reflection
(noun)
Mirror image of a function.
Examples of reflection in the following topics:
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Reflections
- Reflections produce a mirror image of a function.
- A vertical reflection is a reflection across the $x$-axis, given by the equation:
- A horizontal reflection is a reflection across the $y$-axis, given by the equation:
- The third type of reflection is a reflection across a line.
- The reflected equation, as reflected across the line $y=x$, would then be:
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Symmetry of Functions
- They can have symmetry after a reflection.
- The image below shows an example of a function and its symmetry over the $x$-axis (vertical reflection) and over the $y$-axis (horizontal reflection).
- The points given, $(1,3)$ and $(-1,-3)$ are reflected across the origin.
- The graph above has symmetry since the points labeled are reflected over the origin.
- A function can have symmetry by reflecting its graph horizontally or vertically.
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Transformations of Functions
- The four main types of transformations are translations, reflections, rotations, and scaling.
- A reflection of a function causes the graph to appear as a mirror image of the original function.
- Therefore, we can say that $f(-x)$ is a reflection of $f(x)$ across the $y$-axis.
- Differentiate between three common types of transformations: reflections, rotations, and scaling
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Parabolas As Conic Sections
- Parabolas have the property that, if they are made of material that reflects light, then light which enters a parabola traveling parallel to its axis of symmetry is reflected to its focus.
- This happens regardless of where on the parabola the reflection occurs.
- Conversely, light that originates from a point source at the focus is reflected, or collimated, into a parallel beam.
- This reflective property is the basis of many practical uses of parabolas.
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Inverse Trigonometric Functions
- Each graph of the inverse trigonometric function is a reflection of the graph of the original function about the line $y = x$.
- The arctangent function is a reflection of the tangent function about the line $y = x$.
- The arcsine function is a reflection of the sine function about the line $y = x$.
- The arccosine function is a reflection of the cosine function about the line $y = x$.
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Introduction to Inverse Functions
- This is equivalent to reflecting the graph across the line $y=x$, an increasing diagonal line through the origin.
- The black line represents the line of reflection, in which is $y=x$.
- The function graph (red) and its inverse function graph (blue) are reflected about the line $y=x$ (dotted black line).
- For example, $(0,1)$ on the red (function) curve is reflected over the line $y=x$ and becomes $(1,0)$ on the blue (inverse function) curve.
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Complex Conjugates and Division
- Geometrically, z* is the "reflection" of z about the real axis (as shown in the figure below).
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Introduction to Exponential and Logarithmic Functions
- The graph of the logarithm function $log_b(x)$ (blue) is obtained by reflecting the graph of the function $b(x)$ (red) at the diagonal line ($x=y$).
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Applications of the Parabola
- One well-known example is the parabolic reflector—a mirror or similar reflective device that concentrates light or other forms of electromagnetic radiation to a common focal point.
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Fitting a Curve
- Extrapolation refers to the use of a fitted curve beyond the range of the observed data, and is subject to a greater degree of uncertainty since it may reflect the method used to construct the curve as much as it reflects the observed data.