Problem Solving Using CME & Core-Plus

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Presentation transcript:

Problem Solving Using CME & Core-Plus Annette Roskam, CME Project Stephanie Ragucci, Andover HS

Guess-Check-Generalize Take a guess about the answer. Check your guess. Make your guess a variable and follow the same steps you used to check your guess. Write the equation. Extensible

Problem 1 Last summer, Katie mowed lawns to earn money. She mowed 35 lawns per week and charged $6 per lawn. This summer, Katie wants to earn an additional $150 per week. She will raise her price to $8 and find more customers. How many new customers will she need to find?

Problem 2 Tony has a $100 gift certificate at a music store Web site. The store offers a 15% discount off the retail price of CDs. It also charges $12 for shipping an order. If Tony wants to spend exactly $100 including the discount and shipping cost, what is the greatest total retail price he can afford?

Summary Habits of Mind Extensible Strategies Student Performance

Features of Core-Plus Integrated Content Active Learning Mathematical Modeling Multiple Representations

What Makes It Different? Emphasizes functions as a means of understanding algebraic concepts. Turns the traditional way of learning “upside-down” and “backwards”. Allows students to gain meaning from mathematics by solving problems and developing the skills to go along with it.

Consider This Scenario Suppose a pumpkin is fired upward from the barrel of a compressed-air cannon at a point 20 feet above the ground at an initial upward velocity of 90 feet per second (about 60 miles per hour). What are the questions that would typically be asked of students?

Possible Questions When will the pumpkin hit the ground? At what time will the pumpkin be 30 feet off of the ground? What is the maximum height of the pumpkin? Write a quadratic equation to model the situation.

Our Agenda Today we will look at how Core-Plus uses students understanding of functions to develop the model h(t) = h0 + v0t -16t2 and in turn be able to build a general quadratic rule for the height (in feet) of a projectile over time (in seconds).

A Typical Lesson Opener How would you answer this question if you were a student?

Development of Lesson Step 1: Dropping a pumpkin from a given height ex: h(t) = 100-16t2 Step 2: Firing a pumpkin straight upwards with a given initial velocity ex: h(t) = 20 + 90t Step 3: Putting it all together in terms of the combination of 3 factors - initial height, initial upward velocity, and gravity ex: h(t) = 20+90t-16t2 Step 4: Applying results

Checkpoint

Check For Understanding In Game 3 of the 1970 NBA championship series, the LA Lakers were down by two points with three seconds left in the game. The ball was inbounded to Jerry West. He launched and made a miraculous shot from beyond midcourt, a distance of 60 feet, to send the game into overtime (there was no 3-point line at that time).

Check For Understanding (cont.) a. Suppose the basketball left West’s hands at a point 8 feet above the ground. What does that information tell about the rule giving h as a function of t? b. Suppose also that the basketball reached the basket (at a height of 10 feet) 2.5 seconds after it left West’s hands. Use this information to determine the initial upward velocity of the basketball. c. Write a rule giving h as a function of t.

Check For Understanding (cont.) d. Use the function you developed in Part c to write and solve equations and inequalities to answer these questions about the basketball shot. At what other time(s) was the ball at the height of the rim (10 feet)? For how long was the ball higher than 30 feet above the floor? If the ball had missed the rim and backboard, when would it have hit the floor? e. What was the maximum height of the shot, and when did the ball reach that point?

In Conclusion There are many different curricula out there that will teach algebra skills to high school students. Don’t be afraid to try something new in the classroom, whether it is one new lesson, or an entirely new curriculum. You will be surprised what your students will learn, and what you will learn from your students.