[img]data:image/png;base64,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[/img][br][br]What do you notice? What do you wonder?

Here is a diagram that Jada drew about the weight of her puppy.[br][br][img]data:image/png;base64,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[/img][br]The adult weight of the puppy will be 45 pounds. How can you see that in the diagram?

What fraction of its adult weight is the puppy now? How can you see that in the diagram?

Jada’s friend has a dog that weighs 90 pounds. Here is a diagram Jada drew that represents the weight of her friend’s dog and the weight of her puppy.[br][br][img]data:image/png;base64,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[/img][br]How many times greater is the dog’s weight than the puppy’s?[br]

Compare the weight of the puppy and the dog using fractions.[br]

Compare the weight of the puppy and the dog using percentages.

Elena has 40% as much as Noah. How much does Elena have?[br]

Noah has $5. Diego has 150% as much as Noah. How much does Diego have?[br]

If this is 50% of the water he brought, how much water did he bring?

If he drank 80% of his water on his entire hike, how much did he drink?[br]

Andre plans to bring his dog on his next hike, along with 150% as much water as he brought on this hike.[br]

Andre plans to drink 150% of the water he brought on his hike.[br]