Question

Number of distinct real roots of the equation $x^4+4x^3-2x^2-12x+k=0$ is

• A. $4$ if $xϵ(-7,9)$
• B. $3$ If $k=7$
• C. $2$ If $k<-7$
• D. no root if $k>9$

Answer 1

The correct option is C $2$ If $k<-7$

$\begin{array}{c}{x}^4+4x^3-2x^2-12x+k=0\\ \\ x^4+4x^3-2x^2-12x=-k\\ x\left(x^3+4x^2-2x-12\right)=-k\\ x\left(x+2\right)\left(x^2+2x-6\right)=-k\\ Now\\ f\left(3\right)=-3\left(-1\right)\left[9-6-6\right]\\ f\left(-1\right)=-1\left(1\right)\left[1-2-6\right]\\ f\left(1\right)=3\left(-3\right)=-9\\ for-9<-k<7has4distinctrealroots\\ -7<k<9for2distinctroot\\ -k>7\\ k<-7\\ Fornoroot-k<-9\\ k>9\\ Hence,theoptionCisthecorrectanswer.\end{array}$