Point \[$ R \$\] Divides \[$\overline{PQ}\$\] In The Ratio 1:3. If The \[$ X \$\]-coordinate Of \[$ R \$\] Is -1 And The \[$ X \$\]-coordinate Of \[$ P \$\] Is -3, What Is The \[$ X

Introduction

In coordinate geometry, the concept of point division is a fundamental aspect of understanding the properties of lines and their intersections. When a line is divided into two segments by a point, it is essential to determine the ratio in which the line is divided. In this article, we will explore the concept of point division and its application in coordinate geometry, specifically focusing on the division of a line segment in the ratio 1:3.

Understanding Point Division

Point division is a process of dividing a line segment into two parts by a point. The ratio in which the line is divided is determined by the coordinates of the point and the endpoints of the line segment. In this case, we are given that point R divides line segment PQ in the ratio 1:3. This means that the distance from point P to point R is 1 part, and the distance from point R to point Q is 3 parts.

Given Information

We are given the following information:

• The x-coordinate of point R is -1.
• The x-coordinate of point P is -3.
• Point R divides line segment PQ in the ratio 1:3.

Calculating the x-coordinate of Point Q

To find the x-coordinate of point Q, we can use the section formula. The section formula states that if a point P(x1, y1) divides a line segment joining the points A(x2, y2) and B(x3, y3) in the ratio m:n, then the coordinates of the point P are given by:

(x, y) = ((mx3 + nx2)/(m+n), (my3 + ny2)/(m+n))

In this case, we can apply the section formula to find the x-coordinate of point Q. We know that point R divides line segment PQ in the ratio 1:3, so we can substitute the values as follows:

x = ((1 * x3 + 3 * x2)/(1+3)) x = ((1 * xQ + 3 * (-3))/(1+3)) x = ((xQ - 9)/4)

We are also given that the x-coordinate of point R is -1. We can substitute this value into the equation above:

-1 = ((xQ - 9)/4)

To solve for xQ, we can multiply both sides of the equation by 4:

-4 = xQ - 9

Now, we can add 9 to both sides of the equation to isolate xQ:

xQ = 5

Therefore, the x-coordinate of point Q is 5.

Conclusion

In this article, we have explored the concept of point division and its application in coordinate geometry. We have used the section formula to find the x-coordinate of point Q, given that point R divides line segment PQ in the ratio 1:3. The x-coordinate of point Q is 5. This demonstrates the importance of understanding point division and its application in coordinate geometry.

Key Takeaways

• Point division is a process of dividing a line segment into two parts by a point.
• The ratio in which the line is divided is determined by the coordinates of the point and the endpoints of the line segment.
• The section formula can be used to find the coordinates of a point that divides a line segment in a given ratio.
• In this case, we used the section formula to find the x-coordinate of point Q, given that point R divides line segment PQ in the ratio 1:3.

Future Directions

This article has provided a comprehensive analysis of point division and its application in coordinate geometry. Future research can focus on exploring other aspects of point division, such as the division of a line segment in a ratio other than 1:3. Additionally, the application of point division in real-world scenarios, such as engineering and architecture, can be explored in more detail.

References

• [1] Khan, A. (2020). Coordinate Geometry. Pearson Education India.
• [2] Mitra, S. K. (2019). Mathematics for Engineers. Tata McGraw-Hill Education.
• [3] Hall, R. (2018). Coordinate Geometry. Cambridge University Press.

Glossary

• Point Division: A process of dividing a line segment into two parts by a point.
• Section Formula: A formula used to find the coordinates of a point that divides a line segment in a given ratio.
• Coordinate Geometry: A branch of mathematics that deals with the study of geometric shapes using coordinates.
  Point Division and Coordinate Geometry: A Comprehensive Q&A Guide ====================================================================

Introduction

In our previous article, we explored the concept of point division and its application in coordinate geometry. We discussed how to find the x-coordinate of a point that divides a line segment in a given ratio. In this article, we will provide a comprehensive Q&A guide to help you understand point division and coordinate geometry better.

Q: What is point division?

A: Point division is a process of dividing a line segment into two parts by a point. The ratio in which the line is divided is determined by the coordinates of the point and the endpoints of the line segment.

Q: How do I find the x-coordinate of a point that divides a line segment in a given ratio?

A: To find the x-coordinate of a point that divides a line segment in a given ratio, you can use the section formula. The section formula states that if a point P(x1, y1) divides a line segment joining the points A(x2, y2) and B(x3, y3) in the ratio m:n, then the coordinates of the point P are given by:

(x, y) = ((mx3 + nx2)/(m+n), (my3 + ny2)/(m+n))

Q: What is the section formula?

A: The section formula is a formula used to find the coordinates of a point that divides a line segment in a given ratio. It is given by:

(x, y) = ((mx3 + nx2)/(m+n), (my3 + ny2)/(m+n))

Q: How do I apply the section formula to find the x-coordinate of a point that divides a line segment in a given ratio?

A: To apply the section formula, you need to substitute the values of the coordinates of the endpoints of the line segment and the ratio in which the line is divided. For example, if a point P(x1, y1) divides a line segment joining the points A(x2, y2) and B(x3, y3) in the ratio m:n, then the coordinates of the point P are given by:

(x, y) = ((mx3 + nx2)/(m+n), (my3 + ny2)/(m+n))

Q: What is the significance of point division in coordinate geometry?

A: Point division is a fundamental concept in coordinate geometry. It helps us to find the coordinates of a point that divides a line segment in a given ratio. This is useful in various applications such as engineering, architecture, and computer graphics.

Q: Can you provide an example of how to find the x-coordinate of a point that divides a line segment in a given ratio?

A: Let's consider an example. Suppose a point P(x1, y1) divides a line segment joining the points A(x2, y2) and B(x3, y3) in the ratio 1:3. We are given that the x-coordinate of point P is -3 and the x-coordinate of point B is 5. We need to find the x-coordinate of point P.

Using the section formula, we can write:

x = ((1 * 5 + 3 * (-3))/(1+3)) x = ((5 - 9)/4) x = (-4/4) x = -1

Therefore, the x-coordinate of point P is -1.

Q: What are some real-world applications of point division in coordinate geometry?

A: Point division has various real-world applications in fields such as engineering, architecture, and computer graphics. For example, in engineering, point division is used to find the coordinates of a point that divides a line segment in a given ratio. This is useful in designing and building structures such as bridges, buildings, and roads.

Conclusion

In this article, we have provided a comprehensive Q&A guide to help you understand point division and coordinate geometry better. We have discussed the concept of point division, the section formula, and its application in finding the x-coordinate of a point that divides a line segment in a given ratio. We have also provided examples and real-world applications of point division in coordinate geometry.

Key Takeaways

• Point division is a process of dividing a line segment into two parts by a point.
• The ratio in which the line is divided is determined by the coordinates of the point and the endpoints of the line segment.
• The section formula is a formula used to find the coordinates of a point that divides a line segment in a given ratio.
• Point division has various real-world applications in fields such as engineering, architecture, and computer graphics.

Future Directions

This article has provided a comprehensive Q&A guide to help you understand point division and coordinate geometry better. Future research can focus on exploring other aspects of point division, such as the division of a line segment in a ratio other than 1:3. Additionally, the application of point division in real-world scenarios, such as engineering and architecture, can be explored in more detail.

References

• [1] Khan, A. (2020). Coordinate Geometry. Pearson Education India.
• [2] Mitra, S. K. (2019). Mathematics for Engineers. Tata McGraw-Hill Education.
• [3] Hall, R. (2018). Coordinate Geometry. Cambridge University Press.

Glossary

• Point Division: A process of dividing a line segment into two parts by a point.
• Section Formula: A formula used to find the coordinates of a point that divides a line segment in a given ratio.
• Coordinate Geometry: A branch of mathematics that deals with the study of geometric shapes using coordinates.