Use a table or a calculator to evaluate the function. Round to four decimal places.sec 0.1769

Determine the domain and range of the relation.{(5, -2), (-6, -8), (2, -7), (3, -9), (10, 2)}

A. Domain: {-6, -2, 10, -8, 3}; Range: {-7, 5, -9, 2, 2} B. Domain: {-7, 5, -9, 2, 2}; Range: {-6, -2, 10, -8, 3} C. Domain: {-2, -8, -7, -9, 2}; Range: {-6, 10, 3, 5, 2} D. Domain: {-6, 10, 3, 5, 2}; Range: {-2, -8, -7, -9, 2}

Answer the question.True or False: The graph of the equation 12x - 20y = 12 goes 

A. True B. False

For the statement, round the number as instructed and restate the first sentence using the rounded number.Last month, Jude's phone bill was $190.59. Round this number to the nearest dollar.

A. Last month, Jude's phone bill was $191. B. Last month, Jude's phone bill was $190.50. C. Last month, Jude's phone bill was $190. D. Last month, Jude's phone bill was $189.59.

Solve the problem.The graph depicts a person's speed y, in miles per hour, during a 15-minute period of driving. The graph has two turning points.The first turning point is the point at which the graph stops rising and starts to fall. The second turning point is the point at which the graph stops falling and starts to rise again. Estimate and interpret the turning points.

A. The first turning point is at approximately (6, 48). This is where the person's distance from the starting point stops increasing and starts to decrease. The second turning point is at approximately . This is where the person's distance from the starting point stops decreasing and starts to increase again.
B. The first turning point is at approximately (5, 48). This is where the person's distance from the starting point stops increasing and starts to decrease. The second turning point is at approximately . This is where the person's distance from the starting point stops decreasing and starts to increase again.
C. The first turning point is at approximately (6, 48). This is where the person's speed first stops increasing and starts to decrease. The second turning point is at approximately . This is where the person's speed stops decreasing and starts to increase again.
D. The first turning point is at approximately (7, 48). This is where the person's speed first stops increasing and starts to decrease. The second turning point is at approximately (11, 44). This is where the person's speed stops decreasing and starts to increase again.