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22 March, 23:31

A delivery truck is transporting boxes of two sizes: large and small. The large box weighs 60 pounds each, and the small box weighs 30 pounds each. There are 125 boxes in all. If the truck is carrying a total of 5700 pounds in boxes, how many of each type of box is it carrying

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Answers (2)
  1. 23 March, 01:11
    0
    60 small boxes and 65 large boxes

    Step-by-step explanation:

    From the given information we can make two equations:

    L + S = 125

    60L + 30S = 5700

    S represents the number of small boxes and L represents the number of large boxes.

    To solve an equation we need there to be only one variable, so I solved for s in the first equation.

    L + S = 125

    S = 125 - L

    Now I can plug this into the second equation

    60L + 30S = 5700

    60L + 30 (125 - L) = 5700 (substitute S)

    60L + 3750 - 30L = 5700

    30L + 3750 = 5700 (combine like terms)

    30L = 1950 (subtract 3750 from both sides)

    L = 65 (divide both sides by 30)

    Now that we know there are 65 larger boxes, plug in 65 for L to find S.

    S = 125 - L

    S = 125 - 65

    S = 60

    So there are 65 large boxes and 60 small boxes
  2. 23 March, 01:30
    0
    There are 65 60-lb boxes and 60 30-lb boxes.

    Step-by-step explanation:

    Method:

    Define two variables for the two unknowns. Set up a system of two equations in two variables. One equation deals with the numbers of boxes. The other equation deals with the weights. Solve the system of equations.

    Define variables:

    Let x = number of 60-lb boxes.

    Let y = number of 30-lb boxes.

    Equation dealing with numbers of boxes:

    The total number of boxes is x + y. We are told the total number of boxes is 125, so the first equation is:

    x + y = 125

    Equation dealing with weights:

    x number of 60-lb boxes weight 60x.

    y number of 30-lb boxes weight 30y.

    The total weight of all boxes is 60x + 30y. We are told the total weight is 5700 lb. The second equation is:

    60x + 30y = 5700

    System of two equations in two variables:

    x + y = 125

    60x + 30y = 5700

    Solution of the system of equations by the substitution method:

    Solve the first equation for x:

    x + y = 125

    Subtract y from both sides.

    x = 125 - y

    Substitute 125 - y for x in the second original equation.

    60x + 30y = 5700

    60 (125 - y) + 30y = 5700

    Distribute the 60.

    7500 - 60y + 30y = 5700

    Combine y-terms on left side.

    7500 - 30y = 5700

    Subtract 7500 from both sides.

    -30y = - 1800

    Divide both sides by - 30.

    y = 60

    There are 60 30-lb boxes.

    Now substitute 60 for y in the first original equation and solve for x.

    x + y = 125

    x + 60 = 125

    Subtract 60 from both sides.

    x = 65

    There are 65 60-lb boxes.

    Answer: There are 65 60-lb boxes and 60 30-lb boxes.

    Check:

    The given information is there there are 125 boxes, and the total weight is 5700 lb.

    The total number of boxes is 65 boxes + 60 boxes = 125 boxes. This checks with the given information.

    The total weight is

    65 * 60 lb + 60 * 30 lb = 3900 lb + 1800 lb = 5700 lb

    This checks with the given information.

    Our solution is correct.
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