A Solidify Understanding Task

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Presentation transcript:

A Solidify Understanding Task 1.4 Rabbit Run A Solidify Understanding Task Whole class: Misha has a new rabbit that she named “Wascal”. She wants to build Wascal a pen so that the rabbit has space to move around safely. Misha has purchased a 72 foot roll of fencing to build a rectangular pen. 1. If Misha uses the whole roll of fencing, what are some of the possible dimensions of the pen? 2. If Misha wants a pen with the largest possible area, what dimensions should she use for the sides? Justify your answer. Width Length Perimeter Area x Write a model for the area of the rectangular pen in terms of the length of one side. Include both an equation and a graph.

Computation Skills and Vocabulary Looking at the graph of the Rabbit Run describe these terms and where can they be seen in the graph. Def) Increasing Def) Decreasing Def) Continuous Def) Discrete Def) Maximum

After problem #9 answer these questions. Go to page 20 Section 1.4 Set and complete Problems 5-9 in small groups. Set Topic: Investigating perimeters and areas Adam and his brother are responsible for feeding their horses. In the spring and summer the horses graze in an unfenced pasture. The brothers have erected a portable fence to corral the horses in a grazing area. Each day the horses eat all of the grass inside the fence. Then the boys move it to a new area where the grass is long and green. The porta-fence consists of 16 separate pieces of fencing each 10 feet long. The brothers have always arranged the fence in a long rectangle with one length of fence on each end and 7 pieces on each side making the grazing area 700 sq. ft. Adam has learned in his math class that a rectangle can have the same perimeter but different areas. He is beginning to wonder if he can make his daily job easier by rearranging the fence so that the horses have a bigger grazing area. He begins by making a table of values. He lists all of the possible areas of a rectangle with a perimeter of 160 ft., while keeping in mind that he is restricted by the lengths of his fencing units. He realizes that a rectangle that is oriented horizontally in the pasture will cover a different section of grass than one that is oriented vertically. So he is considering the two rectangles as different in his table. Use this information to answer questions 5 – 9 on the next page. After problem #9 answer these questions. 9A. If the length of the fence is L, what is the width in terms of L? 9B. Write a function for the area enclosed by the fence and name is A(L). 9C. What is the domain and range of this function? 9C. What dimensions yield the greatest area enclosed? Justify your answer. 9D. Graph A(L) using a graphing utility and use it to find the maximum area. 9E. How can you show this equation is quadratic? What are the requirements?

Computational Skills and Vocabulary Def) Rate of Change – “Ready” and “Go” page 19, 21 Section 1.4