Prove that $-\sqrt{c}<ab<0$ if $a^4-2019a=b^4-2019b=c$.

Notice that, since $a\ne b$ $$a^4-b^4= 2019(a-b)\implies (a^2+b^2)(a+b)=\color{red}{2019}$$

If we add both equations we get:

\begin{align}2c &= a^4+b^4-\color{red}{2019}(a+b) \\ &= a^4+b^4-(a+b)^2(a^2+b^2)\\ &= -2ab(a^2+ab+b^2) \end{align} Since $a^2+ab+b^2>0$ we have $ab<0$. Further

\begin{align}c &= -ab(a^2+ab+b^2)\\ &> -ab(2|ab|+ab)\\ &= -ab(-2ab+ab)\\ & = a^2b^2 \end{align}

So $c>a^2b^2$ which means $-\sqrt{c}<ab$

Tags:

Calculus

Polynomials

Real Numbers

Systems Of Equations

Contest Math

Related

Calculating $ \lim_{x \to 0} (\frac{x\cdot\sin{x}}{|x|}) $ Structure of the Mapping Cylinder of a Continuous Function Proving the integral inequality $2≤\int_{-1}^1 \sqrt{1+x^6} \,dx ≤ 2\sqrt{2} $ Evaluating $\int_0^1\frac{\arctan x\ln\left(\frac{2x^2}{1+x^2}\right)}{1-x}dx$ Prove that $\left|30240\int_{0}^{1}x(1-x)f(x)f'(x)dx\right|\le1$. Show $1+\frac{8q}{1-q}+\frac{16q^2}{1+q^2}+\frac{24q^3}{1-q^3}+\dots=1+\frac{8q}{(1-q)^2}+\frac{8q^2}{(1+q^2)^2}+\frac{8q^3}{(1-q^3)^2}+\dots$. If $A$ is a $2\times2$ integer matrix with $\det(A)=1$ and $|\text{tr}(A)|>2$, then $A^n\neq I$. (BAMO $2013/3$) $ABH$, $BCH$ and $CAH$ is congruent to $ABC$. Calculate: $\int_0^\infty [x]e^{-x} \, dx$ where $[x]:=\max \{k\in\mathbb{Z}:k\leq x\}$ Prove $ \int_0^\infty e^{-x^2} dx = \frac{\sqrt{\pi}}{2}$. Epitrochoids and adjacent loop touching Show $\binom{n}{[n/2]} = \binom{n-1}{[(n-1)/2]} + \sum_{i=0}^{[n/2] - 1} \frac{1}{i+1} \binom{2i}{i} \binom{n-2i-2}{[n/2]- i - 1}$

Recent Posts