphere
Math
Area
Select two solids for which the formula V = Bh applies. Cone Cylinder Pyramid Rectangular Prism Sphere
A basketball court measures 1012 inches on the sides while the baseline stretches 695 inches. There is a circle in the middle of the cour that has a diameter of 72 inches. The team can fit 13 people in the circle at one time. How many people can fit on a court? Helpful Formulas: A = lw A=πr² O 698,600 people 50,000 people 2245 people 2405 people
Math
Area
A basketball court measures 1012 inches on the sides while the baseline stretches 695 inches. There is a circle in the middle of the cour that has a diameter of 72 inches. The team can fit 13 people in the circle at one time. How many people can fit on a court? Helpful Formulas: A = lw A=πr² O 698,600 people 50,000 people 2245 people 2405 people
A rectangular park is 120 yards long and 70 yards wide. Give the length and width of another rectangular park that has the same perimeter but a smaller area.
Math
Area
A rectangular park is 120 yards long and 70 yards wide. Give the length and width of another rectangular park that has the same perimeter but a smaller area.
contractor is designing a rectangular room that will have a pool table. The length of the pool table is twice its width. The contractor wishes to have 3 ft of open space between each wall and the pool table as hown to the right. Express the area of the room in terms of the width w of the pool table. Then perform the indicated operations. Express the area of the room as the product of two polynomials in terms of the width w of the pool table. (Do not multiply.) The area of the room in terms of the width w of the pool table is (Simplify your answer.) units. (...)
Math
Area
contractor is designing a rectangular room that will have a pool table. The length of the pool table is twice its width. The contractor wishes to have 3 ft of open space between each wall and the pool table as hown to the right. Express the area of the room in terms of the width w of the pool table. Then perform the indicated operations. Express the area of the room as the product of two polynomials in terms of the width w of the pool table. (Do not multiply.) The area of the room in terms of the width w of the pool table is (Simplify your answer.) units. (...)
How much wrapping paper would you need to wrap a cylindrical gift with a height of 12.6 inches and a radius of 4.5 in? Round your answer to the nearest tenth. O 431.2 in² O 345.8 ft² O 483.5 in² O 510.6 in²
Math
Area
How much wrapping paper would you need to wrap a cylindrical gift with a height of 12.6 inches and a radius of 4.5 in? Round your answer to the nearest tenth. O 431.2 in² O 345.8 ft² O 483.5 in² O 510.6 in²
Coach Smith wants to paint his classroom walls red. Each wall is 25 feet long and 9 feet tall. The janitor says he can only order the paint in boxes that contain 3 small cans. One box is used to paint a 125 square foot on the wall. How many boxes does he need to order? How many paint cans will he have ordered in total? How many cans will be used to paint all the walls in the room? How many paint cans will not be opened?
Math
Area
Coach Smith wants to paint his classroom walls red. Each wall is 25 feet long and 9 feet tall. The janitor says he can only order the paint in boxes that contain 3 small cans. One box is used to paint a 125 square foot on the wall. How many boxes does he need to order? How many paint cans will he have ordered in total? How many cans will be used to paint all the walls in the room? How many paint cans will not be opened?
The volumes of two similar solids are 729 m³ and 125 m³. The surface area of the larger solid is 324 m³. What is the surface area of the smaller solid?" 100 m² 56 m² 500 m² 200 m²
Math
Area
The volumes of two similar solids are 729 m³ and 125 m³. The surface area of the larger solid is 324 m³. What is the surface area of the smaller solid?" 100 m² 56 m² 500 m² 200 m²
Carmen wants to tile the floor of his house. He will need 1,000 square feet of tile. He will do most of the floor with a tile that costs $1.50 per square foot, but also wants to use an accent tile that costs $9.00 per square foot. How many square feet of each tile should he plan to use if he wants the overall cost to be $3 per square foot?
Math
Area
Carmen wants to tile the floor of his house. He will need 1,000 square feet of tile. He will do most of the floor with a tile that costs $1.50 per square foot, but also wants to use an accent tile that costs $9.00 per square foot. How many square feet of each tile should he plan to use if he wants the overall cost to be $3 per square foot?
Sketch the graph of y = x³ + 3. Estimate the area under the curve in the interval [0, 4] divided into n = 4 subintervals using: (a) Lower rectangles (b) Upper rectangles
Math
Area
Sketch the graph of y = x³ + 3. Estimate the area under the curve in the interval [0, 4] divided into n = 4 subintervals using: (a) Lower rectangles (b) Upper rectangles
Consider the solid S whose base is the triangular region with vertices (0, 0), (1, 0), and (0, 1). Cross-sections perpendicular to the y-axis are rectangles with height 5. Volume of S=
Math
Area
Consider the solid S whose base is the triangular region with vertices (0, 0), (1, 0), and (0, 1). Cross-sections perpendicular to the y-axis are rectangles with height 5. Volume of S=
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