\displaystyle{p}={0} Explanation: Find a common denominator. I can see that \displaystyle{3}{p}-{6} is actually \displaystyle{3}{\left({p}-{2}\right)} There's also a \displaystyle{2} ...

k = 1 Explanation: Multiply every term in the equation by k to get: \displaystyle{2}-{3}+{4}{k}={3} Solve for k. \displaystyle{4}{k}={3}-{2}+{3} \displaystyle{4}{k}={4} \displaystyle{k}={1}

Dividing one equation by the other will give \frac{12.3}{21.1} = \exp(-Q(\frac{1}{60R} - \frac{1}{360R})), which you can then solve for Q. Plugging Q in to one of the equations will then let you ...

To parse this expression you need to have a grammar for your operators, that describes their precedence and how they associate. A typical operator precedence looks something like Expressions in ...

You should consider splitting the integral at the point where |x| changes from -x to +x, namely at x=0. So \int_{-1}^2(x-2|x|)dx = \int_{-1}^0(x-2(-x))dx + \int_0^{2}(x-2x)dx =3\int_{-1}^0 xdx -\int_0^2xdx ...

I seriously doubt that your bound is optimal. While your proof is maybe correct it's the "wrong" proof - you want to divide f by a function that vanishes at \pm1/2 and which has modulus 1 on the ...