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Postado por
Monday
From what I remember it's not considered a polynomial unless the variable exponents are integers, so I believe that is not one.
Well, technically a binomial is a polynomial, so... ;)
Postado por
Jubilee
From what I remember it's not considered a polynomial unless the variable exponents are integers, so I believe that is not one.
Well, technically a binomial is a polynomial, so... ;)
That's not really related to what I said =P
Postado por
Kristopher
Aight, and would something with -(4/p^2) be one as well, then?
Postado por
Monday
From what I remember it's not considered a polynomial unless the variable exponents are integers, so I believe that is not one.
Well, technically a binomial is a polynomial, so... ;)
That's not really related to what I said =P
Well, true.
Shush >.>
But yes, it is a polynomial. Check my top post and Interest's.
E: Kris, the second one is not.
Postado por
Jubilee
Is 4(sqrt x^3) + 12 a polynomial? I have a feeling it is, but I'm not sure...
I believe it is.
From what I remember it's not considered a polynomial unless the variable exponents are integers, so I believe that is not one.
Pretty sure 3 and 0 are integers (12 technically = 12(x ^ 0))
x
is being raised to the 3/2th, which is not an integer.
Postado por
Interest
Is 4(sqrt x^3) + 12 a polynomial? I have a feeling it is, but I'm not sure...
I believe it is.
From what I remember it's not considered a polynomial unless the variable exponents are integers, so I believe that is not one.
Pretty sure 3 and 0 are integers (12 technically = 12(x ^ 0))
x
is being raised to the 3/2th, which is not an integer.
Oh snap. I thought it was x^3.
Didn't see sqrt.
Postado por
Monday
Actually, Jubi, you're right. My bad.
Postado por
Kristopher
Well, true.
Shush >.>
But yes, it is a polynomial. Check my top post and Interest's.
E: Kris, the second one is not.
And the reason for that would be because it ends up being something like p^-2(1/4) right?
Postado por
Jubilee
Kris, the rule is that polynomials can only employ addition, subtraction or multiplication. There cannot be any division by the variables, nor by extension roots of the variables.
Postado por
Interest
Kris, the rule is that polynomials can only employ addition, subtraction or multiplication. There cannot be any division by the variables, nor by extension roots of the variables.
Great. As soon as I read that I thought of prophecy concepts from Sword of Truth.
Postado por
Kristopher
Kris, the rule is that polynomials can only employ addition, subtraction or multiplication. There cannot be any division by the variables, nor by extension roots of the variables.
Well the full thing is 5p^4 + 3.5p -(5/p^2) + 16
we haven't actually been taught what you just told me, I think. We're sposed to look at these set of expressions, tell whether they're polynomials, if so, what degree, and then set em in general form. If they are not, we need to explain why.
Postado por
Monday
Is this math 1040?
Postado por
Kristopher
Algebra II honors.
Postado por
Monday
Ah.
I hated that class >_<
Postado por
Jubilee
Are you using a textbook for your math class? There's a surprisingly high chance that I might have whatever textbook you use, and I might be able to point you to where you could find the answer.
Postado por
Interest
Algebra II honors.
That's it? I see. =)
Postado por
Kristopher
Are you using a textbook for your math class? There's a surprisingly high chance that I might have whatever textbook you use, and I might be able to point you to where you could find the answer.
Discovering Advanced Algebra: an Investigative Approach, I believe.
Algebra II honors.
That's it? I see. =)
What's that supposed to mean?
Postado por
Monday
It's Interest. Even he doesn't know what it means.
Postado por
Jubilee
Are you using a textbook for your math class? There's a surprisingly high chance that I might have whatever textbook you use, and I might be able to point you to where you could find the answer.
Discovering Advanced Algebra: an Investigative Approach, I believe.
Yep I have that one :) I am looking though it now
Postado por
Monday
Legit, Jubi.
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