Solve the problem.A plane flying the 3057-mile trip from City A to City B has a 30-mph tailwind. The flight's point of no return is the point at which the flight time required to return to City A is the same as the time required to continue to City B. If the speed of the plane in still air is 430 mph, how far from City A is the point of no return? Round your answer to the nearest mile.

Find the area of the specified region.Shared by the circles r = 2 and r = 4 cos ?

A. (2? + 3)
B. ?
C. 2?
D. (4? - 3)

Use the multiplication principle to solve the equation.-7x = -35

A. 28 B. 2 C. -28 D. 5

Determine whether the sequence is a Fibonacci-type sequence. If it is, determine the next two terms of the sequence.2, 1, 3, 4, 5 ...

A. Yes; 6, 7 B. Yes; 6, 12 C. No D. Yes; 6, 9

Write the equation for the plane.The plane through the point P(-4, 6, 6) and normal to n = .

A. -4x + 6y + 6z = 64 B. -5x - 7y - 7z = 64 C. 4x - 6y - 6z = 64 D. 5x + 7y + 7z = 64