Find the solution of with .
Solve the following matrix in terms of and
Find the value of that satisfies the inequation and represent , graphically, the function .
Determine the parameters , , and of the complex transformation which takes points for , respectively, as well as for , where .
Find , and such that the polynomial , with , is divisible by and that the numerical value of the quotient is equal to when .
A finite sum of integer consecutive numbers, odd, positives or negatives, is equal to . Find the terms of this sum.