If T \neq 0, then \ker T is of codimension one in X. By choosing u \in X such that Tu \neq 0, you are choosing a one-dimensional complement for \ker T and then X = \ker T \oplus \operatorname{span} \{ u \} ...

Cancel equal terms from the numerator and the denominator. Explanation: Your starting expression looks like this \displaystyle\frac{{{2}{x}}}{{{y}^{{2}}}}\cdot\frac{{{3}{y}^{{3}}}}{{{4}{x}^{{2}}}} ...

If you know about localizations of rings, then this ring is the localization of \mathbb{Z} away from (or "at"; I'm never sure of the correct terminology) the ideal (2). From here there are general ...

Let r=y/z,\ s=z/x,\ t=x/y. Then r-1/r=a,\ s-1/s=b,\ t-1/t=c. The first two have each two solutions for r,s which are r=\frac{a \pm \sqrt{a^2+4}}{2},\ \ s=\frac{b \pm \sqrt{b^2+4}}{2}.\tag{1} ...

You can use y=100 \left(\frac{x+251}{449}\right) Essentially what this does is shift your original answer up by 251 (so the lowest number gives you your zero) find the fraction of this out of ...

They are mainly equivalent. First rewrite r as r=\dfrac{S_{xy}}{(n-1)S_xS_y}, where S_{xy}=\sum(x_i-\bar{x}).(y_i-\bar{y}). Now plug in r as above in a from your book, we have: a=\dfrac{r.S_y}{S_x}=\dfrac{S_{xy}}{(n-1)S_xS_y}.\dfrac{S_y}{S_x}=\dfrac{S_{xy}}{S_x^2(n-1)} ...