QUESTION IMAGE
Question
this is the graph of the equation $y = \frac{6}{5}x$.
which ordered pairs are solutions to the equation? select all that apply.
Since the specific ordered pairs to choose from are not provided, we can explain the general method to determine if an ordered pair \((x,y)\) is a solution to the equation \(y = \frac{6}{5}x\):
Step 1: Recall the definition of a solution to a linear equation
An ordered pair \((x,y)\) is a solution to the equation \(y=\frac{6}{5}x\) if when we substitute the value of \(x\) into the right - hand side of the equation and simplify, we get the value of \(y\) in the ordered pair. Mathematically, for an ordered pair \((x_0,y_0)\), we need to check if \(y_0=\frac{6}{5}x_0\).
Step 2: Example calculation
Suppose we have an ordered pair \((5,6)\). Substitute \(x = 5\) into the equation \(y=\frac{6}{5}x\). Then \(y=\frac{6}{5}\times5=6\), which is equal to the \(y\) - value in the ordered pair \((5,6)\). So \((5,6)\) is a solution.
Suppose we have an ordered pair \((- 5,-6)\). Substitute \(x=-5\) into the equation \(y = \frac{6}{5}x\). Then \(y=\frac{6}{5}\times(-5)=-6\), which is equal to the \(y\) - value in the ordered pair \((-5,-6)\). So \((-5,-6)\) is a solution.
Suppose we have an ordered pair \((10,12)\). Substitute \(x = 10\) into the equation \(y=\frac{6}{5}x\). Then \(y=\frac{6}{5}\times10 = 12\), which is equal to the \(y\) - value in the ordered pair \((10,12)\). So \((10,12)\) is a solution.
If you provide the list of ordered pairs, we can check each of them one by one using the above method.
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Since the specific ordered pairs to choose from are not provided, we can explain the general method to determine if an ordered pair \((x,y)\) is a solution to the equation \(y = \frac{6}{5}x\):
Step 1: Recall the definition of a solution to a linear equation
An ordered pair \((x,y)\) is a solution to the equation \(y=\frac{6}{5}x\) if when we substitute the value of \(x\) into the right - hand side of the equation and simplify, we get the value of \(y\) in the ordered pair. Mathematically, for an ordered pair \((x_0,y_0)\), we need to check if \(y_0=\frac{6}{5}x_0\).
Step 2: Example calculation
Suppose we have an ordered pair \((5,6)\). Substitute \(x = 5\) into the equation \(y=\frac{6}{5}x\). Then \(y=\frac{6}{5}\times5=6\), which is equal to the \(y\) - value in the ordered pair \((5,6)\). So \((5,6)\) is a solution.
Suppose we have an ordered pair \((- 5,-6)\). Substitute \(x=-5\) into the equation \(y = \frac{6}{5}x\). Then \(y=\frac{6}{5}\times(-5)=-6\), which is equal to the \(y\) - value in the ordered pair \((-5,-6)\). So \((-5,-6)\) is a solution.
Suppose we have an ordered pair \((10,12)\). Substitute \(x = 10\) into the equation \(y=\frac{6}{5}x\). Then \(y=\frac{6}{5}\times10 = 12\), which is equal to the \(y\) - value in the ordered pair \((10,12)\). So \((10,12)\) is a solution.
If you provide the list of ordered pairs, we can check each of them one by one using the above method.