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Which ordered pair is a solution tothe system of inequalities shown?

Which ordered pair is a solution tothe system of inequalities shown?-example-1
User Xyzzz
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We want to know which ordered pair is a solution of the system of inequalities shown:


\begin{cases}x-4y\ge0 \\ x-y<-1\end{cases}

For doing so, we will try to solve both inequalities for one variable, in this case, we will use y.

On the first equation:


\begin{gathered} x-4y\ge0 \\ x\ge4y \\ y\le(x)/(4) \end{gathered}

On the second equation:


\begin{gathered} x-y<-1 \\ x+1-y<0 \\ x+1And joining those two results we get:[tex]x+1Now we check each of the ordered pairs, if they hold the condition above:<p><strong>For (0, 2)</strong></p><p>We have that x=0, and y=2. Thus, </p>[tex]\begin{gathered} x+1=1 \\ (x)/(4)=0 \\ \text{And as }2>0,\text{ (0, 2) is NOT a solution of the system.} \end{gathered}

For (-3, 8)

In this case, x=-3 and y=8.


\begin{gathered} x+1=-2 \\ (x)/(4)=-(3)/(4) \\ \text{As }8>-(3)/(4),\text{ this means that (-3, 8) is NOT a solution of the system.} \end{gathered}

For (2,5)

In this case, x=2 and y=5.


\begin{gathered} x+1=3 \\ (x)/(4)=(2)/(4)=(1)/(2) \\ \text{As }5>(1)/(2)\text{ this means that (2, 5) is NOT a solution of the system.} \end{gathered}

For (-7, -4)

In this case, x=-7 and y=-4.


\begin{gathered} x+1=-6 \\ (x)/(4)=-(7)/(4) \\ \text{As }-6<-4\le-(7)/(4),\text{ (-7, -4) is a SOLUTION of the system.} \end{gathered}

For (6, -1)

We have that x=6 and y=-1.


\begin{gathered} x+1=7 \\ (x)/(4)=(6)/(4)=(3)/(2) \\ \text{As }7>-1,\text{ (6, -1) is NOT a solution of the system. } \end{gathered}

Thus, the ordered pair which is a solution of the system is (-7, -4).

User Tom Rudge
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