Lingkaran Bagian 2 - Kedudukan Titik Terhadap Lingkaran Matematika Peminatan Kelas XI

m4th-lab

1 Nov 202010:29

Summary

TLDRIn this video, Deni Handayani explains the concept of the position of a point relative to a circle, covering three possibilities: inside, on, or outside the circle. The video also demonstrates how to use substitution to determine a point's location by comparing values derived from the circle's equation. Several examples, including solving related equations, are provided to illustrate these concepts. Viewers are encouraged to check the first part of the series for additional background and to explore the exercises provided in the video's description.

Takeaways

📚 The video is a continuation of the previous lesson about circles, focusing on the position of points relative to the circle.
⭕ There are three possible positions for a point relative to a circle: inside, on, or outside the circle.
📉 To determine the position of a point relative to a circle, you can substitute the coordinates of the point into the circle's equation.
📏 If the result is less than the square of the radius, the point is inside the circle.
⚖️ If the result equals the square of the radius, the point is on the circle.
📈 If the result is greater than the square of the radius, the point is outside the circle.
🔍 An example is given with a circle centered at (0, 0) and an equation of x² + y² = 25, with three points tested for their positions relative to the circle.
📝 A second example discusses a problem from a past exam where a point is determined to be outside the circle based on its coordinates.
💡 The video also touches on quadratic inequalities to find the possible values for 'a' when a point is outside a circle.
📖 The speaker encourages viewers to practice by solving additional example problems provided in the video description.

Q & A

What are the three possible positions of a point relative to a circle?
-The three possible positions are: 1) the point lies inside the circle, 2) the point lies on the circle, and 3) the point lies outside the circle.
How do you determine if a point lies inside a circle?
-Substitute the point's coordinates into the equation of the circle. If the result is less than the square of the circle's radius, the point lies inside the circle.
What happens when a point lies on the circle?
-If the point's coordinates, when substituted into the circle's equation, equal the square of the radius, the point lies on the circle.
How do you know if a point is outside the circle?
-Substitute the point's coordinates into the circle's equation. If the result is greater than the square of the radius, the point lies outside the circle.
What is the equation of a circle centered at the origin (0, 0)?
-The equation of a circle centered at the origin is x² + y² = r², where r is the radius of the circle.
How do you apply the method to a circle centered at (a, b)?
-For a circle centered at (a, b), the equation is (x - a)² + (y - b)² = r². The method is the same: substitute the coordinates of the point into the equation to determine its position relative to the circle.
What does it mean when the result of the substitution is equal to the radius squared?
-It means the point lies exactly on the circle.
Can this method be used for circles in general form?
-Yes, the same method applies. Substitute the coordinates of the point into the general form of the circle equation and compare the result with the radius squared.
In the example given in the video, where does the point (-2, 4) lie with respect to the circle x² + y² = 25?
-After substituting (-2, 4) into the equation, the result is 20, which is less than 25. Therefore, the point lies inside the circle.
How can the position of point (5, -1) be determined relative to the same circle?
-By substituting (5, -1) into the equation, the result is 26, which is greater than 25, indicating that the point lies outside the circle.