Drew Polly UNC Charlotte.  Williamsburg City is dividing up square regions of the city. Each region is 10,000 square yards.  Each region is broken into.

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Presentation transcript:

Drew Polly UNC Charlotte

 Williamsburg City is dividing up square regions of the city. Each region is 10,000 square yards.  Each region is broken into 3 sections... In the bags! ◦ Region A: 1, 11, 12 ◦ Region B: 2, 7, 13 ◦ Region C: 5, 10, 15 ◦ Region D: 4, 6, 14 ◦ Region E: 3, 8, 9  How large is each section in terms of square yards and as a fraction of a square region?

 Approaches?

 How would your students do?  Ways to differentiate… ◦ High-end? ◦ Low-end?

 Your grandpa decides to sell his stamp collection. His stamps come in sheets, but they are only partially filled.  What fraction of each sheet is filled?  What decimal of each sheet is filled?  If each sheet has a value of $100, how much is each sheet worth?

 Approaches?  Mathematical Concepts?

 Let’s look at some students’ work ◦ 5 th grader…

 Grid #2 34/80 is the fraction since there are 80 squares and 34 are shaded 34/80 is equal to and 42.5% T: “how did you get your answer?” N: “used the calculator and did 34 divided by 80.” T: “anyone do this another way?” Deanna: “multiplying both the numerator and denominator by 10 means the fraction is equal to 340/800 and then divide both by 8. You get 42.5/100 or or 42.5 percent. What do these strategies show about both students? How have they used the diagram to support their answer?

 Teacher asks: “Is each of the 80 squares going to be more than, less than or equal to 1%?”  Students shout: “all.”  Teacher asks for explanation  Rashid: “We have 100% to shade across 80 squares, so if each square gets 1% there is still 20% leftover.”  Teacher: “So how much of that 20% does each of the 80 squares get?”  Bonnie: “I think ¼ of a percent since 20 is ¼ of 80.”  Teacher: “So how much percent of the whole grid is in one square?”  Bonnie: “1 and ¼ or 1.25% percent.” What do these students know? How have they connected the diagram to the mathematical concepts?

 100 percent sharing them across 80 squares  It’s “easy” to just make the numerator the decimal even if the numerator isn’t 100  When we teach students to write decimals from decimal grids, a lot of the time we tell them to “just count.”

 Teacher: “So what was Natalie’s answer as a percentage?”  Sam: “42.5 percent.”  Teacher: “How much percent is in one square?”  Sam: “1.25 percent.”  Teacher: “So if 34 boxes are squared what percent is shaded?”  Sam (uses overhead calculator): 34 * 1.25 = 42.5  Sam: “42.5 percent”

 How has the teacher “leveraged” student responses during this discussion?  Discuss the mathematical focus in each of the three stages. ◦ Was it on computations, representations, connecting mathematical ideas or a combination?

 Draw a 12x8 array on your paper (12 across, 8 tall)  Shade 3/8 of the grid  Show it 3 different ways  What is the decimal number and percent for the shaded region?

 Here is Devon’s progression of shading 3/8.  What did he do?  What concepts does he understand based on his representations?

 “I broke the rectangle into four parts. There would be six columns in each half and then three columns in each fourth. “  “Then, I split the fourths into eighths. There are 1 ½ columns in each eighth. Then I shaded in 3 of the 8ths.”

 “For the percent it’s either 25 or 50 percent. I’m not sure.”  T: “Why are you not sure? What do you know about how you shaded the rectangle?”  D: “I broke it into eighths. Fourths are 25% and eighths are half of that (uses calculator to divide 25 by 2). Each eighth is 12.5% so it would be which is 37.5 percent.  T: “How would we write that as a decimal?”  D: “I know 37.5% is less than one so it’s ” Based on Devon’s comments above what mathematics does he know? How did the teacher moves help Devon connect his strategy to the mathematical concepts? What would you do next with Devon to make sure he understood the concept?

 There is a chocolate cake and a vanilla cake in the kitchen. Both are the same size. The chocolate cake has 8 slices and 4 have been eaten. The vanilla cake has 5 slice and 3 have been eaten.  Which cake has more left?  Prove your answer in two ways: ◦ A picture ◦ Some computational method

 Student work

 Draw four squares on your paper that are the same size  Divide two of them into fourths so that each fourth is the same size and the same shape  Divide two squares into fourths so that the fourths are the same size but each square has at least two different-shaped fourths

 What makes a good fraction task (word problem)?

 InterMath  Other resources?

 Drew Polly  