The mode of a certain frequency y = f (x) is attainedf at (x) = 9.1 and the values of the frequency function f (x) for x = 8.9, 9.0 and 9.0 and 9.3 are respectively equal to 0.30, 0.35, 0.25. Calculate the approximate value of f (x) at the made.
The mode of a certain frequency y = f (x) is attainedf at (x) = 9.1 and the values of the frequency function f (x) for x = 8.9, 9.0 and 9.0 and 9.3 are respectively equal to 0.30, 0.35, 0.25. Calculate the approximate value of f (x) at the made.
The mode of a certain frequency y = f (x) is attainedf at (x) = 9.1 and the values of the frequency function f (x) for x = 8.9, 9.0 and 9.0 and 9.3 are respectively equal to 0.30, 0.35, 0.25. Calculate the approximate value of f (x) at the made.
The mode of a certain frequency y = f (x) is attainedf at (x) = 9.1 and the values of the frequency function f (x) for x = 8.9, 9.0 and 9.0 and 9.3 are respectively equal to 0.30, 0.35, 0.25. Calculate the approximate value of f (x) at the made.
Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.
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