Any function will be one to one if it doesn't have any inflection point. If a function does not have a maxima or minima then the function steadily increases or decreases or stays where it is that is ...

Hint : P(x) is a cubic, so it must have at least one real root. There exists an x_0 such that e^{P(x_0)}=1. This means e^{P(x_0)}\geq \sin x_0 The leading coefficient of P(x) is 1, so \lim_{x\to-\infty} P(x)=-\infty ...

Note that if x^2+3x-1=0, then roots of the quadratic x^2+3x-1 are also roots of (x^2+3x-1)(x^2-px+q) Which follows from polynomial long divison . Since the coefficient of x^3 is 0, we ...

Let p_k = \alpha^k + \beta^k + \gamma^k. By Newton identities , we have \begin{align} p_1 + a = 0 &\implies p_1 = -a\\ p_2 + ap_1 + 2b = 0&\implies p_2 = a^2 - 2b\\ p_3 + ap_2 + bp_1 + 3c = 0&\implies p_3 = -a^3 + 3ab - 3c \end{align} ...

Take x\mapsto x-\frac{a}{3} to eliminate the x^2 term, since {\left( {x - \frac{a}{3}} \right)^3} = {x^3} - a{x^2} + \frac{{x{a^2}}}{3} - \frac{{{a^3}}}{{27}}

There is a general method to express symmetric poynomials in terms of the elementary symmetric polynomials. For example for the cubic with roots \alpha_1^2, \alpha_2^2,\alpha_3^2 on needs to ...