Use the given feasible region determined by the constraint inequalities to find the minimum possible value of the objective function.f = 5x + 6y subject to the constraints 

Express the product as a sum containing only sines or cosines.2 cos(7?) cos ?

A. cos(14?) + cos(2?) B. cos(8?) + sin(6?) C. cos(8?) + cos(6?) D. cos(10?) + sin(4?)

For the given functions f and g, find the requested function and state its domain.f(x) = ; g(x) = Find f ? g.

A. (f ? g)(x) = ; {x|x ? 0}
B. (f ? g)(x) = ; {x|x ? 3, x ? 5}
C. (f ? g)(x) = ; {x|x ? 15}
D. (f ? g)(x) = ; {x|3 ? x ? 5}

Give the equation of the oblique asymptote, if any, of the function.f(x) = 

A. no oblique asymptote B. y = 2x2 + 4x + 5 C. y = 0 D. y = 2x + 5

Write the fraction as a decimal. If the decimal is a repeating decimal, write using the bar notation and then round to the nearest hundredth. 

A. 0.1875
B. 0.1 ? 0.19
C. 0.187 ? 0.19
D. 0.18 ? 0.19