Things that i learned from this activity are that even functions have symmetry across the y axis while odd functions have symmetry across the x axis. I also learned that just because it is a function that it does not have to be an even or odd it can be neither. They are different in the way that if f is an even function then f(-x) = f(x) while, if g is an odd function then f(-x) = -f(x) . to determine if a function y=f(x) is even, odd or neither Replace x with -x and compare the result to f(x). If f(-x) = f(x), the function is even. If f(-x) = - f(x), the function is odd. After doing this assignment i learned that their can be functions that can be neither but now i wonder if a function can be both odd and even.
This graph represents a exponential function. The domain of this exponential function would be all real numbers while the range of this function would be y>0. The problem with this graph going forever is evenetualy the sales will level off. So the graph will not continue to grow at the rate it is.
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AuthorWrite something about yourself. No need to be fancy, just an overview. Archives
February 2016
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