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« : 11 AUSTOS 2013, 11:03:00 »By the time Quentin Williams leaves Jefferson, he will, in all likelihood, own the state record for alltime career touchdown passes. Williams is good on nearly 70 percent of his throws and has accumulated more than 3,100 yards passing. On the ground, he has gained nearly 6 yards a carry. With almost 50 touchdown passes on the season and just three interceptions, it easy to see why Williams, a senior, is widely regarded as the top offensive player in the bay area.
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Calan Lucas and Chad Luker give the Cougars a formidable running game as well. Luker rushed for four touchdowns and 74 yards in a 4214 win over Waterville last week in the Pine Tree Conference Class B championship game. Lucas rushed for 148 yards and a touchdown on 17 carries against the Purple Panthers.
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Some properties of measurable regions are (1) if a measurableregion D is contained within a measurable region D1, then thearea of D does not exceed the area of D1 (2) a region D consisting of two nonintersecting measurable regions D1 and D2 is measurable, and its area is equal to the sum of the regions D1 and D2; and (3) the common part of two measurable regions D1 and D2 is again a measurable region. In order that a region D be measurable, it is necessary and sufficient that its boundary have an area equal to zero; there exist regions that do not satisfythis condition and consequently are nonmeasurable (in the Jordan sense).
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Calan Lucas and Chad Luker give the Cougars a formidable running game as well. Luker rushed for four touchdowns and 74 yards in a 4214 win over Waterville last week in the Pine Tree Conference Class B championship game. Lucas rushed for 148 yards and a touchdown on 17 carries against the Purple Panthers.
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Some properties of measurable regions are (1) if a measurableregion D is contained within a measurable region D1, then thearea of D does not exceed the area of D1 (2) a region D consisting of two nonintersecting measurable regions D1 and D2 is measurable, and its area is equal to the sum of the regions D1 and D2; and (3) the common part of two measurable regions D1 and D2 is again a measurable region. In order that a region D be measurable, it is necessary and sufficient that its boundary have an area equal to zero; there exist regions that do not satisfythis condition and consequently are nonmeasurable (in the Jordan sense).
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