I’ve been to the mountaintop... …and I’ve seen… Twelve Basic Functions Homework: p. 109-110 1-12 all, 13-27 odd.

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Presentation transcript:

I’ve been to the mountaintop... …and I’ve seen… Twelve Basic Functions Homework: p all, odd

We will study these “basic” functions in much more depth throughout the year – here, we are just introducing them… (and in particular, their graphs)

The Identity Function: Interesting facts: This is the only function that acts on every real number by leaving it alone.

The Squaring Function: Interesting facts: The graph of this function, called a parabola, has a reflection property that is useful in making flashlights and satellite dishes.

The Cubing Function: Interesting facts: The origin is called a “point of inflection” for this curve because the graph changes curvature at that point.

The Reciprocal Function: Interesting facts: This curve, called a hyperbola, also has a reflection property that is useful in satellite dishes.

The Square Root Function: Interesting facts: Put any positive number into your calculator. Take the square root. Continue to take the square root, and eventually you will always get 1.

The Exponential Function: Interesting facts: The number e is an irrational number (like pi) that shows up in a variety of applications. (0, 1)

The Natural Logarithm Function: Interesting facts: This function increases very slowly. If the x-axis and y-axis were both scaled with unit lengths of one inch, you would have to travel more than two and a half miles along the curve just to get a foot above the x-axis. (1, 0)

The Sine Function: Interesting facts: This function and the sinus cavities in your head derive their names from a common root: the Latin word for “bay.”

The Cosine Function: Interesting facts: The local extrema of the cosine function occur exactly at the zeros of the sine function, and vice versa.

The Absolute Value Function: Interesting facts: This function has an abrupt change of direction (a “corner”) at the origin, while our other functions are all “smooth” on their domains.

The Greatest Integer Function: Interesting facts: This function has a jump discontinuity at every integer value of x. Similar-looking functions are called step functions. 123–1–2 –1 1 2

The Logistic Function: Interesting facts: There are two horizontal asymptotes, the x-axis and the line y = 1. This function provides a model for many applications in biology and business. 1 (0, ½)

Identity Squaring Cubing Recip. Square Root Expon. Nat. Log. Sine Cosine Abs. Val. Greatest Integer Logistic Which of the twelve basic functions: Are bounded above?

Identity Squaring Cubing Recip. Square Root Expon. Nat. Log. Sine Cosine Abs. Val. Greatest Integer Logistic Which of the twelve basic functions: Are increasing on their entire domain?

Identity Squaring Cubing Recip. Square Root Expon. Nat. Log. Sine Cosine Abs. Val. Greatest Integer Logistic Which of the twelve basic functions: Have infinitely many local extrema?

Identity Squaring Cubing Recip. Square Root Expon. Nat. Log. Sine Cosine Abs. Val. Greatest Integer Logistic Which of the twelve basic functions: Have a range of all real numbers?

Identity Squaring Cubing Recip. Square Root Expon. Nat. Log. Sine Cosine Abs. Val. Greatest Integer Logistic Which of the twelve basic functions: Have end behavior ?

Identity Squaring Cubing Recip. Square Root Expon. Nat. Log. Sine Cosine Abs. Val. Greatest Integer Logistic Which of the twelve basic functions: Have graphs that are identical except for a horizontal shift?