1. Home
  2. >Intermediate Algebra
  3. >Exponential Functions
Help

Graphing transformations of exponential functions

Everything You Need in One Place

Homework problems? Exam preparation? Trying to grasp a concept or just brushing up the basics? Our extensive help & practice library have got you covered.

Learn and Practice With Ease

Our proven video lessons ease you through problems quickly, and you get tonnes of friendly practice on questions that trip students up on tests and finals.

Instant and Unlimited Help

Our personalized learning platform enables you to instantly find the exact walkthrough to your specific type of question. Activate unlimited help now!

0/6
?
Examples
Lessons
  1. Horizontal Translation of an Exponential Function
    Sketch and compare the graphs of the exponential function y=2xy=2^x and
    i)
    y=2(x+1)y=2^{(x+1)}
    ii)
    y=2(x2)y=2^{(x-2)}

    Did the transformation affect the horizontal asymptote?
    1. Vertical Translation of an Exponential Function
      Sketch and compare the graphs of the exponential function y=2xy=2^x and
      i)
      y=2x+1y=2^x+1
      ii)
      y=2x2y=2^x-2

      Did the transformation affect the horizontal asymptote?
      1. Expansion/Compression of an Exponential Function
        Sketch and compare the graphs of the exponential function y=2xy=2^x and
        i)
        y=23xy=2^{3x} and y=212xy=2^{\frac{1}{2}x}
        ii)
        y=32xy=3 \cdot 2^x and y=122xy=\frac{1}{2} \cdot 2^x

        1. Reflection of an Exponential Function
          Sketch and compare the graphs of the exponential function y=2xy=2^x and
          i)
          y=2xy=2^{-x}
          ii)
          y=2xy=-2^x

          1. Multiple Transformation
            Compare to y=2xy=2^x,
            i)
            Describe the transformations involved in y=62(x+1)3y=6 \cdot 2^{(x+1)}-3.
            ii)
            Sketch both exponential functions on the same graph.
            iii)
            For y=62(x+1)3y=6 \cdot 2^{(x+1)}-3, state its
            - asymptote
            - domain
            - range
            - x-intercept
            - y-intercept
            1. Compare to y=2xy=2^x,
              i)
              Describe the transformations involved in y=32(x2)+6y=-3 \cdot 2^{(x-2)}+6.
              ii)
              Sketch both exponential functions on the same graph.
              iii)
              For y=32(x2)+6y=-3 \cdot 2^{(x-2)}+6, state its
              - asymptote
              - domain
              - range
              - x-intercept
              - y-intercept
              Topic Notes
              ?
              Do you know how to sketch and state transformations of exponential functions graphs? How about applying transformations to exponential functions including, horizontal shift, vertical shift, horizontal expansion/compression, vertical expansion/compression, reflection and inverse? You will learn them all in this lesson!
              y=acb(xh)+ky=a \cdot c^{b(x-h)}+k
              a=a = vertical expansion/compression
              b=b = horizontal expansion /compression
              h=h = horizontal translation
              k=k = vertical translation
              • Reflection?