Chapter 10.7, Problem 39E

To determine

Tofind:the solution of the equation of $y$ using quadratic formula and draw the graph.

Answer to Problem 39E

  $y=\frac{-\left(5x\right)+\sqrt{153x^2+32}}{\left(-8\right)}\text{ or }y=\frac{-\left(5x\right)-\sqrt{153x^2+32}}{\left(-8\right)}$ .

Explanation of Solution

Given:

  $8x^2+5xy-4y^2=2.$

Concept used:

First solve the given equation for $y$ , it can write the equation in the form of $a{y}^2+by+c=0$ .

  $y=\frac{-b\pm \sqrt{b^2-4ac}}{2a}$ .

Graph of an equation can be plot using the Desmos graphing calculator.

Calculation:

Consider the equation of the conic:

  $8x^2+5xy-4y^2=2.$

First solve the given equation for $y$ , it can write the equation in the form of $a{y}^2+by+c=0$ .

  $-4y^2+\left(5x\right)y+\left(8x^2+2\right)=0.$

Now use the quadratic formula to solve for $y$ :

  $\begin{array}{l}y=\frac{-\left(5x\right)\pm \sqrt{{\left(5x\right)}^2-4\left(-4\right)\left(8x^2+2\right)}}{2.\left(-4\right)}\text{.}\\ \Rightarrow \frac{-\left(5x\right)\pm \sqrt{25x^2+16\left(8x^2+2\right)}}{\left(-8\right)}.\\ \Rightarrow \frac{-\left(5x\right)\pm \sqrt{153x^2+32}}{\left(-8\right)}.\end{array}$

The two roots of the $y$ are:

  $y=\frac{-\left(5x\right)+\sqrt{153x^2+32}}{\left(-8\right)}\text{ or }y=\frac{-\left(5x\right)-\sqrt{153x^2+32}}{\left(-8\right)}$ which define both laps of the hyperbola.

The graph of the equation $8x^2+5xy-4y^2=2.$ is:

  

Hence, the new equation so form is

  $y=\frac{-\left(5x\right)+\sqrt{153x^2+32}}{\left(-8\right)}\text{ or }y=\frac{-\left(5x\right)-\sqrt{153x^2+32}}{\left(-8\right)}$ .