Let X be a topological space. Show that if X is compact and hausdorff, then X is normal.
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10 points for WORST answer? okay.
Let's say x is in vector space. This means that it satisfies "u1 + u2 is closed under addition". Now after you've found the center of balance, plug that into your kinematic equation for velocity. Now all you have to do is Find the jacobian, solve for LaGrange multipliers, and plug in your eigen values and you've successfully found a potential function for your gradient!
Let's say x is in vector space. This means that it satisfies "u1 + u2 is closed under addition". Now after you've found the center of balance, plug that into your kinematic equation for velocity. Now all you have to do is Find the jacobian, solve for LaGrange multipliers, and plug in your eigen values and you've successfully found a potential function for your gradient!