A school ordered 3 large boxes of board markers. After giving 15 markers to each of 3 teachers, there were 90 markers left. The diagram represents the situation. How many markers were originally in each box?[br][br][img]data:image/png;base64,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[/img]

The diagram can be represented by the equation [math]25=2+6x[/math]. Explain where you can see the 6 in the diagram.[br][img]data:image/png;base64,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[/img]

Jada’s teacher fills a travel bag with 5 copies of a textbook. The weight of the bag and books is 17 pounds. The empty travel bag weighs 3 pounds. How much does each book weigh?

A piece of scenery for the school play is in the shape of a 5-foot-long rectangle. The designer decides to increase the length. There will be 3 identical rectangles with a total length of 17 feet. By how much did the designer increase the length of each rectangle?

Elena spends $17 and buys a $3 book and a bookmark for each of her 5 cousins. How much does each bookmark cost?

Noah packs up bags at the food pantry to deliver to families. He packs 5 bags that weigh a total of 17 pounds. Each bag contains 3 pounds of groceries and a packet of papers with health-related information. How much does each packet of papers weigh?

Andre has 3 times as many pencils as Noah and 5 pens. He has 17 pens and pencils all together. How many pencils does Noah have?

[size=150]Elena walked 20 minutes more than Lin. Jada walked twice as long as Elena. Jada walked for 90 minutes. The equation [math]2\left(x+20\right)=90[/math] describes this situation. Match each expression with the statement in the story with the expression it represents.[br][/size][br]The number of minutes that Jade walked

The number of minutes that Elena walked

The number of minutes that Lin walked