A publisher needs to send many books to a local book retailer and will send the books in a combination of small and large boxes. Each small

Question

A publisher needs to send many books to a local book retailer and will send the books in a combination of small and large boxes. Each small box can hold 25 books and each large box can hold 40 books. A total of 7 boxes were sent which can hold 250 books altogether. Write a system of equations that could be used to determine the number of small boxes sent and the number of large boxes sent. Define the variables that you use to write the system.

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RI SƠ 3 years 2021-08-17T17:15:45+00:00 1 Answers 276 views 0

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    2021-08-17T17:16:47+00:00

    Answer:

    Answer:

    \{ {{20x+30y=280} \atop {y=4x}} .{

    y=4x

    20x+30y=280

    .

    Where xx is the number of small boxes sent and yy is the number of large boxes sent.

    Step-by-step explanation:

    Let be xx the number of small boxes sent and yy the number of large boxes sent.

    Since each small box can hold 20 books (20x20x ), each large box can hold 30 books (30y30y )and altogether can hold a total of 280 books, we can write the following equation to represent this:

    20x+30y=28020x+30y=280

    According to the information provided in the exercise, there were 4 times as many large boxes sent as small boxes. This can be represented with this equation:

    y=4xy=4x

    Therefore, the system of equation that be used to determine the number of small boxes sent and the number of large boxes sent, is:

    \{ {{20x+30y=280} \atop {y=4x}} .{

    y=4x

    20x+30y=280

    .

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