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Using spherical duck matrix algebra:
quack1 inner product with quack2 = ?? since inner product is not defined in n-dimensional duck space.
Convert to rectangular leopard coordinates:
The metric for this is (-1, 5, tree, banjo)
Using the Haggis equation, we can represent quack1 with (123Po, 344Qo, 232Po, 56Qo) Where P nought and Q nought are the Haggis coefficients of zeroth order. quack2 is more difficult to define in Haggis coordinates so we refer to it in its generalised form, quack2ijk where ijk are indicies representing the different quantum duck (and Haggis) states.
With this in mind, we can use the definition of inner product in leopard coordinates but this is undefined so we must then conclude that quack1 and quack2 are unsoluble in duck, Haggis and leopard coordinates so we must give up move on to the next Haggisean problem.....
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