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Horizontal shift

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Algebra and Trigonometry

Definition

A horizontal shift is a transformation that moves a graph left or right along the x-axis without changing its shape. It is represented by modifying the function as $f(x) \rightarrow f(x - h)$, where $h$ is the number of units shifted.

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5 Must Know Facts For Your Next Test

  1. If $h > 0$, the graph shifts to the right by $h$ units.
  2. If $h < 0$, the graph shifts to the left by $|h|$ units.
  3. Horizontal shifts do not affect the vertical position of key points on the graph.
  4. The equation for horizontal shift in exponential functions is $a \cdot b^{(x-h)}$.
  5. In trigonometric functions, such as sine and cosine, horizontal shifts change the phase of the wave.

Review Questions

  • How does a positive value of $h$ affect a function’s graph in a horizontal shift?
  • What transformation occurs if you replace $x$ with $(x + 3)$ in a function?
  • Explain how horizontal shifts impact periodic functions like sine and cosine.
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