\displaystyle{L}{C}{M}={3}{\left({m}-{2}\right)}{\left({m}+{2}\right)}{\left({m}^{{2}}+{2}{m}+{m}^{{2}}\right)} Explanation: Factorise the expressions first: \displaystyle{3}{m}^{{3}}-{24}={3}{\left({m}^{{3}}-{8}\right)}\ \text{ }\ \leftarrow ...

See a solution process below: Explanation: If \displaystyle{m}{>}{0} then \displaystyle-{m}{<}{0} A negative number to an odd power results in a negative number Also, a negative number to an ...

\displaystyle{\left({0},{4}\right)} Explanation: Polar form \displaystyle{\left({r},\theta\right)} Rectangular form: \displaystyle{\left({r}{\cos{\theta}},{r}{\sin{\theta}}\right)} \displaystyle\theta=-{270}^{\circ}={90}^{\circ} ...

u5=243 One solution was found :                   u = 3 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

\displaystyle{3}{\left({m}+{3}\right)}{\left({m}-{3}\right)} Explanation: When you factorise, always look for a common factor first. Both terms can be divided by 3. \displaystyle{3}{m}^{{2}}-{27}={3}{\left({m}^{{2}}-{9}\right)}\ \text{ this gives difference of squares} ...

We have that z = \frac{(1+i)^n}{(1-i)^{n-2}}= (1+i)^2\frac{(1+i)^{n-2}}{(1-i)^{n-2}}= (2i)\left(\frac{1+i}{1-i}\frac{1+i}{1+i}\right)^{n-2}= (2i)\left(\frac{2i}{2}\right)^{n-2}=2(i)^{n-1} and 2(i)^{n-1} ...