[size=150]A landscaping company is delivering crushed stone to a construction site. The table shows the total weight in pounds, [math]W[/math], of [math]n[/math] loads of crushed stone.[/size][br][img]data:image/png;base64,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[/img][br]Which equation could represent the total weight, in pounds, for [math]n[/math] loads of crushed stone?

[size=150]Members of the band sold juice and popcorn at a college football game to raise money for an upcoming trip. The band raised $2,000. The amount raised is divided equally among the [math]m[/math] members of the band.[/size][br][br]Which equation represents the amount, [math]A[/math], each member receives?

Write an equation that represents the number of teaspoons, [math]t[/math], contained in a cup, [math]C[/math].[br]

What is the relationship between number of bushels, [math]b[/math], and the number of quarts, [math]q[/math]? If you get stuck, try creating a table.

[size=150]2 11 11 11 12 12 13 14 14 15[br][br]The median is 12 attempts and the mean is 11.5 attempts. After reviewing the data, it is determined that 2 should not be included, since that was an exhibition game rather than a regular game during the season.[/size][br][br]What happens to the median if 2 attempts is removed from the data set?

What happens to the mean if 2 attempts is removed from the data set?[br]

What can you conclude about the data?

[size=150]Elena has $225 in her bank account. She takes out $20 each week for [math]w[/math] weeks. After [math]w[/math] weeks she has [math]d[/math] dollars left in her bank account.[/size][br][br]Write an equation that represents the amount of money left in her bank account after [math]w[/math] weeks.

[size=150]Priya is hosting a poetry club meeting this week and plans to have fruit punch and cheese for the meeting. She is preparing 8 ounces of fruit punch per person and 2 ounces of cheese per person. Including herself, there are 12 people in the club.[br][br]A package of cheese contains 16 ounces and costs $3.99. A one-gallon jug of fruit punch contains 128 ounces and costs $2.50. Let [math]p[/math] represent number of people in the club, [math]f[/math] represent the ounces of fruit punch, [math]c[/math] represent the ounces of cheese, and [math]b[/math] represent Priya's budget in dollars.[/size][br][br]Select [b]all [/b]of the equations that could represent the quantities and constraints in this situation.

[size=150]The density of an object can be found by taking its mass and dividing by its volume.[br][br]Write an equation to represent the relationship between the three quantities (density, mass, and volume) in each situation. Let the density, [math]D[/math], be measured in grams/cubic centimeters (or g/cm3).[/size][br][br]The mass is 500 grams and the volume is 40 cubic centimeters.[br]

The mass is 125 grams and the volume is [math]v[/math] cubic centimeters.

The volume is 1.4 cubic centimeters and the density is 80 grams per cubic centimeter.[br]

The mass is [math]m[/math] grams and the volume is [math]v[/math] cubic centimeters.[br]