Determine whether the equation represents y as a function of x

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The equation X^2 + y = 8 can be rearranged to y = 8 - x^2, indicating that y is expressed in terms of x. This shows that y is indeed a function of x, as each x-value corresponds to one unique y-value. The confusion arises from misunderstanding the definition of a function, which requires that for each input there is exactly one output. The additional steps taken in the discussion do not contribute to determining the function status and are seen as unnecessary. Ultimately, y = -x^2 + 8 confirms that it is a function.
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1. X^2 + y = 8



Homework Equations





3. my steps:
y = 8 - x^2
x^2 = 8 - y

(8-y) + y = 8

Not a function.
My logic is, because the equation does not equal y, it is not a function

Please show me step by step the right answer, and preferably the reason why.
 
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You already had it in the first step. And it just gets crazy after that. If you don't know why, I think you should look up the definition of 'function' and tell us what it is.
 
Oh. It's not a function because y = -x^2 + 8 ?
 
Please assist me in my retardation. :( It is immensely painful.
 
Psichlohomeo said:
Oh. It's not a function because y = -x^2 + 8 ?

Exactly wrong. y IS a function of x because y=(-x^2)+8. I'm going to ask you once more to look up the definition of a 'function'. Post it here for further discussion.
 
Psichlohomeo said:
3. my steps:
y = 8 - x^2
x^2 = 8 - y
The two equations above are equivalent to the one you started with, but as Dick already said, you had what you need in the first one above, and the one after that is just wasted motion.
Psichlohomeo said:
(8-y) + y = 8
Now this one is always true, but is completely unrelated to the equation you started with and the two above.
 

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