\displaystyle{2}{d}^{{2}}+{6}{d}-{7} Explanation: \displaystyle{5}{d}^{{2}}+{4}{d}-{3}-{\left({3}{d}^{{2}}-{2}{d}+{4}\right)} \displaystyle={5}{d}^{{2}}+{4}{d}-{3}+-{\left({3}{d}^{{2}}-{2}{d}+{4}\right)} ...

\displaystyle{\left\lbrace{a}={15}^{{2}},{b}={15}^{{3}},{c}={17}^{{2}},{d}={17}^{{3}}\right\rbrace} and \displaystyle{\left\lbrace{a}={6}^{{2}},{b}={6}^{{3}},{c}={10}^{{2}},{d}={10}^{{3}}\right\rbrace} ...

Hint: Use the following invariant formula for the exterior derivative of a 1-form \theta: d\theta(X,Y) = X(\theta(Y)) - Y(\theta(X)) - \theta([X,Y]).

I think you're mixing equations valid for rigid bodies with those that apply to non-rigid ones. Torque is the rate of change of angular momentum. For your particle example, the angular momentum is ...

The GCD of x and y divides x-y, hence the GCD 3^{2003}-1 and 3^{2003}+1 is either 1 or 2; it is easy to check that both numbers are even, so this GCD of these is 2. The LCM of x and y ...

You can do this if x,y,z are integers, otherwise there are infinitely many solutions. First suppose that x \geq y \geq z, this is possible because of symmetry. Suppose that x \geq 26, then 3^x\geq3^{26} ...