The shortest distance between the curves $y^2=8 x$ and $x^2+y^2+12 y+35=0$ is:

<p><strong>Equation of the Normal to the Parabola:</strong></p> <p>The equation for the normal to the parabola $ y^2 = 8x $ can be expressed as:</p> <p>$ y = mx - 2am - am^3 \quad \text{where } a = 2 $</p> <p>Simplifying, we have:</p> <p>$ y = mx - 4m - 2m^3 $</p></p> <p><p><strong>Center and Radius of the Circle:</strong></p> <p>The given second equation $ x^2 + y^2 + 12y + 35 = 0 $ can be rewritten to find the center and radius of the circle:</p></p> <p><p>Rewrite it as $ x^2 + (y + 6)^2 = 1 $.</p></p> <p><p>Thus, the center of the circle is $ C(0, -6) $ and the radius $ r = 1 $.</p></p> <p><p><strong>Finding the Slope of the Normal:</strong></p> <p>To find the point $ P $ on the parabola where the normal meets, equate:</p> <p>$ -6 = -4m - 2m^3 $</p> <p>Solving for $ m $ gives:</p> <p>$ m = 1 $</p></p> <p><p><strong>Determine Point $ P $ on the Parabola:</strong></p> <p>Substituting $ m = 1 $ back to find $ P \left( am^2, -2am \right) $:</p> <p>$ P(2, -4) $</p></p> <p><p><strong>Calculate the Shortest Distance:</strong></p> <p>The shortest distance from point $ P(2, -4) $ to the center $ C(0, -6) $ minus the radius is:</p> <p>$ CP - r = \sqrt{(2 - 0)^2 + (-4 + 6)^2} - 1 = \sqrt{4 + 4} - 1 $</p> <p>$ = \sqrt{8} - 1 = 2\sqrt{2} - 1 $</p></p> <p>Thus, the shortest distance between the given curves is $ 2\sqrt{2} - 1 $.</p>