A company is trying to determine how to allocate its $153,000 advertising budget for a new product. The company is considering newspaper ads and television commercials as its primary means for advertising. The following table summarizes the costs of advertising in these different media and the number of new customers reached by increasing amocints of advertising. For instance, each of the first 10 ads the company places in newspapers will cost $1,000 and is expected to reach 900 new customen. Each of the next 10 newspaper ads will cost $900 and is expected to reach 700 new customers. Note that the number of new customers reached by increasing amounts of advertising decreases as the advertising saturates the market. Assume the company will purchase no more than 30 newspaper ads and no more than 15 television ads. (Let N1 be the number of newsoaper ads purchased at $1,000 each. Let N2 be the number of newspaper ads purchased at s900 each. Let N3 be the number of newspaper ads purchased at $800 each. Let T1 be the number of television ads purchased at $12,000 each. Let T2 be the number of television ads purchased at $10,000 each. Let T2 be the number of television ads purchased at $8,000 each) (a) Formulate an LP model for this problem to maximize the number of new customen reached by advertising. (a' s reached by advertising. (c) Suppose the number of new customers reached by 11-20 newspaper ads is 400 and the number of new customers reached by 2130 newspaper ads is 700 . Make these changes in your spreadsheet and reoptimize the problem. What is the new optimal solution? (Round your answers to the nearest whole number.) (N1,N2,N2,T1,T2,T3)=( What (if anything) is wrong with this solution and why? The solution does not make sense since the variable N2 is used before the variable N1. The solution does not make sense since the variable N3 is used before the variable N2. The solution does not make sense since the variable T2 is used before the variable T1. The solution does not make sense since the variable T3 is used before the variable T2. The solution is reasonable given the context of the