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Lesson 35: y= ln (x). Warm Up Preview:. Graph the following on calc…. Use the window x[-1,2] and y [0,5] Notices the relative position of each graph Less than zero, at zero, greater than zero. Properties of y=e x and its inverse. Always increasing One to one (inverse exists)
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Graph the following on calc…. • Use the window x[-1,2] and y [0,5] • Notices the relative position of each graph • Less than zero, at zero, greater than zero
Properties of y=exand its inverse • Always increasing • One to one (inverse exists) • Inverse of y=ex defined as y=ln(x) • . • Key points of y=ex are (0,1), (1, e), (2, e2) • What would the key points of y=ln(x) be? • Use the domain and range of y=ex to find the domain and range for its inverse (y=ln(x))
Graphing y=ln(x) • Graph of ln(x) is constantly increasing and concave down. • Let’s compare the graphs for y=ex and y=ln(x) • Use the 3 key points to graph each • Vertical Asymptote at x=0
Example Graph: • Where is the vertical asymptote?
Example 2: Graph • First of all, what unique thing will happen with this graph? • There will be a y-axis reflection
Y-axis reflection • Comparison of y=ex and y=e-x • Comparison of y=ln(x) andy=ln(-x)
