Write the equation of the graph in its final position.The graph of y = ln(x) is translated 6 units to the right, reflected in the x-axis, and then translated 5 units downward.

Solve the problem.Model the street map below by a graph and design an efficient way of traveling all the streets so that there are a minimal number of streets that are traveled more than once. 

A.
 
 D, A, B, C, H, L, K, J, I, D, E, J, E, F, B, F, G, K, G, H
B.
 
 A, B, C, H, G, F, E, D, I, J, K, L
C.
 
 A, B, C, H, L, K, J, I, D, E, J, E, F, B, F, G, K, G, H
D.
 
 A, B, C, H, L, K, J, I, D, E, F, G, H, G, K, G, F, B, F, E, J, E, D, A

Solve the formula for the indicated letter. Assume that all variables represent nonnegative numbers.A = ?r2 for r

A. r = 
B. r = 
C. r = 
D. r = 3 

Multiply.7y(y3 + 7y + 5)

A. 7y4 + 49y2 + 35y B. 7y4 + 7y2 + 35 C. 14y3 + 49y2 + 35y D. 7y3 + 7y2 + 35y

Solve the problem.Suppose that the total annual consumption of salmon in a certain country is given by  and that the total annual consumption of tuna in this country is given by , where consumption is measured in millions of pounds and x is the number of years since 2010. When consumption of salmon reaches consumption of tuna, what is the annual consumption of salmon?

A. 894.89 million pounds B. 893.4 million pounds C. 897.87 million pounds D. 890.42 million pounds