\displaystyle{a}={10} Explanation: \displaystyle-{7}{a}+{11}+{11}{a}=-{99}-{\left(-{11}{a}\right)}+{4}{a} First, deal with the bracket on the right side. The product of two negatives is a ...

3(5z-7)-2(9z-11)=4(8z-13)-17 One solution was found :                   z = 2 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation ...

\displaystyle{a}={7} Explanation: \displaystyle{a}{\left({a}+{3}\right)}+{a}{\left({a}-{6}\right)}+{35}={a}{\left({a}-{5}\right)}+{a}{\left({a}+{7}\right)} \displaystyle{a}^{{2}}+{3}{a}+{a}^{{2}}-{6}{a}+{35}={a}^{{2}}-{5}{a}+{a}^{{2}}+{7}{a} ...

By using C-S we have : |3a+28b+35c| \le \sqrt{3^2+28^2+35^2} \cdot \sqrt{a^2+b^2+c^2} \tag 1 and |20a+23b+33c|\le \sqrt{20^2+23^2+33^2} \cdot \sqrt{a^2+b^2+c^2} \tag 2 Multiplying (1) and ...

Well, the intuition that "exterior angle" captures is how much one would have to turn at each vertex if they were traversing the edge of the polygon. For instance, if you traverse a triangle ...

There are infinitely many eigenvectors corresponding to one eigenvalue, just check: If x is an eigenvector corresponding to an eigenvalue \lambda of a matrix A, then isn't \mu x also an ...