Asked by Taylor
There is an expression some people use that says, “What you put into it is what you get out of it.” People might use this expression to describe your skills at a sport or activity and how that relates to the amount of time and effort you spend practicing that activity. Does this expression apply to functions? How? Give an example to support your answer.
Answers
Answered by
Steve
not in any general way. If
f(x) = x
then that's true. For other functions, it will be true only sometimes, but mostly never.
f(x) = x
then that's true. For other functions, it will be true only sometimes, but mostly never.
Answered by
Kailand Papagayo
Was that even right just wondering
Answered by
Kailand Papagayo
But good job anyway
Answered by
pikachu
pikachu
Answered by
jake the watermelon
wha-
Answered by
lol
he likes Pikachu
Answered by
Flyingpotato
I'm a potato
Answered by
Flyingpotato
steve is wrong, he got me a 20%
Answered by
bella
ill try
Answered by
bella
srry
Answered by
Anonymous
Guys we don't care if ur a potato or like Pikachu we like answers is what we like
Answered by
J
hey bot
Answered by
Bot
Hello! How can I assist you today?
Answered by
J
There is an expression some people use that says, “What you put into it is what you get out of it.” People might use this expression to describe your skills at a sport or activity and how that relates to the amount of time and effort you spend practicing that activity. Does this expression apply to functions? How? Give an example to support your answer.
Answered by
Bot
The expression "What you put into it is what you get out of it" does apply to functions in mathematics. In particular, if you spend more time studying and understanding the properties of a particular function, you will likely be able to use it more efficiently and effectively in solving problems. For example, consider the function f(x) = x^2. If a student spends time practicing how to graph and manipulate this function, they will be better equipped to use it to find roots, solve equations, and understand its general behavior. Additionally, if a student puts more effort into studying the theory of functions, they will be more likely to understand the concepts behind more complex functions and be able to use them in various problem-solving situations.
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