![]() ![]() ![]() Why eating the power while plus two z plus some function it would only see in it that would do it. So ah, so you're f now we're just look, that I something like X e. Now let's find the term that only deal with Z function. So what does that tell us that tell us this before the partial G would respect to Why has to be zero. Last Tuesday, this is the term that we comparing with shake. ![]() And then we comparing that determinant go with D. You want us to z stayed the same plus the partial returns she waters back to Why? Because what we do in parts of this term. Why, according to this formula, when we do it, what did we get? Well, we actually get the same thing excess a constant. So what? Go ahead and do our show would respect her. Now, if that's the case, then we want to find a she. So answer would be ah e y plus two z times x plus a function G that have no accident, just Wednesay. Find f by doing the in the girl of E why plus two z And remember what respect to X So just have nothing in X in it. We went ahead and Starwood partial afterward. Hi, Section 16.3 fighting the potential function that little f up the big field. ![]()
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