Linear Programming Questions and Answers

Graph this inequality: y < 3 Plot points on the boundary line. Select the line to switch between solid and dotted. Select a region to shade it.
Math
Linear Programming
Graph this inequality: y < 3 Plot points on the boundary line. Select the line to switch between solid and dotted. Select a region to shade it.
Maximize P = 2x-28y + 1 given the following constraints. y≤3 y+x≥0 y≥x-2
Math
Linear Programming
Maximize P = 2x-28y + 1 given the following constraints. y≤3 y+x≥0 y≥x-2
The cost per ounce of a drink, c, in cents, varies inversely as the number of ounces, n. Six ounces of the drink costs 60 cents per ounce. Find the equation that represents this relationship.
Math
Linear Programming
The cost per ounce of a drink, c, in cents, varies inversely as the number of ounces, n. Six ounces of the drink costs 60 cents per ounce. Find the equation that represents this relationship.
A car dealership wants to try out a new leasing arrangement, which will allow a buyer to trade a car back to the dealership for a certain amount of credit at any time throughout the first four years of ownership. For a car in good condition, the arrangement will value the car at 1/4 the original price at the end of four years, and will depreciate the value of the car linearly over the course of the four years. What is the value of a car with initial purchase price Pat the end of the first year? Write your answer as an expression in terms of P. Write the exact answer. Do not round.
Math
Linear Programming
A car dealership wants to try out a new leasing arrangement, which will allow a buyer to trade a car back to the dealership for a certain amount of credit at any time throughout the first four years of ownership. For a car in good condition, the arrangement will value the car at 1/4 the original price at the end of four years, and will depreciate the value of the car linearly over the course of the four years. What is the value of a car with initial purchase price Pat the end of the first year? Write your answer as an expression in terms of P. Write the exact answer. Do not round.
Abigail has $400 in her savings account. She wants to keep at least $160 in the account. She withdraws $40 each week for food. Write and solve an inequality to show how many weeks she can make withdrawals from her account.
Math
Linear Programming
Abigail has $400 in her savings account. She wants to keep at least $160 in the account. She withdraws $40 each week for food. Write and solve an inequality to show how many weeks she can make withdrawals from her account.
A dumpster in the shape of a rectangular prism has a volume of 528 cubic feet. The length of the dumpster is 5 feet less than twice the width w, and the height is 2 foot less than the width. Find the equation, in terms of w, that could be used to find the dimensions of the dumpster in feet. Your answer should be in the form of a polynomial equals a constant.
Math
Linear Programming
A dumpster in the shape of a rectangular prism has a volume of 528 cubic feet. The length of the dumpster is 5 feet less than twice the width w, and the height is 2 foot less than the width. Find the equation, in terms of w, that could be used to find the dimensions of the dumpster in feet. Your answer should be in the form of a polynomial equals a constant.
A shop has one-pound bags of peanuts for $2.00 and three-pound bags of peanuts for $5.50. If you buy 5 bags and spend $17.00, how many of each size bag did you buy? 4 one-pound bags; 1 three-pound bag 2 one-pound bags; 3 three-pound bags 1 one-pound bag; 4 three-pound bags 3 one-pound bags; 2 three-pound bags
Math
Linear Programming
A shop has one-pound bags of peanuts for $2.00 and three-pound bags of peanuts for $5.50. If you buy 5 bags and spend $17.00, how many of each size bag did you buy? 4 one-pound bags; 1 three-pound bag 2 one-pound bags; 3 three-pound bags 1 one-pound bag; 4 three-pound bags 3 one-pound bags; 2 three-pound bags
The sum of two numbers is 56. The difference of the two numbers is 32. What are the two numbers. Let a be the larger number and y be the smaller number. Write an equation that expresses the information in the sentence "The sum of two numbers is 56." Write an equation that expresses the information in the sentence "The difference of the two numbers is 32."
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Linear Programming
The sum of two numbers is 56. The difference of the two numbers is 32. What are the two numbers. Let a be the larger number and y be the smaller number. Write an equation that expresses the information in the sentence "The sum of two numbers is 56." Write an equation that expresses the information in the sentence "The difference of the two numbers is 32."
The number of women elected to the U.S. House of Representatives has increased nearly every Congress since 1985. In the 99th Congress, beginning in 1985, there were 22 female representatives. In the 109th Congress, beginning in 2005, there were 68 female representatives. Write a linear equation that models the number of female members of the House of Representatives x years after 1985.
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Linear Programming
The number of women elected to the U.S. House of Representatives has increased nearly every Congress since 1985. In the 99th Congress, beginning in 1985, there were 22 female representatives. In the 109th Congress, beginning in 2005, there were 68 female representatives. Write a linear equation that models the number of female members of the House of Representatives x years after 1985.
Leah and Christopher work at a dry cleaners ironing shirts. Leah can iron 25 shirts per hour, and Christopher can iron 15 shirts per hour. Leah and Christopher worked a combined 13 hours and ironed 265 shirts. Write a system of equations that could be used to determine the number of hours Leah worked and the number of hours Christopher worked. Define the variables that you use to write the system.
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Linear Programming
Leah and Christopher work at a dry cleaners ironing shirts. Leah can iron 25 shirts per hour, and Christopher can iron 15 shirts per hour. Leah and Christopher worked a combined 13 hours and ironed 265 shirts. Write a system of equations that could be used to determine the number of hours Leah worked and the number of hours Christopher worked. Define the variables that you use to write the system.
Kolby decided he wanted to go to the amusement park. The amusement park charges $8.00 for entry and $1.40 for each ride. Part A Write an expression to represent this scenario where r represents the number of rides. Part B. Write and solve an equation to determine how many rides Kolby can ride if his parents gave him $26.00. Show your work.
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Linear Programming
Kolby decided he wanted to go to the amusement park. The amusement park charges $8.00 for entry and $1.40 for each ride. Part A Write an expression to represent this scenario where r represents the number of rides. Part B. Write and solve an equation to determine how many rides Kolby can ride if his parents gave him $26.00. Show your work.
Frank plans to spend no more than $85 on plants for his front garden. He purchases salvia and three azaleas. The azaleas cost $22 each. Let c be the cost for a salvia. Which inequality below could be used to show how 3c+22≥ 85 3 x 22 + c ≥85 3c+22≤85 3 × 22 + c ≤ 85
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Linear Programming
Frank plans to spend no more than $85 on plants for his front garden. He purchases salvia and three azaleas. The azaleas cost $22 each. Let c be the cost for a salvia. Which inequality below could be used to show how 3c+22≥ 85 3 x 22 + c ≥85 3c+22≤85 3 × 22 + c ≤ 85
Suppose that average annual income (in dollars) for the years 1990 through 1999 is given by the linear function: I(x) = 1054x + 23,286 where is the number of years after 1990. Which of the following interprets the slope in the context of the problem? Select the correct answer below: In 1990, average annual income was $1,054. In the ten-year period from 1990 to 1999, average annual income increased by a total of $23,286. O Each year in the decade of the 1990s, average annual income increased by $1,054. O Average annual income rose to a level of $23,286 by the end of 1999.
Math
Linear Programming
Suppose that average annual income (in dollars) for the years 1990 through 1999 is given by the linear function: I(x) = 1054x + 23,286 where is the number of years after 1990. Which of the following interprets the slope in the context of the problem? Select the correct answer below: In 1990, average annual income was $1,054. In the ten-year period from 1990 to 1999, average annual income increased by a total of $23,286. O Each year in the decade of the 1990s, average annual income increased by $1,054. O Average annual income rose to a level of $23,286 by the end of 1999.
A day-care center invests $25,000 to set up a new facility. The center plans to charge $550 per student per year. Write a linear model in the form y = mx + b where y represents the amount of profit the center earns for enrolling a number of students. Provide your answer below:
Math
Linear Programming
A day-care center invests $25,000 to set up a new facility. The center plans to charge $550 per student per year. Write a linear model in the form y = mx + b where y represents the amount of profit the center earns for enrolling a number of students. Provide your answer below:
You take a package to the local shipping company. They charge a fixed base cost of $6 per package plus an additional $0.39 per pound. If P represents the number of pounds of your package, and C is the total cost of shipping your package, write the linear equation that represents the relationship between P and C. Provide your answer below:
Math
Linear Programming
You take a package to the local shipping company. They charge a fixed base cost of $6 per package plus an additional $0.39 per pound. If P represents the number of pounds of your package, and C is the total cost of shipping your package, write the linear equation that represents the relationship between P and C. Provide your answer below:
Find a linear equation to model this real-world application: It costs ABC electronics company $2.50 per unit to produce a part used in a popular brand of desktop computers. The company has monthly operating expenses of $350 for utilities and $3300 for salaries. Write the linear equation to model the company's monthly expenses in the form of y mx + b. = Do not include commas in your answer. Provide your answer below:
Math
Linear Programming
Find a linear equation to model this real-world application: It costs ABC electronics company $2.50 per unit to produce a part used in a popular brand of desktop computers. The company has monthly operating expenses of $350 for utilities and $3300 for salaries. Write the linear equation to model the company's monthly expenses in the form of y mx + b. = Do not include commas in your answer. Provide your answer below:
Watch the video that describes solving a quadratic inequality. Click here to watch the video. Solve the inequality analytically. Support your answer graphically. 9x²-30x>-25 The solution set is (Type your answer in interval notation. Use integers or fractions for any numbers in the expression.)
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Linear Programming
Watch the video that describes solving a quadratic inequality. Click here to watch the video. Solve the inequality analytically. Support your answer graphically. 9x²-30x>-25 The solution set is (Type your answer in interval notation. Use integers or fractions for any numbers in the expression.)
A caterer offers a package that feeds up to 50 people for $1,500 and adds an additional charge of $24.75 for each additional person. Enter a linear model that represents the total amount charged a host, t, as a function of g, the number of additional guests.
Math
Linear Programming
A caterer offers a package that feeds up to 50 people for $1,500 and adds an additional charge of $24.75 for each additional person. Enter a linear model that represents the total amount charged a host, t, as a function of g, the number of additional guests.
A manufacturer wishes to make tee-shirts for the band Dixie Chicks. They sell for $15 each. She must deliver all the tee-shirts in 20 days time. The manufacturer will first set up some machines. Once all machines are set up she will turn them on. Each machine takes one day to set up. A machine produces 200 shirts in one day. All the machines must be set up before any of them are turned on. Express the total amount of money M she will receive for the shirts in terms of the number n of machines she decides to set up (assuming she sells all the shirts she makes). M(n) = $
Math
Linear Programming
A manufacturer wishes to make tee-shirts for the band Dixie Chicks. They sell for $15 each. She must deliver all the tee-shirts in 20 days time. The manufacturer will first set up some machines. Once all machines are set up she will turn them on. Each machine takes one day to set up. A machine produces 200 shirts in one day. All the machines must be set up before any of them are turned on. Express the total amount of money M she will receive for the shirts in terms of the number n of machines she decides to set up (assuming she sells all the shirts she makes). M(n) = $
Write an equation that models the linear situation: 12 gallons are drained from a pool every minute. The pool began with 15,000 gallons in it. Instructions: DO NOT USE ANY SPACES between variables, constants, equals signs, and operation signs. For example, DO NOT enter f(x) = 2x + 1 DO ENTER: f(x)=2x+1 Put parentheses around constants that are fractions like this: y=(2/3)x-(1/2) You may use decimals IF the decimal values are exact. (You cannot use .33 for 1/3 because it is not exact, but you can use 0.25 for 1/4.) To write your equation, use the variables: t = amount of time pool has been draining (minutes) W(t)= amount of water drained from the pool (gallons)
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Linear Programming
Write an equation that models the linear situation: 12 gallons are drained from a pool every minute. The pool began with 15,000 gallons in it. Instructions: DO NOT USE ANY SPACES between variables, constants, equals signs, and operation signs. For example, DO NOT enter f(x) = 2x + 1 DO ENTER: f(x)=2x+1 Put parentheses around constants that are fractions like this: y=(2/3)x-(1/2) You may use decimals IF the decimal values are exact. (You cannot use .33 for 1/3 because it is not exact, but you can use 0.25 for 1/4.) To write your equation, use the variables: t = amount of time pool has been draining (minutes) W(t)= amount of water drained from the pool (gallons)
Nov 05, 4:2 Mariana signed up for a streaming music service that costs $7 per month. The service allows Mariana to listen to unlimited music, but if she wants to download songs for offline listening, the service charges $1.25 per song. How much total money Mariana have to pay in a month in which she downloaded 40 songs? How much would she have to pay if she downloaded s songs? would
Math
Linear Programming
Nov 05, 4:2 Mariana signed up for a streaming music service that costs $7 per month. The service allows Mariana to listen to unlimited music, but if she wants to download songs for offline listening, the service charges $1.25 per song. How much total money Mariana have to pay in a month in which she downloaded 40 songs? How much would she have to pay if she downloaded s songs? would
Write an equation that models the linear situation: A train starts a trip of 420 miles and it travels at a steady (average) speed of 70 miles per hour. Instructions: DO NOT USE ANY SPACES between variables, constants, equals signs, and operation signs. For example, DO NOT enter f(x) = 2x + 1 DO ENTER: f(x)=2x+1 Put parentheses around constants that are fractions like this: y=(2/3)x-(1/2) You may use decimals IF the decimal values are exact. (You cannot use .33 for 1/3 because it is not exact, but you can use 0.25 for 1/4.) To write your equation, use the variables: t = time traveled (hours) d(t) = distance left to travel (miles) Equation:
Math
Linear Programming
Write an equation that models the linear situation: A train starts a trip of 420 miles and it travels at a steady (average) speed of 70 miles per hour. Instructions: DO NOT USE ANY SPACES between variables, constants, equals signs, and operation signs. For example, DO NOT enter f(x) = 2x + 1 DO ENTER: f(x)=2x+1 Put parentheses around constants that are fractions like this: y=(2/3)x-(1/2) You may use decimals IF the decimal values are exact. (You cannot use .33 for 1/3 because it is not exact, but you can use 0.25 for 1/4.) To write your equation, use the variables: t = time traveled (hours) d(t) = distance left to travel (miles) Equation:
Solve the system using Gaussian elimination or Gauss-Jordan elimination. 8x+10y = -17 4x + 5y = -9 Select one: a. {} b. ((-5x/4-9/4,2y) ly is any real number} c. {(-17, -9)} d. {(-7, 7)}
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Linear Programming
Solve the system using Gaussian elimination or Gauss-Jordan elimination. 8x+10y = -17 4x + 5y = -9 Select one: a. {} b. ((-5x/4-9/4,2y) ly is any real number} c. {(-17, -9)} d. {(-7, 7)}
A red candle is 8 inches tall and burns at a rate of 7/10 inch per hour. A blue candle is 6 inches tall and burns at a rate of 1/5 inch per hour. After how many hours will both candles be the same height? Enter your answer in the box.
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Linear Programming
A red candle is 8 inches tall and burns at a rate of 7/10 inch per hour. A blue candle is 6 inches tall and burns at a rate of 1/5 inch per hour. After how many hours will both candles be the same height? Enter your answer in the box.
An objective function and a system of linear inequalities representing constraints are given. Complete parts a. through c. Objective Function z = 3x+y Constraints x≥0, y ≥ 0 4x + 3y ≤ 24 x+y≥4 a. Graph the system of inequalities representing the constraints. Use the graphing tool to graph the system.
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Linear Programming
An objective function and a system of linear inequalities representing constraints are given. Complete parts a. through c. Objective Function z = 3x+y Constraints x≥0, y ≥ 0 4x + 3y ≤ 24 x+y≥4 a. Graph the system of inequalities representing the constraints. Use the graphing tool to graph the system.
During the month of August, the mean of the daily rainfall in one city was 0.04 inches with a standard deviation of 0.15 inches. In another city, the mean of the daily rainfall was 0.01 inches with a standard deviation of 0.05 inches. Han says that both cities had a similar pattern of precipitation in the month of August. Do you agree with Han? Explain your reasoning
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Linear Programming
During the month of August, the mean of the daily rainfall in one city was 0.04 inches with a standard deviation of 0.15 inches. In another city, the mean of the daily rainfall was 0.01 inches with a standard deviation of 0.05 inches. Han says that both cities had a similar pattern of precipitation in the month of August. Do you agree with Han? Explain your reasoning
Solve Linear System Graphically (Lev. 1) Solve the following system of equations graphically on the set of axes below. y=3x-6 y=-x+2
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Linear Programming
Solve Linear System Graphically (Lev. 1) Solve the following system of equations graphically on the set of axes below. y=3x-6 y=-x+2
Use the equation of the line of best fit, y=0.93x+8.07, to answer the questions below. Give exact answers, not rounded approximations. (a) For an increase of one year of experience, what is the predicted increase in the hourly pay rate? (b) What is the predicted hourly pay rate for a cashier who doesn't have any experience? (c) What is the predicted hourly pay rate for a cashier with 5 years of experience?
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Linear Programming
Use the equation of the line of best fit, y=0.93x+8.07, to answer the questions below. Give exact answers, not rounded approximations. (a) For an increase of one year of experience, what is the predicted increase in the hourly pay rate? (b) What is the predicted hourly pay rate for a cashier who doesn't have any experience? (c) What is the predicted hourly pay rate for a cashier with 5 years of experience?
Casey bought a 15.4-pound turkey and an 11.6-pound ham for Thanksgiving and paid $38.51. Her friend Jane bought a 10.2-pound turkey and a 7.3-pound ham from the same store and paid$24.84. Find the cost per pound of turkey and the cost per pound of ham.
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Linear Programming
Casey bought a 15.4-pound turkey and an 11.6-pound ham for Thanksgiving and paid $38.51. Her friend Jane bought a 10.2-pound turkey and a 7.3-pound ham from the same store and paid$24.84. Find the cost per pound of turkey and the cost per pound of ham.
A recipe for soup calls for 4 tablespoons of lemon juice and 2 50. a) How many cups of lemon juice will the chef need for the larger batch? b) How many pints of olive oil will the chef need for the larger batch? a) The chef needed (Type a whole number, cup of olive oil. The given recipe serves 5 people, but a cook wants to make a larger batch that serves cups of lemon juice for the larger batch. proper fraction, or a mixed number.) b) The chef needed pints of olive oil for the larger batch. (Type a whole number, proper fraction, or a mixed number.)
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Linear Programming
A recipe for soup calls for 4 tablespoons of lemon juice and 2 50. a) How many cups of lemon juice will the chef need for the larger batch? b) How many pints of olive oil will the chef need for the larger batch? a) The chef needed (Type a whole number, cup of olive oil. The given recipe serves 5 people, but a cook wants to make a larger batch that serves cups of lemon juice for the larger batch. proper fraction, or a mixed number.) b) The chef needed pints of olive oil for the larger batch. (Type a whole number, proper fraction, or a mixed number.)
Kaj and some friends are going to the movies. At the theater, they sell a bag of popcorn for $4.75 and a drink for $3.75. How much would it cost if they bought 6 bags of popcorn and 3 drinks? How much would it cost if they bought p bags of popcorn and d drinks? Total cost, 6 bags of popcorn and 3 drinks: Total cost, p bags of popcorn and d drinks:
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Linear Programming
Kaj and some friends are going to the movies. At the theater, they sell a bag of popcorn for $4.75 and a drink for $3.75. How much would it cost if they bought 6 bags of popcorn and 3 drinks? How much would it cost if they bought p bags of popcorn and d drinks? Total cost, 6 bags of popcorn and 3 drinks: Total cost, p bags of popcorn and d drinks:
A commercial aircraft gets the best fuel efficiency if it operates at a minimum altitude of 29,000 feet and a maximum altitude of 41,000 feet. Model the most fuel- efficient altitudes using a compound inequality. x 29,000 and x ≤ 41,000 xs 29,000 and x ≥ 41,000 x≥ 41,000 and x ≥ 29,000 xs 41,000 and x =29,000
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Linear Programming
A commercial aircraft gets the best fuel efficiency if it operates at a minimum altitude of 29,000 feet and a maximum altitude of 41,000 feet. Model the most fuel- efficient altitudes using a compound inequality. x 29,000 and x ≤ 41,000 xs 29,000 and x ≥ 41,000 x≥ 41,000 and x ≥ 29,000 xs 41,000 and x =29,000
Joseph accepted a new job at a company with a contract guaranteeing annual raises. Joseph will get a raise of $5000 every year and had a starting salary of $70000. Write an equation for S, in terms of n, representing Joseph's salary after working n years for the company.
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Linear Programming
Joseph accepted a new job at a company with a contract guaranteeing annual raises. Joseph will get a raise of $5000 every year and had a starting salary of $70000. Write an equation for S, in terms of n, representing Joseph's salary after working n years for the company.
Josi has a job in which she works 30 hr/wk and gets paid $5/hr. If she works more than 30 hr in a week, she receives $8/hr for each hour over 30 hr. If she worked 38 hr this week, how much did she earn?
Math
Linear Programming
Josi has a job in which she works 30 hr/wk and gets paid $5/hr. If she works more than 30 hr in a week, she receives $8/hr for each hour over 30 hr. If she worked 38 hr this week, how much did she earn?
Determine the number of slack variables and name them. Then use the slack variables to convert each constraint into a linear equation. How many and which slack variables should be assigned? st) cias A. There are three slack variables named x_1, x_2, s_1 B. There are five slack variables named x_1, x 2, s_1, s_2, s_3. c. There are three slack variables named s_1, s_2, s_3. D. There are two slack variables named s_1, s_21 Assume the first equation using a slack variable is 5x₁ - x_2+s₁ = 164. What is the second equation after the slack variable is introduced? OA. 15x₁ +6x2 +5₁ +5₂ =201 OB. 15x, +6x₂ +S₁ =201 OC. 15x₁ +6x2 +52 = 201 Maximize z= 8x₁ + 3x_2 subject to: with 5X, -X_2's 164 15x₁ + 6x 2 s 201 10x 1 + x 2 X₁20 ≤ 340 x 220
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Linear Programming
Determine the number of slack variables and name them. Then use the slack variables to convert each constraint into a linear equation. How many and which slack variables should be assigned? st) cias A. There are three slack variables named x_1, x_2, s_1 B. There are five slack variables named x_1, x 2, s_1, s_2, s_3. c. There are three slack variables named s_1, s_2, s_3. D. There are two slack variables named s_1, s_21 Assume the first equation using a slack variable is 5x₁ - x_2+s₁ = 164. What is the second equation after the slack variable is introduced? OA. 15x₁ +6x2 +5₁ +5₂ =201 OB. 15x, +6x₂ +S₁ =201 OC. 15x₁ +6x2 +52 = 201 Maximize z= 8x₁ + 3x_2 subject to: with 5X, -X_2's 164 15x₁ + 6x 2 s 201 10x 1 + x 2 X₁20 ≤ 340 x 220
A diet is to contain at least 1480 units of carbohydrates, 2140 units of proteins, and 1960 calories. Two foods are available: F which costs $ 0.09 per unit and F2, which costs $ 0.05 per unit. A unit of food F₁ contains 2 units of carbohydrates, 4 units of proteins and 6 calories. A unit of food F2 contains 8 units of carbohydrates. 6 units of proteins and 4 calories. Find the minimum cost for a diet that consists of a mixture of these two foods and also meets the minimal nutrition requirements. Corner points of the feasible region: If there is more than one corner point, type the points separated by a comma (i.e. (1,2).(3,4)).
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Linear Programming
A diet is to contain at least 1480 units of carbohydrates, 2140 units of proteins, and 1960 calories. Two foods are available: F which costs $ 0.09 per unit and F2, which costs $ 0.05 per unit. A unit of food F₁ contains 2 units of carbohydrates, 4 units of proteins and 6 calories. A unit of food F2 contains 8 units of carbohydrates. 6 units of proteins and 4 calories. Find the minimum cost for a diet that consists of a mixture of these two foods and also meets the minimal nutrition requirements. Corner points of the feasible region: If there is more than one corner point, type the points separated by a comma (i.e. (1,2).(3,4)).
So, the predicted hourly pay rate is $8.19. Note that this value is equal to the y-intercept of the line of best fit. (b) For an increase of one year in experience, we want the predicted increase in the hourly pay rate. The slope of the line of best fit is 0.91. So for an increase of one year in experience, x, the predicted increase in the hourly pay rate, y, is $0.91. (c) We want the predicted hourly pay rate for a cashier with 5 years of experience. To get this, we let x = 5 in the equation y=0.91x+8.19. y=0.91(5)+8.19 = $12.74 So, the predicted hourly pay rate is $12.74.
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Linear Programming
So, the predicted hourly pay rate is $8.19. Note that this value is equal to the y-intercept of the line of best fit. (b) For an increase of one year in experience, we want the predicted increase in the hourly pay rate. The slope of the line of best fit is 0.91. So for an increase of one year in experience, x, the predicted increase in the hourly pay rate, y, is $0.91. (c) We want the predicted hourly pay rate for a cashier with 5 years of experience. To get this, we let x = 5 in the equation y=0.91x+8.19. y=0.91(5)+8.19 = $12.74 So, the predicted hourly pay rate is $12.74.
A local water park found that if the price of admission was $18, the attendance was about 2300 customers per week. When the price of admission was dropped to 99, attendance increased to about 2500 per week. Write a linear equation for the attendance in terms of the price,p. (A mp + b)
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Linear Programming
A local water park found that if the price of admission was $18, the attendance was about 2300 customers per week. When the price of admission was dropped to 99, attendance increased to about 2500 per week. Write a linear equation for the attendance in terms of the price,p. (A mp + b)
A chain saw requires 8 hours of assembly and a wood chipper 4 hours. A maximum of 64 hours of assembly time is available. The profit is $170 on a chain saw and $230 on a chipper How many of each should be assembled for maximum profit? To attain the maximum profit, assemble chain saws and wood chippers
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Linear Programming
A chain saw requires 8 hours of assembly and a wood chipper 4 hours. A maximum of 64 hours of assembly time is available. The profit is $170 on a chain saw and $230 on a chipper How many of each should be assembled for maximum profit? To attain the maximum profit, assemble chain saws and wood chippers
A chain saw requires 6 hours of assembly and a wood chipper 8 hours. A maximum of 144 hours of assembly time is available. The profit is $160 on a chain saw and $210 on a chipper. How many of each should be assembled for maximum profit? To attain the maximum profit, assemble chain saws and wood chippers
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Linear Programming
A chain saw requires 6 hours of assembly and a wood chipper 8 hours. A maximum of 144 hours of assembly time is available. The profit is $160 on a chain saw and $210 on a chipper. How many of each should be assembled for maximum profit? To attain the maximum profit, assemble chain saws and wood chippers
SESMUM & bas 3. The difference between two numbers is 32. The second number is 1 less than 5 times the first number. What are the numbers?id end
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Linear Programming
SESMUM & bas 3. The difference between two numbers is 32. The second number is 1 less than 5 times the first number. What are the numbers?id end
A movie theater charges $15 for standard viewing, $20 for 3D viewing, and $35 for Dinner and a Movie viewing. There are four times as many 3D viewing seats as Dinner and a Movie seats. If the theater brings in $53,000 when tickets to all 3000 seats are sold, determine the quantity of each type of seat in the movie theater.
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Linear Programming
A movie theater charges $15 for standard viewing, $20 for 3D viewing, and $35 for Dinner and a Movie viewing. There are four times as many 3D viewing seats as Dinner and a Movie seats. If the theater brings in $53,000 when tickets to all 3000 seats are sold, determine the quantity of each type of seat in the movie theater.
Find the minimum and maximum values of z=2x +9y, if possible, for the following set of constraints x+y≤5 -x+y≤1 2x-y≤6 Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The minimum value is (Round to the nearest tenth as needed.) B. There is no minimum value Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The maximum value is (Round to the nearest tenth as needed.) B. There is no maximum value
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Linear Programming
Find the minimum and maximum values of z=2x +9y, if possible, for the following set of constraints x+y≤5 -x+y≤1 2x-y≤6 Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The minimum value is (Round to the nearest tenth as needed.) B. There is no minimum value Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The maximum value is (Round to the nearest tenth as needed.) B. There is no maximum value
Liz is working to raise money for breast cancer research. She discovered that each church group requires 2 hours of letter writing and 1 hour of follow-up, while each neighborhood group needs 2 hours of letter writing and 3 hours of follow-up. Liz can raise $150 from each church group and $200 from each neighborhood group, and she has a maximum of 12 hours of letter-writing time and a maximum of 16 hours of follow-up time available per month. Use the simplex method to complete parts (a) and (b). (a) Determine the most profitable mixture of groups Liz should contact and the most money she can raise in a month. Set up the linear programming problem. Let x, and x2 represent the numbers of church groups and neighborhood groups, respectively, and let z be the total amount of money raised. (Do not factor. Do not include the $ symbol in your answers.)
Math
Linear Programming
Liz is working to raise money for breast cancer research. She discovered that each church group requires 2 hours of letter writing and 1 hour of follow-up, while each neighborhood group needs 2 hours of letter writing and 3 hours of follow-up. Liz can raise $150 from each church group and $200 from each neighborhood group, and she has a maximum of 12 hours of letter-writing time and a maximum of 16 hours of follow-up time available per month. Use the simplex method to complete parts (a) and (b). (a) Determine the most profitable mixture of groups Liz should contact and the most money she can raise in a month. Set up the linear programming problem. Let x, and x2 represent the numbers of church groups and neighborhood groups, respectively, and let z be the total amount of money raised. (Do not factor. Do not include the $ symbol in your answers.)
Coretta studies falcons. In one region, she finds 94 females and 47 males. Coretta claims this is always the proportion of females to males among falcons. In another region, there are 84 falcons. How many of the 84 falcons must be females to support Coretta's claim?
Math
Linear Programming
Coretta studies falcons. In one region, she finds 94 females and 47 males. Coretta claims this is always the proportion of females to males among falcons. In another region, there are 84 falcons. How many of the 84 falcons must be females to support Coretta's claim?
Brittany brought her collection of Map Mosaics jigsaw puzzles to a secondhand store to sell. She was paid cash for all 8 puzzles in her collection. Before she left, Brittany used $7.25 of her earnings to purchase a used board game. She had $12.75 remaining. Which equation can you use to find the amount of money, p, Brittany received for each puzzle in her collection?
Math
Linear Programming
Brittany brought her collection of Map Mosaics jigsaw puzzles to a secondhand store to sell. She was paid cash for all 8 puzzles in her collection. Before she left, Brittany used $7.25 of her earnings to purchase a used board game. She had $12.75 remaining. Which equation can you use to find the amount of money, p, Brittany received for each puzzle in her collection?
UB faculty union is organizing a trip for at least 600 of its members to visit the new water park at Bahamar. Bahamar has indicated there are only 14 tour guides available and tours can be done in groups of 50 at $800 or groups of 40 at $600. Calculate the number of tours needed at $600 to minimize the cost of the trip.
Math
Linear Programming
UB faculty union is organizing a trip for at least 600 of its members to visit the new water park at Bahamar. Bahamar has indicated there are only 14 tour guides available and tours can be done in groups of 50 at $800 or groups of 40 at $600. Calculate the number of tours needed at $600 to minimize the cost of the trip.
A truck can be rented from Company A for $80 a day plus $0.40 per mile. Company B charges $20 a day plus $0.70 per mile to rent the same truck. Find the number of miles in a day at which the rental costs for Company A and Company B are the same.
Math
Linear Programming
A truck can be rented from Company A for $80 a day plus $0.40 per mile. Company B charges $20 a day plus $0.70 per mile to rent the same truck. Find the number of miles in a day at which the rental costs for Company A and Company B are the same.
The drama department is selling adult tickets, x, for $10 per ticket and student tickets, y, for $7 per ticket. They want to make at least $2000 on ticket sales. The auditorium has 300 seats. Write a system of inequalities to model the situation, graph using Desmos, and give a possible solution. A possible solution is ... adult tickets and ... student tickets.
Math
Linear Programming
The drama department is selling adult tickets, x, for $10 per ticket and student tickets, y, for $7 per ticket. They want to make at least $2000 on ticket sales. The auditorium has 300 seats. Write a system of inequalities to model the situation, graph using Desmos, and give a possible solution. A possible solution is ... adult tickets and ... student tickets.
Doreen Schmidt is a chemist. She needs to prepare 32 ounces of a 12% hydrochloric acid solution. Find the amount of 16% solution and the amount of 8% solution she should mix to get this solution. How many ounces of the 16% acid solution should be in the mixture? How many ounces of the 8% acid solution should be in the mixture?
Math
Linear Programming
Doreen Schmidt is a chemist. She needs to prepare 32 ounces of a 12% hydrochloric acid solution. Find the amount of 16% solution and the amount of 8% solution she should mix to get this solution. How many ounces of the 16% acid solution should be in the mixture? How many ounces of the 8% acid solution should be in the mixture?
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