Don't Memorise Jun 8, 2015 \displaystyle{\left(-{18}{x}^{{2}}+{7}{x}-{14}\right)}-{\left(-{20}{x}^{{2}}+{17}{x}-{12}\right)} \displaystyle=-{18}{x}^{{2}}+{7}{x}-{14}+{20}{x}^{{2}}-{17}{x}+{12} ...

We can solve (x-1)(x-2)(x-3) + 1 = 0 for x \in \mathbb{R} by manipulating it in a quadratic equation with some convenient variable substitutions as follows: Expand the polynomial x^3-6 x^2+11 x-5 = 0 ...

Since we have a cubic polynomial, we can use a 2 \times 3 matrix (or a 3 \times 2 matrix) instead of a 3 \times 3 matrix. Hence, x^3 - 6 x^2 + 11 x - 6 = \begin{bmatrix} 1\\ x\end{bmatrix}^\top \begin{bmatrix} -6 & t_1 & t_2\\ 11-t_1 & -6-t_2 & 1\end{bmatrix} \begin{bmatrix} 1\\ x\\ x^2\end{bmatrix} ...

The easiest way, but unfortunatelly only works some times is the following: Step 1: Guess a root a of P(x). Step 2: Divide by x-a. Step 3: Factor the remaining quadratic. The following usually ...

By the rational root theorem , f has no rational roots. Since the degree is 3, it follows that f is irreducible. Eisenstein criterion with p=3 is another way to show this.

If you add the identity then you get a rank-one matrix whose characteristic polynomial is \chi(K_n + I) = (-1)^n x^{n-1} (x - n). The factor (x-n) coming from the lone eigenvalue n with ...