\displaystyle{x}=-{1} and \displaystyle{y}={6} Explanation: After equating column of matrices, \displaystyle{x}^{{2}}+{1}={2} , \displaystyle{5}-{y}={x} and \displaystyle{y}-{4}={2} ...

\displaystyle{\left({x},{y}\right)}={\left(-{2},{7}\right)} Explanation: \displaystyle{\left[\begin{array}{ccc} {x}^{{2}}+{1}&{\left(\text{x}\right)}&{5}-{y}\\{x}+{y}&&{y}-{4}\end{array}\right]}={\left[\begin{array}{ccc} {5}&{\left(\text{x}\right)}&{x}\\{5}&&{3}\end{array}\right]} ...

I got: \displaystyle{x}=-{1} \displaystyle{y}={1} Explanation: For the two matrices to be equal we need that each element of the first to be equal to the correspondent one of the second, ...

"Let \Bbb N =\{1,2,3,\cdots\} be the set of natural numbers and I_n = \{1,\cdots,n\}." The only thing I'd do differently, here, is to point out that we're defining I_n for all n\in\Bbb N. I ...

Let dim(E)=n and A=\{v_1,v_2...v_n\} a basis of E. Now let x \in E,then x=a_1v_n+a_2v_2+...a_nv_n for some a_1...a_n \in F Take the set of linear functionals B=\{f_1,f_2...f_n\} where f_i(v_j)=0 ...

a b^2+a c^2+b a^2+b c^2+ c a^2+ c b^2=-3 a b c + (a+b+c)(a b + b c + c a)