One way to talk about functions precisely and without wordy descriptions is by naming the functions and using [b]function notation[/b].[br][br]• Suppose we give a name to each function that relates the dog’s distance from the post and the time since the dog owner left: function f for Day 1, function g for Day 2, function h for Day 3. The input of each function is time in seconds, t. [br][br]• To represent “the distance of the dog from the post 60 seconds after the owner left,” we can simply write: f(60) - read "f of 60". To express the same quantity for the second and third day, we can write g(60) - read "g of 60" and h(60) - read "h of 60". [br][br]• f(60) does not simply that 60 seconds have passed, but instead the expression [b]f(60) represents the [u][i]output[/i] [i]value[/i][/u] [/b]of the function when 60 seconds have passed. In this case, it means the dog’s distance from the post, on Day 1, 60 seconds after its owner left.
Let’s name the functions that relate the dog’s distance from the post and the time since its owner left: function f for Day 1, function g for Day 2, function h for Day 3. The input of each function is time in seconds, t.[br][br]Use function notation to complete the table below.[br]
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[/img]
Describe what each expression represents in this context:[br][br]a. f(15) - read as "f of 15"[br][br]b. g(48) - read as "g of 48"[br][br]c. h(t) - read as "h of t"
a. f(15) is the distance from the post 15 seconds after the owner left on Day 1.[br][br]b. g(48) is the distance from the post 48 seconds after the owner left on Day 2.[br][br]c. h(t) is the distance from the post t seconds after the owner left on Day 3.
The equation g(120) = 4 can be interpreted to mean: “On Day 2, 120 seconds after the dog owner left, the dog was 4 feet from the post.” [br] [br]What does each equation mean in this situation?[br][br]a. h(40) = 4.6 - read as "h of 40 equals 4.6"[br][br]b. f(t) = 5 - read as "f of t equals 5"[br][br]c. g(t) = d - read as "g of t equals d"[br]
a. h(40) = 4.6, on the third day, 40 seconds after the owner left, the dog was 4.6 feet away from the post.[br][br]b. f(t) = 5, on the first day, t seconds after the owner left, the dog was 5 feet away from the post.[br][br]c. g(t) = d, on the second day, t seconds after the owner left, the dog was d feet away from the post.