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**Problem Statement:** Let \( y^2 + 2x = x^3 + 1 \). Find the equations of the lines tangent to this curve when \( x = 0 \). *(This equation is implicit, so there is more than one point associated with \( x = 0 \). A graph is shown below for reference; you do not need to reproduce the graph for your solution.)* **Graph Explanation:** The graph displays the curve represented by the equation \( y^2 + 2x = x^3 + 1 \). The coordinate axes are marked, with increments appearing on both the x-axis and y-axis. - **Horizontal Axis (x-axis):** Ranges approximately from -2 to 2. - **Vertical Axis (y-axis):** Ranges approximately from -4 to 4. The curve intersects the y-axis at two points corresponding to different values of \( y \). The graph shows a loop-like curve on the left side and an upward slope on the right, indicating the path of the curve as it approaches different points of tangency at \( x = 0 \). **Task:** Your task is to derive the equations of the tangent lines to the curve at all points where \( x = 0 \). Given the implicit nature of the equation, identify the points on the y-axis where tangencies occur and calculate the respective slopes to determine the equations of the tangent lines.