Solve the problem.The liquid portion of a diet is to provide at least 300 calories, 36 units of vitamin A, and 90 units of vitamin C daily. A cup of dietary drink X provides 60 calories, 12 units of vitamin A, and 10 units of vitamin C. A cup of dietary drink Y provides 60 calories, 6 units of vitamin A, and 30 units of vitamin C. Set up a system of linear inequalities that describes the minimum daily requirements for calories and vitamins. Let x = number of cups of dietary drink X, and y = number of cups of dietary drink Y. Write all the constraints as a system of linear inequalities.

Use the given transformation to evaluate the integral.   where R is the parallelogram bounded by the lines    

src="https://sciemce.com/media/4/ppg__ttt0610191256__f1q33g7.jpg" alt="" style="vertical-align: -4.0px;" /> A. -10 B. 10 C. -5 D. 5

Use a calculator to solve for x in the given intervalsec ? = -4.0545, 0 ? ? ? 2?

A. 2.90 or 3.38 B. 1.82 or 4.96 C. 4.46 or 4.96 D. 1.82 or 4.46

Solve.The function A = A0e-0.01155x models the amount in pounds of a particular radioactive material stored in a concrete vault, where x is the number of years since the material was put into the vault. If 400 pounds of the material are initially put into the vault, how many pounds will be left after 40 years?

A. 141 pounds B. 133 pounds C. 252 pounds D. 300 pounds

Find the average rate of change for the function between the given values.f(x) = ; from 4 to 7

A. 7
B. - 
C. 2
D.