Chapter 5, Problem 1RE

Determine if the ordered pair is a solution to the system.

$\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$

a. $\left(1,\frac{2}{3}\right)$

b. $\left(6,4\right)$

To determine

Whether the ordered pair $\left(1,\frac{2}{3}\right)$ is a solution to the system of equations $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$.

Answer to Problem 1RE

Solution:

The ordered pair $\left(1,\frac{2}{3}\right)$ is a solution to the system of equations $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$.

Explanation of Solution

Given information:

The provided system of equations is $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$ and the ordered pair is $\left(1,\frac{2}{3}\right)$.

The provided system of equations is,

$\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$

Consider the provided ordered pair is $\left(1,\frac{2}{3}\right)$.

Now, to check the ordered pair is a solution to the equation, substitute them into the equations.

Substitute $1$ for $x$ and $\frac{2}{3}$ for $y$ in the first equation.

$\begin{array}{r}2\left(1\right)-3\left(\frac{2}{3}\right)\stackrel{?}{=}0\\ 2-2\stackrel{?}{=}0\\ 0=0\end{array}$

The result is true.

So, the ordered pair $\left(1,\frac{2}{3}\right)$ is a solution to $2x-3y=0$.

Substitute $1$ for $x$ and $\frac{2}{3}$ for $y$ in the second equation.

$\begin{array}{r}-5\left(1\right)+6\left(\frac{2}{3}\right)\stackrel{?}{=}-1\\ -5+2\left(2\right)\stackrel{?}{=}-1\\ -5+4\stackrel{?}{=}-1\\ -1=-1\end{array}$

The result is true.

So, the ordered pair $\left(1,\frac{2}{3}\right)$ is a solution to $-5x+6y=-1$.

Therefore, the ordered pair $\left(1,\frac{2}{3}\right)$ is a solution to the system of equations $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$.

To determine

Whether the ordered pair $\left(6,4\right)$ is a solution to the system of equations $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$.

Answer to Problem 1RE

Solution:

The ordered pair $\left(6,4\right)$ is not a solution to the system of equations $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$.

Explanation of Solution

Given information:

The provided system of equations is $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$ and the ordered pair is $\left(6,4\right)$.

The provided system of equations is,

$\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$

The provided ordered pair is $\left(6,4\right)$.

Now, to check the ordered pair is a solution to the equation, substitute them into the equations.

Substitute $6$ for $x$ and $4$ for $y$ in the first equations.

$\begin{array}{r}2\left(6\right)-3\left(4\right)\stackrel{?}{=}0\\ 12-12\stackrel{?}{=}0\\ 0=0\end{array}$

The result is true.

So, the ordered pair $\left(6,4\right)$ is a solution to $2x-3y=0$.

Substitute $6$ for $x$ and $4$ for $y$ in the second equations.

$\begin{array}{r}-5\left(6\right)+6\left(4\right)\stackrel{?}{=}-1\\ -30+24\stackrel{?}{=}-1\\ -6\ne -1\end{array}$

The result is not true.

So, the ordered pair $\left(6,4\right)$ is not a solution to $-5x+6y=-1$.

Therefore, the ordered pair $\left(6,4\right)$ is not a solution to the system of equations $\begin{array}{c}2x-3y=0\\ -5x+6y=-1\end{array}$.