Solve the problem.A triangle drawn on a map has sides of lengths 8.0 cm, 11 cm, and 14 cm. The shortest of the corresponding real-life distances is 98 km. Find the longest of the real-life distances. Round to the nearest unit.

Use the Montonicity Theorem to find where the function is increasing and where it is decreasing.h(t) = cos t, 0 ? t ? 2?

A. Increasing on , decreasing on  ? 
B. Increasing on [1, 2], decreasing on [0, 1]
C. Increasing on [0, ?], decreasing on [?, 2?]
D. Increasing on [?, 2?], decreasing on [0, ?]

Find the domain and range of the function.F(t) = 

A. D: [0,?), R: (-?,?) B. D: (0,?), R: (0,?) C. D: (-?,?), R: (-?,?) D. D: (-?,0), R: (-?,0)

Determine the number of solutions of the system. State whether the system is consistent or inconsistent. For a system that is consistent, state whether the equations are dependent or independent. State the solution of the system.

A. no solution; inconsistent B. one solution; consistent; independent; (3, -1) C. one solution; consistent; independent; (-3, 1) D. one solution; consistent; independent; (-3, -1)

Write the decimal as a proper fraction or mixed number in lowest terms.-0.008

A. -  
B. -  
C. -  
D. -