A different approach can be as follows. We will argue by contradiction. Assume that there are three different roots in [0,1], say \alpha, \beta,\gamma. Then ax^3+bx^2+c=a(x-\alpha)(x-\beta)(x-\gamma)=a[x^3-(\alpha+\beta+\gamma)x^2+(\alpha\beta+\alpha\gamma+\beta\gamma)x+\alpha\beta\gamma]. ...

Answer:A. 33B. k=32C. 1D. \\pm 1,\\ \\pm 2,\\ \\pm 4[\/tex]E. B=-2,\\ D=5[\/tex]Step-by-step explanation:In all parts for the quadratic equation ax^2+bx+c=0[\/tex] use Vieta's formulas ...

x2+4x-72=5x Two solutions were found :  x = 9  x = -8 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

\displaystyle{x}=-{8} & \displaystyle{x}=-{7} Explanation: Let's look at the \displaystyle{x}^{{2}}+{7}{x} and the \displaystyle{8}{x}+{56} separately. \displaystyle{\left({x}^{{2}}+{7}{x}\right)}+{\left({8}{x}+{56}\right)}={0} ...

\begin{align}x=\sqrt 2+\sqrt 3&\Rightarrow x-\sqrt 2=\sqrt 3\\&\Rightarrow x^2-2\sqrt 2x+2=3\\&\Rightarrow 2\sqrt 2x=x^2-1\\&\Rightarrow 8x^2=x^4-2x^2+1\\&\Rightarrow x^4-10x^2+1=0\end{align} So, ...

Let f(x)=\frac{a}{2}x^2+bx+c, then f(x_1)=-\frac{a}{2}x_1^2 and f(x_2)=\frac{3a}{2}x_2^2. Consequently f(x_1)f(x_2)<0. By continuity it should have a root in (x_1,x_2).