Select The Correct Answer.Each Statement Describes A Transformation Of The Graph Of Y = X Y = X Y = X . Which Statement Correctly Describes The Graph Of Y = X + 7 Y = X + 7 Y = X + 7 ?A. It Is The Graph Of Y = X Y = X Y = X Translated 7 Units To The Right. B. It

Introduction

Graph transformations are a crucial concept in mathematics, particularly in algebra and geometry. They involve changing the position, size, or orientation of a graph to create a new graph. In this article, we will focus on the transformation of the graph of $y = x$ to the graph of $y = x + 7$. We will analyze each statement and determine which one correctly describes the graph of $y = x + 7$.

Understanding the Graph of $y = x$

The graph of $y = x$ is a straight line that passes through the origin (0, 0) and has a slope of 1. It is a simple and fundamental graph in mathematics, and it serves as a reference point for various transformations.

The Transformation: $y = x + 7$

The graph of $y = x + 7$ is a transformation of the graph of $y = x$. To understand this transformation, let's break it down:

• The equation $y = x + 7$ can be rewritten as $y - 7 = x$. This means that the graph of $y = x + 7$ is the same as the graph of $y = x$, but shifted 7 units upwards.
• The graph of $y = x$ has a slope of 1, and the graph of $y = x + 7$ also has a slope of 1. This means that the transformation does not change the slope of the graph.
• The graph of $y = x + 7$ passes through the point (0, 7), which is 7 units above the origin.

Analyzing the Statements

Now that we have a clear understanding of the transformation, let's analyze each statement:

• A. It is the graph of $y = x$ translated 7 units to the right. This statement is incorrect because the graph of $y = x + 7$ is not translated to the right; it is translated upwards.
• B. It is the graph of $y = x$ translated 7 units upwards. This statement is correct because the graph of $y = x + 7$ is indeed the graph of $y = x$, but shifted 7 units upwards.

Conclusion

In conclusion, the correct statement that describes the graph of $y = x + 7$ is:

• B. It is the graph of $y = x$ translated 7 units upwards.

This statement accurately describes the transformation of the graph of $y = x$ to the graph of $y = x + 7$. The graph of $y = x + 7$ is the same as the graph of $y = x$, but shifted 7 units upwards.

Key Takeaways

• Graph transformations involve changing the position, size, or orientation of a graph.
• The graph of $y = x + 7$ is a transformation of the graph of $y = x$.
• The graph of $y = x + 7$ is the same as the graph of $y = x$, but shifted 7 units upwards.

Further Reading

For more information on graph transformations, we recommend the following resources:

• Khan Academy: Graphing Lines
• Math Is Fun: Graphing Lines
• Purplemath: Graphing Lines

Introduction

Graph transformations are a crucial concept in mathematics, particularly in algebra and geometry. In our previous article, we discussed the transformation of the graph of $y = x$ to the graph of $y = x + 7$. In this article, we will provide a Q&A guide to help you better understand graph transformations.

Q: What is a graph transformation?

A: A graph transformation is a change in the position, size, or orientation of a graph. It involves shifting, scaling, or reflecting a graph to create a new graph.

Q: What are the different types of graph transformations?

A: There are several types of graph transformations, including:

• Translation: Shifting a graph horizontally or vertically.
• Scaling: Changing the size of a graph.
• Reflection: Flipping a graph over a line or axis.
• Rotation: Rotating a graph around a point.

Q: How do I perform a translation on a graph?

A: To perform a translation on a graph, you need to add or subtract a value from the x or y coordinate of each point on the graph. For example, to translate the graph of $y = x$ 3 units to the right, you would replace $x$ with $x - 3$.

Q: How do I perform a scaling on a graph?

A: To perform a scaling on a graph, you need to multiply or divide the x or y coordinate of each point on the graph by a value. For example, to scale the graph of $y = x$ by a factor of 2, you would replace $x$ with $2x$.

Q: How do I perform a reflection on a graph?

A: To perform a reflection on a graph, you need to flip the graph over a line or axis. For example, to reflect the graph of $y = x$ over the x-axis, you would replace $y$ with $-y$.

Q: How do I perform a rotation on a graph?

A: To perform a rotation on a graph, you need to rotate the graph around a point. For example, to rotate the graph of $y = x$ 90 degrees clockwise around the origin, you would replace $x$ with $y$ and $y$ with $-x$.

Q: What are some common graph transformations?

A: Some common graph transformations include:

• Shifting a graph up or down: Adding or subtracting a value from the y coordinate of each point on the graph.
• Shifting a graph left or right: Adding or subtracting a value from the x coordinate of each point on the graph.
• Scaling a graph: Multiplying or dividing the x or y coordinate of each point on the graph by a value.
• Reflecting a graph over a line or axis: Flipping the graph over a line or axis.

Q: How do I determine the type of graph transformation?

A: To determine the type of graph transformation, you need to analyze the equation of the graph. Look for keywords such as "add," "subtract," "multiply," or "divide" to determine the type of transformation.

Conclusion

In conclusion, graph transformations are a crucial concept in mathematics. By understanding the different types of graph transformations, you can better analyze and solve mathematical problems involving graphs. Remember to practice and review graph transformations to become more confident in your abilities.

Key Takeaways

• Graph transformations involve changing the position, size, or orientation of a graph.
• There are several types of graph transformations, including translation, scaling, reflection, and rotation.
• To perform a graph transformation, you need to analyze the equation of the graph and determine the type of transformation.

Further Reading

For more information on graph transformations, we recommend the following resources:

• Khan Academy: Graphing Lines
• Math Is Fun: Graphing Lines
• Purplemath: Graphing Lines

By practicing and reviewing graph transformations, you can become more confident in your abilities and better analyze and solve mathematical problems involving graphs.