Mathematics, 07.04.2020 18:58, aureliafung2p7cxoo
For a given school district the following is known. There are G grades and J schools. Each school j has a capacity C_jg for grade g. In each of I neighborhoods in the district, there is a student population S_ig for neighborhood i and grade g. Let the distance from neighborhood i to school j be represented by d_ij. All of these are the parameters that the school distinct has to take as a given. Note that none of these are decision variables. Formulate a model to assign all students to schools without violating the capacity each school has for each grade while minimizing the total distance traveled by all students. In your formulation you can ignore the fact that the number of students must be an integer. Now let S_ikg = the number of students in neighborhood i of race k and grade g; a_k = the maximum percent of racial group k assigned to any school; and b_k = the minimum percent of racial group k. Reformulate the model while also satisfying the racial-balance constraints.
Answers: 3
Mathematics, 21.06.2019 20:20, bbyjoker
Recall that the owner of a local health food store recently started a new ad campaign to attract more business and wants to know if average daily sales have increased. historically average daily sales were approximately $2,700. the upper bound of the 95% range of likely sample means for this one-sided test is approximately $2,843.44. if the owner took a random sample of forty-five days and found that daily average sales were now $2,984, what can she conclude at the 95% confidence level?
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Mathematics, 22.06.2019 00:30, PollyB1896
Which is an x-intercept of the graphed function? (0, 4) (–1, 0) (4, 0) (0, –1)
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Mathematics, 22.06.2019 06:30, xbeatdroperzx
You spent 196.46 the original price totaled 293.77 how much you save
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For a given school district the following is known. There are G grades and J schools. Each school j...
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