\displaystyle{\left({y}-{4}\right)}{\left({y}+{5}\right)}={\left({y}^{{2}}+{y}-{20}\right)} Explanation: The expression is : \displaystyle{\left({y}−{4}\right)}{\left({y}+{5}\right)} F O I ...

\displaystyle{\left({y}²+{2}{y}-{8}\right)} Explanation: using the Distributive Property of Real Numbers, FOIL METHOD (First Term, Outer Term, Inner Term, and the Last Term) \displaystyle{\left({\left({a}+{b}\right)}{\left({a}+{b}\right)}={a}²+{2}{a}{b}+{b}²\right)} ...

\displaystyle{y}^{{2}}-{7}^{{2}} Explanation: So here can apply a index rule which is: \displaystyle{\left({a}+{b}\right)}{\left({a}-{b}\right)}={a}^{{2}}-{b}^{{2}} So we just apply these ...

Let me replace the property "increasing" by the weaker "non-decreasing". This does not change the problem too much, but it makes the computation less messy. It is well-known that the best linear ...

Your factorization is incorrect. It should be y^2−15y+54 = (y-6)(y-9) Note that your factorization yields this: (y-18)(y+3)=y^2−15y{\color{red}-}54

The expression with the puzzling \rm\:c(v)\: is Norlund's principal solution of the difference equation \rm \mathop\Delta\limits_{\alpha}\ \mathop {\mathrm S}\limits_{{\alpha _0}}^\alpha h(v) dv = h(a).\: ...