3 / 4$ Marksa) Complete The Table Of Values For $y=3x+1$${ \begin{tabular}{|c|c|c|c|c|c|c|} \hline $x$ & -2 & -1 & 0 & 1 & 2 & 3 \\ \hline $y$ & -5 & -2 & 1 & 4 & 7 & 10 \\ \hline \end{tabular} \}$b) Draw The Graph Of

Completing the Table of Values for a Linear Equation and Graphing

In this article, we will explore the concept of completing a table of values for a linear equation and graphing the resulting function. We will use the equation $y=3x+1$ as an example and complete the table of values for $x$ values ranging from -2 to 3. We will then use this table to draw the graph of the function.

To complete the table of values, we need to substitute each $x$ value into the equation $y=3x+1$ and calculate the corresponding $y$ value.

Substituting $x$ Values into the Equation

Let's start by substituting the given $x$ values into the equation $y=3x+1$.

• For $x=-2$, we have $y=3(-2)+1=-6+1=-5$.
• For $x=-1$, we have $y=3(-1)+1=-3+1=-2$.
• For $x=0$, we have $y=3(0)+1=0+1=1$.
• For $x=1$, we have $y=3(1)+1=3+1=4$.
• For $x=2$, we have $y=3(2)+1=6+1=7$.
• For $x=3$, we have $y=3(3)+1=9+1=10$.

Completing the Table of Values

Now that we have calculated the corresponding $y$ values, we can complete the table of values as follows:

To graph the function, we can use the completed table of values to plot the points on a coordinate plane.

Plotting the Points

Let's plot the points on the coordinate plane using the completed table of values.

• For $x=-2$ and $y=-5$, we plot the point $(-2,-5)$.
• For $x=-1$ and $y=-2$, we plot the point $(-1,-2)$.
• For $x=0$ and $y=1$, we plot the point $(0,1)$.
• For $x=1$ and $y=4$, we plot the point $(1,4)$.
• For $x=2$ and $y=7$, we plot the point $(2,7)$.
• For $x=3$ and $y=10$, we plot the point $(3,10)$.

Drawing the Graph

Now that we have plotted the points, we can draw the graph of the function by connecting the points with a straight line.

In this article, we completed the table of values for the linear equation $y=3x+1$ and graphed the resulting function. We used the completed table of values to plot the points on a coordinate plane and then drew the graph of the function by connecting the points with a straight line. This demonstrates the importance of completing tables of values and graphing functions in mathematics.

• To complete the table of values for a different linear equation, simply substitute the given $x$ values into the equation and calculate the corresponding $y$ values.
• To graph a different function, use the completed table of values to plot the points on a coordinate plane and then draw the graph of the function by connecting the points with a straight line.
• To explore the concept of slope and intercept, use the completed table of values to calculate the slope and intercept of the function.

• For more information on completing tables of values and graphing functions, see the following resources:

• Khan Academy: Completing Tables of Values and Graphing Functions
• Mathway: Completing Tables of Values and Graphing Functions
• Wolfram Alpha: Completing Tables of Values and Graphing Functions
  Completing the Table of Values for a Linear Equation and Graphing: Q&A

In our previous article, we explored the concept of completing a table of values for a linear equation and graphing the resulting function. We used the equation $y=3x+1$ as an example and completed the table of values for $x$ values ranging from -2 to 3. We also graphed the function by plotting the points on a coordinate plane and connecting them with a straight line. In this article, we will answer some frequently asked questions about completing tables of values and graphing functions.

Q: What is the purpose of completing a table of values for a linear equation?

A: The purpose of completing a table of values for a linear equation is to create a set of ordered pairs that represent the function. This allows us to visualize the function and understand its behavior.

Q: How do I complete a table of values for a linear equation?

A: To complete a table of values for a linear equation, simply substitute the given $x$ values into the equation and calculate the corresponding $y$ values.

Q: What is the difference between a table of values and a graph?

A: A table of values is a set of ordered pairs that represent the function, while a graph is a visual representation of the function. A table of values is a more detailed representation of the function, while a graph is a more visual representation.

Q: How do I graph a function using a table of values?

A: To graph a function using a table of values, plot the points on a coordinate plane and connect them with a straight line.

Q: What is the significance of the slope and intercept in a linear equation?

A: The slope and intercept are important components of a linear equation. The slope represents the rate of change of the function, while the intercept represents the point where the function intersects the y-axis.

Q: How do I calculate the slope and intercept of a linear equation?

A: To calculate the slope and intercept of a linear equation, use the following formulas:

• Slope: $m = \frac{y_2 - y_1}{x_2 - x_1}$
• Intercept: $b = y - mx$

Q: What are some common mistakes to avoid when completing tables of values and graphing functions?

A: Some common mistakes to avoid when completing tables of values and graphing functions include:

• Not using a consistent scale for the x and y axes
• Not plotting the points accurately
• Not connecting the points with a straight line
• Not labeling the axes and title of the graph

In this article, we answered some frequently asked questions about completing tables of values and graphing functions. We discussed the purpose of completing a table of values, how to complete a table of values, and how to graph a function using a table of values. We also covered the significance of the slope and intercept in a linear equation and how to calculate them. By following these tips and avoiding common mistakes, you can create accurate and informative tables of values and graphs.

• To complete the table of values for a different linear equation, simply substitute the given $x$ values into the equation and calculate the corresponding $y$ values.
• To graph a different function, use the completed table of values to plot the points on a coordinate plane and then draw the graph of the function by connecting the points with a straight line.
• To explore the concept of slope and intercept, use the completed table of values to calculate the slope and intercept of the function.

• For more information on completing tables of values and graphing functions, see the following resources:

• Khan Academy: Completing Tables of Values and Graphing Functions
• Mathway: Completing Tables of Values and Graphing Functions
• Wolfram Alpha: Completing Tables of Values and Graphing Functions