Final answer:
The question lacks complete information to solve for the point and angle of intersection of the two parametric equations. Under correct circumstances, the intersection point is found by equating the equations and solving for the common parameter. The angle of intersection is obtained using the dot product formula.
Step-by-step explanation:
To find the point and angle of intersection of the given lines with parametric equations, we first need to set the two equations equal to each other to find the point at which they intersect. However, the information provided seems to have some formatting issues and might be missing parts of the equations for line 1 and line 2, such as the variables associated with them. Without the correct equations, we can't proceed to find the intersection.
Assuming that the equations would be in the format of x = x₀ + at, y = y₀ + bt, and z = z₀ + ct for line 1 and a similar format for line 2, we could solve for t to find the common point if one exists. To find the angle of intersection, we would use the dot product formula to compute the angle between the direction vectors of the lines. The intensity mentioned in the given context and how it's calculated post finding the angle remains unclear due to the lack of context.