The intersection of the x1x2 plane and a curve at t=π/2 represents the point at which the curve crosses the x1x2 plane when t=π/2. This can be used to determine the coordinates of the point of intersection and the slope of the curve at that point.
The coordinates of the point of intersection can be calculated by substituting t=π/2 into the parametric equations of the curve. This will give the x and y coordinates of the point of intersection on the x1x2 plane.
The slope of the curve at the point of intersection represents the rate of change of the curve at that point. It can be thought of as the steepness of the curve at that point and can be used to determine the direction in which the curve is heading.
Yes, it is possible for the intersection of the x1x2 plane and a curve at t=π/2 to have multiple points. This can occur when the curve crosses the x1x2 plane more than once at t=π/2, or when the curve is tangent to the plane at t=π/2.
The x1x2 plane serves as a reference plane for the curve at t=π/2. The intersection of the two represents the point at which the curve crosses the plane, and the slope of the curve at that point can be used to determine its behavior in relation to the plane.