Microsoft Math Solver

\displaystyle\lim_{{{n}\rightarrow\infty}}\frac{{n}}{{{3}{n}-{1}}}=\frac{{1}}{{3}} Explanation: Dividing the numerator and denominator of \displaystyle\frac{{n}}{{{3}{n}-{1}}} by \displaystyle{n} ...

\displaystyle\text{This is the result:}\qquad\qquad\qquad\quad\frac{{{14}!}}{{{13}!}}\ =\ {14.} Explanation: \displaystyle\text{Watch how this goes -- these can be fun ... }\ \displaystyle\qquad\qquad\qquad\qquad\qquad\ \frac{{{14}!}}{{{13}!}}\ =\ \frac{{{14}\cdot{13}\cdot{12}\cdot{11}\cdot\cdots\cdot{3}\cdot{2}\cdot{1}}}{{{13}\cdot{12}\cdot{11}\cdot\cdots\cdot{3}\cdot{2}\cdot{1}}} ...

\displaystyle\frac{{13}}{{18}} Explanation: To simplify these fractions, you first need a common denominator. We can use the LCM of \displaystyle{9} and \displaystyle{2} , which is \displaystyle{18} ...

Multiply by the complex conjugate of the denominator to get \displaystyle\frac{{-{8}+{6}{i}}}{{25}} Explanation: \displaystyle\frac{{{2}{i}}}{{{3}-{4}{i}}} \displaystyle{\left(\text{XXX}\right)}=\frac{{{2}{i}}}{{{3}-{4}{i}}}\times\frac{{{3}+{4}{i}}}{{{3}+{4}{i}}} ...

Please see below. Explanation: There are two ways. (1) The easier way is to identify Greater Common Factor (GCF) of numerator and denominator and then divide numerator and denominator by GCF. Here ...

\displaystyle{T}_{{11}}=-{12}\frac{{1}}{{2}} Explanation: In an A.P., the general term is given by \displaystyle{T}_{{n}}={a}_{{1}}+{\left({n}-{1}\right)}{d}\ \text{ }\ \leftarrow ...