Pretty sure you know the quadratic formula. The roots of ax^2+bx+c = 0 are given by the quadratic formula: x = \frac{-b\pm\sqrt{b^2-4ac}}{2a} In the formula, b^2-4ac is referred to as the ...

The answer is \displaystyle{k}\in{]}-\infty,-\sqrt{{8}}{]}\cup{\left[\sqrt{{8}},\infty{[}\right.} Explanation: In order for the roots of a quadratic equation, to de real, the dircriminant \displaystyle\Delta\ge{0} ...

We solve the equation: \begin{align} x^2+(k-3)x+k = 0 &\implies x = \frac{3-k \pm \sqrt{k^2-6k+9 - 4\cdot 1\cdot k}}{2} \\ &\implies x = \frac{3-k \pm \sqrt{k^2-10k + 9}}{2}\end{align} For starters, ...

This type of questions can be solved in two different types!! 1. Using the formula given as condition for common roots! If you are about to use this formula, then consider two equations given as ...

\displaystyle{k}\in{\left\lbrace\pm{10},\pm{11},\pm{12},\pm{24}\right\rbrace} Explanation: The rule to factorise any quadratic is to find two numbers such that \displaystyle\text{product}={x}^{{2}}\ \text{ coefficient }\ \times\ \text{ constant coefficient} ...

The sum of the roots is \displaystyle-\frac{{2}}{{3}} and their product is \displaystyle\frac{{k}}{{3}} Explanation: Given: \displaystyle{3}{x}^{{2}}+{2}{x}+{k}={0} Divide through by \displaystyle{3} ...