41. \( x^{2}+5 y^{2}-8 x-30 y-37=0 \) 42. \( 3 x^{2}+y^{2}+18 x-2 y-8=0 \)

To solve \( x^{2}+5 y^{2}-8 x-30 y-37=0 \), we can rearrange it into the form of a conic section. Completing the square for \( x \) and \( y \) gives us the equation of an ellipse. Similarly, for \( 3 x^{2}+y^{2}+18 x-2 y-8=0 \), completing the square also leads us to identify the type of conic, which in this case turns out to be a hyperbola after appropriate manipulations. Transforming these equations can yield valuable insights regarding their graphical representation. For practice, try substituting specific values for \( x \) and \( y \) in each equation to explore how they behave or to find intersection points. A common mistake is forgetting to consider the implications of the discriminant when identifying the conic type; a negative discriminant suggests an ellipse, zero indicates a parabola, and a positive one points to a hyperbola. Experimenting with actual numbers can clarify the theory behind those shapes!