MCR3U (1.1) - Relations vs Functions - Grade 11 Functions

AllThingsMathematics
19 Aug 201808:46

Summary

TLDRIn this educational video, Patrick explores the concept of functions by examining various mathematical relations to determine if they qualify as functions. He explains the vertical line test, a method to verify if a relation is a function by ensuring no vertical line intersects the graph at more than one point. Patrick covers linear equations, circles, parabolas, and a sideways parabola, demonstrating through examples and graphical illustrations how each relation either passes or fails the test. The video is a comprehensive guide for understanding the properties of functions in algebra.

Takeaways

  • 📐 The video discusses how to determine if different relations are functions or not.
  • ✅ The relation y = 3 - x is a function because it passes the vertical line test, indicating a unique y for each x.
  • ⛔ A vertical line, such as x = 4, is not a function as it fails the vertical line test, having multiple y values for the same x.
  • đŸ”” The equation x^2 + y^2 = 16 represents a circle and is not a function because it does not pass the vertical line test, having two y values for each x.
  • 📉 The parabola y = x^2 - x - 6 is a function as it passes the vertical line test, with a unique y for each x, and opens upwards due to the positive leading coefficient.
  • 🔄 The relation x = y^2 - 1, when rearranged to y = ±√(x + 1), is not a function because it fails the vertical line test, having two y values for each x greater than or equal to -1.
  • 📊 The video emphasizes the importance of graphing relations to visually confirm whether they are functions by applying the vertical line test.
  • 📋 The script reviews the general forms of lines, circles, and parabolas, and how their properties relate to the vertical line test.
  • đŸš« A sideways parabola, like the one in the fourth example, is not a function because it has multiple y values for the same x.
  • 📘 The video suggests that if unsure, one should review how to graph different types of functions from previous math courses to better understand and apply the vertical line test.

Q & A

  • What is the relation described by the equation y = 3 - x?

    -The relation described by the equation y = 3 - x is a linear function. It represents a straight line with a slope of -1 and a y-intercept of 3.

  • How can you determine if the line y = 3 - x is a function?

    -You can determine if y = 3 - x is a function by applying the vertical line test. Since no vertical line intersects the graph of this equation more than once, it passes the test and is indeed a function.

  • Why is a vertical line not considered a function?

    -A vertical line is not considered a function because it fails the vertical line test. There are multiple points on the line that can be intersected by a single vertical line, indicating that there are multiple y-values for a single x-value.

  • What type of geometric shape does the equation x^2 + y^2 = 16 represent?

    -The equation x^2 + y^2 = 16 represents a circle with a radius of 4 units, centered at the origin of a Cartesian coordinate system.

  • Why does the circle defined by x^2 + y^2 = 16 fail the vertical line test?

    -The circle defined by x^2 + y^2 = 16 fails the vertical line test because for any given x-value, there are two corresponding y-values (one positive and one negative), indicating that it is not a function.

  • What is the relation represented by the equation y = x^2 - x - 6?

    -The relation represented by the equation y = x^2 - x - 6 is a quadratic function, which graphs as a parabola. It factors into (x - 3)(x + 2), indicating x-intercepts at x = 3 and x = -2.

  • Is the parabola y = x^2 - x - 6 a function? How do you know?

    -Yes, the parabola y = x^2 - x - 6 is a function. It passes the vertical line test because for any given x-value, there is only one corresponding y-value.

  • What is the equation x = y^2 - 1 transformed into when solved for y?

    -When the equation x = y^2 - 1 is solved for y, it becomes y = ±√(x + 1). This transformation indicates that y is defined for all x values greater than or equal to -1.

  • Why does the graph of x = y^2 - 1 fail the vertical line test?

    -The graph of x = y^2 - 1 fails the vertical line test because for certain x-values, there are two possible y-values (one positive and one negative), which means there are multiple y-values for a single x-value.

  • What is the key difference between a function and a non-function in terms of the vertical line test?

    -The key difference is that a function will pass the vertical line test, meaning that no vertical line will intersect the graph of the function more than once. A non-function will fail this test, as there will be at least one vertical line that intersects the graph at more than one point.

  • What general rule can be applied to determine if a line is a function?

    -The general rule is that any line that is not vertical is a function because it will pass the vertical line test. A vertical line, on the other hand, is not a function as it fails the test.

Outlines

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Mindmap

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Keywords

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Highlights

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Transcripts

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FunctionsVertical Line TestGraphingMath TutorialEducational ContentPatrick's VideoAlgebraGeometryX and Y ValuesMathematics
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