The image on the right shows the entrance structure to the Pillo Hotel in Co - Leaving Cert DCG - Question B-3 - 2019

1. Identify the line of intersection between planes A and B, using the coordinates from the previously drawn elevations.

2. Project perpendicular lines from a point on plane A to the line of intersection on the new X,Y plan.

3. Measure the angle formed between the normal to plane A and the line of intersection using trigonometric methods. Calculate the dihedral angle using:

ext{Dihedral Angle} = an^{-1}rac{h_{A}}{d_{A}}

where $h_{A}$ is the height and $d_{A}$ is the distance.

1. Project the auxiliary elevation of plane A down to the XY line to define its orientation on this horizontal plane.

2. Determine the angle of inclination by constructing a right triangle where the vertical leg represents the height of plane A and the horizontal leg represents the corresponding distance on the XY plane.

3. Use trigonometry to find the angle:

ext{Inclination} = an^{-1}rac{ ext{height of A}}{ ext{run}}. \n 4. Indicate this angle in degrees.

1. Draw the projections of line PQ onto the plan and elevation of the intersecting planes A and B.

2. Analyze the path of line PQ as it intersects the planes; adjust the line to conform with proper scaling on the grid.

3. Mark the points of intersection by utilizing geometric constructions to establish penetration points in both plan and elevation drawings.

4. Label the intersection points clearly to indicate where line PQ meets planes A and B.