# Area Bounded by the Parabola x = 2 + y - y^2 and the y-axis | Summary and Q&A

5.4K views
July 3, 2022
by
The Math Sorcerer
Area Bounded by the Parabola x = 2 + y - y^2 and the y-axis

## TL;DR

This video explains how to find the area of the region bounded by a curve and the y-axis using calculus.

## Key Insights

• 🎁 The problem presented is from a vintage calculus book written by H.B. Phillips in 1917.
• 📔 The book offers unique and interesting problems not typically found in modern math textbooks.
• 😥 Graphing the curve and solving the equation helps determine the shape and points of intersection.
• 😫 The area of the region can be found by setting up and evaluating an integral.
• 🎮 The video provides a step-by-step solution to the problem, demonstrating problem-solving techniques in calculus.
• 📔 The answer obtained matches the one given in the book, validating the solution.
• 👾 The video emphasizes that the problem could take longer if solved at a slower pace.

## Transcript

hello in this problem we're going to find the area bounded by the curve x equals 2 plus y minus y squared and the y axis this problem is from a very old book which i believe is out of print the book was written in 1917 the author was h.b phillips he was an assistant professor at the massachusetts institute of technology and the book is called integ... Read More

### Q: How is the curve graphed to determine its shape and orientation?

The curve is graphed by understanding the behavior of the equation. Since there is a negative sign in front of the y^2 term, the curve opens to the left. Plotting key points and connecting them will give an approximation of the curve.

### Q: How are the points of intersection with the y-axis found?

To find the points of intersection, the equation is set equal to zero. Solving the quadratic equation by factoring or using the quadratic formula gives the y-values where the curve intersects the y-axis.

### Q: How is the integral set up to find the area of the region?

The integral is set up as the difference between the right curve (x = 2 + y - y^2) and the left curve (x = 0). Integrating the difference of the two curves with respect to y will give the area of the region.

### Q: What is the significance of finding the area of the region in this problem?

Finding the area of the region bounded by a curve and the y-axis allows for the calculation of enclosed areas, which can have applications in various fields such as physics, engineering, and economics.

## Summary & Key Takeaways

• The video discusses a problem from an old calculus book, where the goal is to find the area bounded by the curve x = 2 + y - y^2 and the y-axis.

• The problem requires graphing the curve and determining the points of intersection with the y-axis.

• By setting up the integral and evaluating it, the video demonstrates how to find the area of the region.