See a solution process below: Explanation: First, cancel common terms in the numerator and denominator: \displaystyle\frac{{\cancel{{{\left({15}\right)}}}}}{{{\left(\cancel{{{\left({4}\right)}}}\right)}{\left(\cancel{{{\left({x}^{{2}}\right)}}}\right)}{x}}}\times\frac{{{\left(\cancel{{{\left({28}\right)}}}\right)}{7}{\left(\cancel{{{\left({x}\right)}}}\right)}}}{{{\left(\cancel{{{\left({45}\right)}}}\right)}{3}}}\Rightarrow\frac{{7}}{{{3}{x}}}

This is s special case of Chinese remainder theorem. Send a polynomial f(x)\in F[x] to the pair (f(-1), f(1)). CRT states it is surjective. To see surjectivity avoiding CRT you have to solve a ...

Let A = k\left[x\right]/\left(x^2\right), and let us denote the projection of x \in k\left[x\right] onto A by x (by abuse of notation). I assume that your \left(x\right) means the A ...

\displaystyle\frac{{x}}{{5}} Explanation: Multiply the top and bottom together, so \displaystyle\frac{{12}}{{{5}{x}}}\times\frac{{x}^{{3}}}{{{12}{x}}}=\frac{{{12}\times{x}^{{3}}}}{{{5}{x}\times{12}{x}}}=\frac{{{12}{x}^{{3}}}}{{{60}{x}^{{2}}}} ...

I think your answer is correct. The space X is a mapping torus, and there is a long exact sequence relating the homology of X with the homology of T^2 and the gluing map. See Hatcher, example ...

You can realize this space as a CW complex by attaching a 2-cell to the wedge sum of two circles \{a, b\} along the path aba^{-4}b^{-1}.