Solve the problem.A ladder leans against a building that has a wall slanting away from the ladder at an angle of 96° with the ground. If the bottom of the ladder is 23 feet from the base of the wall and it reaches a point 52 feet up the wall, how tall is the ladder to the nearest foot?

The following data show the height h, in feet, above the surface of the ocean and the distance D,  in miles, to the visible horizon.  h 6 8 12 16 19 D 3.3 3.6 4.7 5.4 5.9? A: Use power regression to model the distance to the horizon as a function of the height above the ocean. Use two digits of accuracy for the coefficient and for the power.B: Plot the data along with the power model you found in part A.C: According to the power model, if the height is increased by 22%, how is the distance to the horizon affected? Express your answer in terms of a percentage. Round your answer to two decimal places.

What will be an ideal response?

Evaluate. The differential is exact.

A. 0 B. e9 + e4 + e5 - 1 C. e18 - 1 D. e18 - 3

Two sides and an angle are given. Determine whether the given information results in one triangle, two triangles, or no triangle at all. Solve any triangle(s) that results.a = 23, b = 16, B = 20°

A. one triangle A = 29.45°, C = 130.55°, c = 35.55 B. one triangle A = 150.55°, C = 9.45°, c = 7.68 C. two triangles A1 = 29.45°, C1 = 130.55°, c1 = 35.55 or A2 = 150.55°, C2 = 9.45°, c2 = 7.68 D. no triangle

The angle ? is an angle in standard position and satisfies the given conditions. Find the indicated trigonometric function value of ?. Do not use a calculator.The terminal side of ? is in quadrant II and lies on the line  Find 

A.  
B.   
C.  
D. -