\displaystyle{a}=-{64},{b}={0} Explanation: if you are familiar with Euler's rule \displaystyle{z}={e}^{{{i}{x}}}={\cos{{x}}}+{i}{\sin{{x}}} we can express z as \displaystyle{z}={2}{\left(\frac{\sqrt{{3}}}{{2}}+\frac{{i}}{{2}}\right)}={2}{\left(\frac{{\cos{\pi}}}{{6}}+{i}\frac{{\sin{\pi}}}{{6}}\right)}={2}{e}^{{{i}\frac{\pi}{{6}}}} ...

By multiplying out P(z) = (z-a_1)(z-a_2)\cdots(z-a_n), we see that the product of the solutions a_1,a_2,\ldots,a_n to P(z)=0 is (-1)^n times the constant term of P. In particular, if n is ...

Note that \binom{n}{k-1}+\binom{n}{k}=\binom{n+1}{k}, so \begin{align} (a+b)^{n+1}&=(a+b)^n(a+b)\\&=\left(\sum_{k=0}^{n}\binom{n}{k}a^kb^{n-k}\right)(a+b)\\ &=\sum_{k=0}^{n}\binom{n}{k}a^{k+1}b^{n-k}+\sum_{k=0}^{n}\binom{n}{k}a^kb^{n-k+1}\\ &=a^{n+1}+\sum_{k=1}^{n}\binom{n}{k-1}a^kb^{n-k+1}+\sum_{k=1}^{n}\binom{n}{k}a^kb^{n-k+1}+b^{n+1}\\ &=a^{n+1}+\sum_{k=1}^{n}\left(\binom{n}{k-1}+\binom{n}{k}\right)a^kb^{n-k+1}+b^{n+1}\\ &=a^{n+1}+\sum_{k=1}^{n}\binom{n+1}{k}a^kb^{n-k+1}+b^{n+1}\\&=\sum_{k=0}^{n+1}\binom{n+1}{k}a^kb^{n-k+1}.\end{align}

You can use the matrix \begin{bmatrix}0&-1\\1&0\end{bmatrix}

The second equation can be written ab=2\sqrt{3} which gives b = \frac{2\sqrt{3}}{a} . If we substitute back into the first equation we get a^2 - \frac{12}{a^2} = -1 . Multiplying both sides ...

Let z = x+iy where x,y\in\mathbb R. \begin{align} z^3 & = {} \overbrace{(x+iy)^3 = x^3 + 3x^2iy + 3xi^2y^2 + i^3y^3}^{\text{binomial theorem}} \\[10pt] & = (x^3 -3xy^2) + i(3x^2y - y^3) ...