case study KFC’s Explosive Growth in China In its home market, the U.S., KFC is struggling, an also- ran to McDonald’s Corp., the world’s biggest restaurant company. In China, KFC has achieved such dominance over McDonald’s and local rivals that Colonel Harland Sanders’s image is a far more common sight in many Chinese cities than that of Mao. That accomplishment is striking in a country where foreign companies often stumbled and ran into roadblocks in the past.KFC, owned by Kentucky-based Yum! Brands, started out as the quintessential American fast food company, originally being named Kentucky Fried Chicken. What could be more patriotic than deep-fried chicken wings with special roots in the U.S. South?In 1973, the company opened 11 restaurants in the British colony of Hong Kong but closed them within two years because it couldn’t win over local consumers.

case study KFC’s Explosive Growth in China In its home market, the U.S., KFC is struggling, an also- ran to McDonald’s Corp., the world’s biggest restaurant company. In China, KFC…

Continue Reading case study KFC’s Explosive Growth in China In its home market, the U.S., KFC is struggling, an also- ran to McDonald’s Corp., the world’s biggest restaurant company. In China, KFC has achieved such dominance over McDonald’s and local rivals that Colonel Harland Sanders’s image is a far more common sight in many Chinese cities than that of Mao. That accomplishment is striking in a country where foreign companies often stumbled and ran into roadblocks in the past.KFC, owned by Kentucky-based Yum! Brands, started out as the quintessential American fast food company, originally being named Kentucky Fried Chicken. What could be more patriotic than deep-fried chicken wings with special roots in the U.S. South?In 1973, the company opened 11 restaurants in the British colony of Hong Kong but closed them within two years because it couldn’t win over local consumers.

Nuclear physics Need help please ,, The answer should be 10^{^{16}} yeras A sample of 1 g of a radioactive isotope of atomic weight 208 decays via -emission and 75 counts are recorded in a 24 h period. If the detector efficiency is 10 per cent, estimate the mean life of the isotope.

Nuclear physics Need help please ,, The answer should be 10^{^{16}} yeras A sample of 1 g of a radioactive isotope of atomic weight 208 decays via -emission and 75…

Continue Reading Nuclear physics Need help please ,, The answer should be 10^{^{16}} yeras A sample of 1 g of a radioactive isotope of atomic weight 208 decays via -emission and 75 counts are recorded in a 24 h period. If the detector efficiency is 10 per cent, estimate the mean life of the isotope.

International Cranberry Uncooperative (ICU) is a competitor to the National Cranberry Cooperative (NCC). At ICU, barrels of cranberries arrive on trucks at a rate of 150 barrels per hour and are processed continuously at a rate of 100 barrels per hour. Trucks arrive at a uniform rate over eight hours, from 6:00 a.m. until 2:00 p.m. Assume that the trucks are sufficiently small so that the delivery of cranberries can be treated as a continuous inflow. The first truck arrives at 6:00 a.m. and unloads immediately, so processing begins at 6:00 a.m. The bins at ICU can hold up to 200 barrels of cranberries before overflowing. If a truck arrives and the bins are full, the truck must wait until there is room in the bins. Answer the following questions. Show your work to receive full credits. What is the maximum amount of cranberries that are waiting on the trucks at any given time? At what time do the trucks stop waiting? For how long does the last in-coming truck, i.e., the truck that arrives at 2 p.m., have to wait? For how long does the truck that arrives at 1 p.m. have to wait? At what time do the bins become empty? ICU is considering using seasonal workers in addition to their regular workforce to help with the processing of cranberries. When the seasonal workers are working, the processing rate increases to 125 barrels per hour. The seasonal workers would start working at 10:00 a.m. and finish working when the trucks stop waiting. At what time would ICU finish processing the cranberries using these seasonal workers?

International Cranberry Uncooperative (ICU) is a competitor to the National Cranberry Cooperative (NCC). At ICU, barrels of cranberries arrive on trucks at a rate of 150 barrels per hour and…

Continue Reading International Cranberry Uncooperative (ICU) is a competitor to the National Cranberry Cooperative (NCC). At ICU, barrels of cranberries arrive on trucks at a rate of 150 barrels per hour and are processed continuously at a rate of 100 barrels per hour. Trucks arrive at a uniform rate over eight hours, from 6:00 a.m. until 2:00 p.m. Assume that the trucks are sufficiently small so that the delivery of cranberries can be treated as a continuous inflow. The first truck arrives at 6:00 a.m. and unloads immediately, so processing begins at 6:00 a.m. The bins at ICU can hold up to 200 barrels of cranberries before overflowing. If a truck arrives and the bins are full, the truck must wait until there is room in the bins. Answer the following questions. Show your work to receive full credits. What is the maximum amount of cranberries that are waiting on the trucks at any given time? At what time do the trucks stop waiting? For how long does the last in-coming truck, i.e., the truck that arrives at 2 p.m., have to wait? For how long does the truck that arrives at 1 p.m. have to wait? At what time do the bins become empty? ICU is considering using seasonal workers in addition to their regular workforce to help with the processing of cranberries. When the seasonal workers are working, the processing rate increases to 125 barrels per hour. The seasonal workers would start working at 10:00 a.m. and finish working when the trucks stop waiting. At what time would ICU finish processing the cranberries using these seasonal workers?

Find at least the first four nonzero terms in a powerseries expansion about x = 0 for a general solution to thegiven differential equation: Include a general formula for the coefficients (recurrence formula). x=0; (x^2 +4)y” + y=x

Find at least the first four nonzero terms in a powerseries expansion about x = 0 for a general solution to thegiven differential equation: Include a general formula for the…

Continue Reading Find at least the first four nonzero terms in a powerseries expansion about x = 0 for a general solution to thegiven differential equation: Include a general formula for the coefficients (recurrence formula). x=0; (x^2 +4)y” + y=x

Two structural members A and B are bolted to a bracket as shown. Knowing that both members are in compression and that the force is 10 kN in member A and 15 kN in member B, determine by trigonometry the magnitude and direction of the resultant of the  forces applied to the bracket by members A and B

Two structural members A and B are bolted to a bracket as shown. Knowing that both members are in compression and that the force is 10 kN in member A…

Continue Reading Two structural members A and B are bolted to a bracket as shown. Knowing that both members are in compression and that the force is 10 kN in member A and 15 kN in member B, determine by trigonometry the magnitude and direction of the resultant of the  forces applied to the bracket by members A and B

Suppose 1.00 mol of CO2 and 1.00 mol of COF2 are placed in a very large vessel at 25°C, and a catalyst for the gasphase reaction 2COF2 ⇌ CO2 + CF4 is added. Use data in the Appendix to find the equilibrium amounts.

Suppose 1.00 mol of CO2 and 1.00 mol of COF2 are placed in a very large vessel at 25°C, and a catalyst for the gasphase reaction 2COF2 ⇌ CO2 +…

Continue Reading Suppose 1.00 mol of CO2 and 1.00 mol of COF2 are placed in a very large vessel at 25°C, and a catalyst for the gasphase reaction 2COF2 ⇌ CO2 + CF4 is added. Use data in the Appendix to find the equilibrium amounts.