\displaystyle{A}^{{-{1}}}=\frac{{1}}{{3}}{\left(\begin{array}{cccc} {2}&{1}&{0}&{0}\\{1}&{2}&{0}&{0}\\{0}&{0}&{2}&{1}\\{0}&{0}&{1}&{2}\end{array}\right)} Explanation: \displaystyle{A}={\left(\begin{array}{cccc} {2}&-{1}&{0}&{0}\\-{1}&{2}&{0}&{0}\\{0}&{0}&{2}&-{1}\\{0}&{0}&-{1}&{2}\end{array}\right)} ...

I have tried the following idea. At first we take a certain value k of height to test whether it is reachable. Then like in Graham scan algorithm modification called Andrew's Monotone Chain ...

It suffices to note that B - \lambda_1 I has nullity (null-space dimension) 1 when a \neq 0 and 2 when a = 0. So, the geometric multiplicity of \lambda_1 is 1 when a \neq 0 and 2 ...

Probabilities are dependent on what things are considered to be equally likely in the sample space. In your example that gives a result of 2/3, the sample space is distinguishable configurations of ...

" For what value of k does the system not have a unique solution " This would include both the case of infinitely many solutions and also the case of no solution . A much easier approach than ...

The problem is, details of the problem are missing. Are the payments made at the beginning or end of each month? Is the interest rate the annual effective rate, or is it the nominal rate convertible ...