Confused about what the standard order is?

In summary, the conversation discusses the confusion surrounding the order of terms in writing a polynomial. The first form, with the constant term first, is considered more standard, but some instructors may prefer the second form for easier readability. However, in an online class with automated grading, it is important to adhere to the specified form, even if it seems arbitrary. The conversation also touches on the use of software to check student's homework and the potential drawbacks of multiple choice tests.
  • #1
Tyrion101
166
2
In my previous two math classes I'd get the answer wrong if I put the number first then the variable as my answer. Now in this class this way of doing it is wrong. I'm seriously confused now. For instance the last two classes said that it was standard practice to write an answer like: 3x+4. This class doesn't say it's standard or even that I should write. It as: 4+3x. I'm confused, which is more usually done? I like 3x+4 because to me things are more obvious when written that way, 4+3x doesn't show me anything. I'm going to come out of this class completely confused, and don't know which I should assume would be a right answer?
 
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  • #2
Since ##4+3x = 3x + 4##, there is nothing mathematically wrong with your answer. If your instructor is imposing rules about how the answer must be written, then the only sure way to know what those rules are is to ask him/her.

Based on the data point you have given, I would guess that the instructor wants to see a polynomial written with the terms in ascending order, so for example
$$4 + 5x + 7x^2 + 4x^3$$
would be acceptable but
$$4x^3 + 7x^2 + 5x + 4$$
would not. The second form is more "standard" in the sense that people traditionally write it that way. In the absence of any other considerations, it's probably better to write it in the second form so people will find your work easier to read. However, if your instructor demands the first form, then you have to do that if you don't want to lose points for such an arbitrary reason.

One reason to prefer writing the terms in descending order is that you can immediately see the degree of the polynomial by looking at just the first term. Another is that it is consistent with how we write decimal numbers: the number ##3241## is equal to ##3x^3 + 2x^2 + 4x + 1## where of course ##x=10##.

But again, pragmatism requires that your instructor's demands should trump all other considerations, at least while you are doing work for that course!
 
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  • #3
Well I don't think it's my instructor the is an online class and it could just be that the particular program is set ti read the answer in one way. I'm glad you said something, because I've looked at my answers a few times and have noticed nothing that could be mathematically wrong. Now I could be forgetting parenthesis when doing ordered pairs, but most often it's not. I was just a bit confused, thank you.
 
  • #4
See, this is why people hate math. Because of some instructors/computer programs saying that ##3+4x## is wrong but ##4x + 3## is somehow correct. No wonder students are confused when instructors/computer programs make completely arbitrary and unreasonable demands like that. It goes against the very spirit and freedom of mathematics.
 
  • #5
Tyrion101 said:
Well I don't think it's my instructor the is an online class and it could just be that the particular program is set ti read the answer in one way. I'm glad you said something, because I've looked at my answers a few times and have noticed nothing that could be mathematically wrong. Now I could be forgetting parenthesis when doing ordered pairs, but most often it's not. I was just a bit confused, thank you.
Sounds like it's a badly written software application that is auto-checking your answer. Bummer, in that case all you can do is try to adapt your answers to whatever arbitrary order it wants to see. :yuck:
 
  • #6
jbunniii said:
Sounds like it's a badly written software application that is auto-checking your answer. Bummer, in that case all you can do is try to adapt your answers to whatever arbitrary order it wants to see. :yuck:

I know it's an online class and all. But I think that teachers using software to check student's homework is a very bad thing. Mathematics is about the thought process and about the intermediate steps, while the software only cares about the final answer.
But ok, I don't know a good alternative for online classes.
 
  • #7
The reason I did it because the class I wanted didn't meet my schedule, the homework you have an infinite number of chances to get it right, and if you complete it, it counts as 100%, but the problem might be on tests, guess I'll just have to be more careful. I'd hate to get a test question wrong for putting it in the "wrong" order.
 
  • #8
micromass said:
I know it's an online class and all. But I think that teachers using software to check student's homework is a very bad thing. Mathematics is about the thought process and about the intermediate steps, while the software only cares about the final answer.
But ok, I don't know a good alternative for online classes.
When I was in college we had multiple choice exams in some of the large freshman classes, to make the grading easier. I thought that was bad, but this is much worse. I guess they don't use multiple choice because they don't want the student just guessing answers, but now a different sort of guessing is required. :frown:
 
  • #9
Does it at least tell you the answer is incorrect? If I had answered "3x+4" while the answer was "4+3x" and lost points on a test I'd be furious.
 
  • #10
jbunniii said:
I guess they don't use multiple choice because they don't want the student just guessing answers

You can use prob to illustrate just how unreliable multiple choice tests are: suppose a test has 4 answers, and a student wished a score of 73% overall, then he'll need to correctly know the answers to only 64% of the question and guess the rest.

One way to get around this is deduct 0.25 marks per wrong answer, but that has the other issue of what if the student didn't guess but got the wrong answer. Should you be penalizing?
 
  • #11
So I just experimented. Apparently the gripe with me is I forget the parenthesis on the ordered pair. Not the order it's in. Whoops.
 
  • #12
Tyrion101 said:
So I just experimented. Apparently the gripe with me is I forget the parenthesis on the ordered pair. Not the order it's in. Whoops.

What ordered pair? The example you gave has neither an ordered pair nor a need for parentheses.
 
  • #13
For a solution set that has infinite possibilities (the same line) should be written as (3x+4, x), is this how it's generally done?
 
  • #14
Tyrion101 said:
For a solution set that has infinite possibilities (the same line) should be written as (3x+4, x), is this how it's generally done?

I see what you mean. Order is important in that case. For example, if you want to describe all points on the line ##y=3x+4## then that would be

[tex]\{(x,3x+4)~\vert~x\in \mathbb{R}\}[/tex]

if you write it in set-builder notation. Writing it as

[tex]\{(3x+4,x)~\vert~x\in \mathbb{R}\}[/tex]

would be wrong
 
  • #15
Thank you, this has been a sore point this whole class.
 
  • #16
Points in the plane are written as ordered pairs with the x coordinate first and then the y coordinate. Points in space are written as ordered triples, in the order x, y, and z. Every point on the line y = 3x + 4 (micromass's example) could be written as (x, 3x + 4). If you wrote the order backwards it would be wrong.

I would imagine that this order of the coordinates of points would be something that was covered in an algebra or even prealgebra class.
 
  • #17
If it is something like: -3x+4, would this be written as: (x, 4-3x)?
 
  • #18
Tyrion101 said:
If it is something like: -3x+4, would this be written as: (x, 4-3x)?
Yes, provided we're talking about points on the line whose equation is y = -3x + 4.

When you started this thread, our understanding was that you were asking about, for example, -3x + 4 as opposed to 4 - 3x, both of which mean exactly the same thing. As it turns out, though, what you were apparently asking about was the order in an ordered pair; e.g., about (x, -3x + 4) vs. (-3x + 4, x). The order in which the expressions in an ordered pair is very important.
 
  • #19
I am sorry, I have difficulty getting my point across. Sorry again about the confusion.
 

What is the standard order?

The standard order refers to the accepted or most commonly used sequence or arrangement of something.

Why is it important to know the standard order?

Knowing the standard order can help ensure consistency and efficiency in processes or procedures.

How do I determine the standard order?

The standard order can vary depending on the subject matter. It is important to research and consult reliable sources or experts in the field to determine the standard order.

What happens if I don't follow the standard order?

Not following the standard order can result in confusion, errors, and potential negative consequences. It is important to understand and adhere to the standard order to achieve desired results.

Can the standard order change?

Yes, the standard order can change over time as new information, advancements, or practices emerge. It is important to stay updated on any changes to the standard order in your field of study or work.

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