Chapter 7.2, Problem 25WE

(a)

To determine

Tosolve:The given equation by factoring.

Answer to Problem 25WE

The solution of the equation is $x_{1,2}=\pm 3$ .

Explanation of Solution

Given:

The equation is

  $5x^2-45=0$

Calculation:

The solution of the given equation is obtained by factoring.

The given equation can be written as

  $\begin{array}{l}5x^2-45=0\\ x^2-9=0\end{array}$

Find the factors of the equation.

  $\begin{array}{l}{x}^2-9=0\\ x^2-3^2=0\\ \left(x-3\right)\left(x+3\right)=0\end{array}$

Equate $\left(x-3\right)=0$

  $x=3$

Equate $\left(x+3\right)=0$

  $x=-3$

Therefore, the solution of the given equation is

  $\begin{array}{l}x=3\\ x=-3\end{array}$ .

Therefore, the solution of the equation is $x_{1,2}=\pm 3$ .

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(b)

To determine

Tosolve:The given equation by quadratic formula.

Answer to Problem 25WE

The solution of the equation is $x_{1,2}=\pm 3$ .

Explanation of Solution

Given:

The equation is

  $5x^2-45=0$

Calculation:

The solution of the given equation is obtained by using the quadratic formula.

The given equation can be written as

  $\begin{array}{l}5x^2-45=0\\ x^2-9=0\end{array}$

For a quadratic equation in the form of $a{x}^2+bx+c=0$ , the solution of this equation is given by

  $x_{1,2}=\frac{-b\pm \sqrt{b^2-4ac}}{2a}$

Comparing the given equation with the standard quadratic equation, the coefficients are:

  $\begin{array}{l}a=1\\ b=0\\ c=-9\end{array}$

Substituting these in the formula for the roots.

First take the positive sign.

  $\begin{array}{c}{x}_1=\frac{-\left(0\right)+\sqrt{{\left(0\right)}^2-4\times 1\times \left(-9\right)}}{2\times 1}\\ =\frac{0+\sqrt{36}}{2}\\ =\frac{6}{2}\\ =3\end{array}$

Take the negative sign.

  $\begin{array}{c}{x}_1=\frac{-\left(0\right)+\sqrt{{\left(0\right)}^2-4\times 1\times \left(-9\right)}}{2\times 1}\\ =\frac{0-\sqrt{36}}{2}\\ =\frac{-6}{2}\\ =-3\end{array}$

Therefore, the solution of the given radical equation is

  $\begin{array}{l}x=3\\ x=-3\end{array}$ .

Therefore, the solution of the equation is $x_{1,2}=\pm 3$ .

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