Your point here escapes me.

I am responding to the original suggestion of:
"Do more maths instead :-)"

His/her "more maths" I took to mean "study mathematics at A-level (and
above) rather than take IT or anything else at a similar level."

So, basically, I agree that you need basic arithmetic skills to know
how to work out a percentage -- manually OR on a calculator.
The exact opposite. Didn't you follow this sub-thread from its inception?
Oh, so get all the builders to take maths A-level (i.e. "Do more maths")?
Yes. I can do the same and more (that is, arithmetic that 'average'
people find hard or need a calculator for). But my point is (was) that
if we "Do more maths instead :-)" rather than take other A-levels it is
a panacea for curing the deficits in other areas of life. I disagree
strongly.
Well, yeah, of course!

But my reply addressed the assumption of Adam that simply because a
computer is logical then its software and operation is logical. I do
try to reply to what the previous post has said with a comment that relates
directly to that point, you know.
No, I was not discussing people who can't add up. At least, I wasn't
until now.

My reaction was to the original "Do more maths instead :-)" piece of, um,
advice. Yeah, yeah, there was a smiley there, I know it was sort of
facetious, but it's a symptom of an attitude in this group in which
mathematics is exalted to such a superior status and anyone who dares
question it is attacked (see your reply for a prime example). So sue me
for trying to see things from the other side of bias.

And just in case my point has somehow slipped away (again), I am saying
that "Do more maths instead :-)" as flippant or serious advice in the
context of the original message is, well, wrong. As wrong as anything
could be wrong. Wronger, even.

I'd be very worried if you couldn't figure out a way.
To go back to A-level maths (P2 or P3 iirc):
(a+b)^(1/2)=...
SQRT(101) = (100+1)^(1/2) = ...

I don't know if you did P6 but there's another (more useful) method there.

Or better yet - just leave it as root whatever and don't bother (unless
that's the whole point of the exercise)
Got to admit - neither have I.
Useful when numbers get large. Can't you think of a number your calculator
won't be happy with :-)
Multiply ((10^10)^10)! by ((6^6)^6)!
Get back to me when your calculator has finished!
Personally, my Further Maths taught me to never bother with a calculator.
If it's worth bothering to solve, solve it in the general case.
If it's too complex, get a proper computer out because your pocket
calculator won't do very well.

They're nice if you need to multiply lots of pairs of 5 digit numbers
together - otherwise they're just not worth the hastle.

Alun Harford

etc.

My favourite example is the line

"They tell us inflation is coming down, so how come prices are still going
up?"

A familiarity with calculus would help get people to understand the
difference between the rate of change and the rate of change of the rate of
change.

However, a simple way to explain it is "Look, if your car is decelarating,
it's still moving forwards".

Matthew Huntbach

Take my sentence above and read it with the rest of the paragraph it
I'm disagreeing with Adam's "A familiarity with numbers is essential to modern
life" statement. Perhaps I'm reading more implied meaning into it than
intended and if so then I'm mistaken and I'll need to rethink what I
originally wrote.
But if you take my reply in the context of my believing that Adam was
saying that we, today, 21st-Century people, need more familiarity with
numbers as compared to previous generations, then... you see? To get by
in "modern life" we don't need the level of hands-on work-it-out-with-a-
pencil-and-paper maths skills that, say, our grandfathers needed.
(And I'm not saying this is a good thing or a bad thing -- it's just a
thing.)
Exactly. But "Do more maths" would help with that? Nah. Firstly, the
people would actually want to "Do more maths" would already know how to
work out areas (I hope!) so further instruction would be pointless. And,
secondly, the people who would benefit from learning how to calculate
carpet/floor areas on-the-fly would not be the ones we should be putting
onto A-level courses until they had already learnt those basics.
Should, but doesn't. Why else do we have "Windows sucks!" mentalities
being perpetuated? If Windows was such a perfectly logical system then
it would work. First time, every time.
Once again, this is presuming that because the underlying "mechanics" are
logical in operation then anything created on them will automatically be
logical. What about the human factor? I could go away now and write a
Delphi application that would be highly illogical and very difficult to
operate. How could the underlying computer's principles of logic stop me
from incorporating illogical features? (I'm not saying that programmers
do this deliberately in commercial applications, of course! But what can
be done here deliberately can also creep in accidentally.)
And specific knowledge about how viruses work and how floppy disks store
their data would not be needed?

Unless you're saying that "a logical manner" includes doing all the
research to gather all the relevant information and then using that to
solve the problem.

Adam did write:

[...]
It does, I agree. In theory. But take a look at Andy Walker's "we don't
interview for Notts maths now" anecdote about giving test questions to
potential maths students. If those students had truly absorbed all the
goodness of mathematical (i.e. logical) thinking then the "We haven't done
this in class" response should have been the exception.

I'm not arguing against your essential point here, but looking at the
evidence and results of those people who *HAVE* done "more maths". (Okay,
so it's anecdotal and hardly a controlled study, but it's a prominent enough
behaviour in the right sort of sample of people that it is worthy of being
mentioned.)
Yes, I don't doubt that being taught maths to A-level (and higher) standard
means you should be learning how to think about problems in a methodical
way.

But there are two points about that:

1.
Is it really happening in the Real World? I refer you, again, to Mr Walker's
potential uni students. They, presumably, were very proficient at A-level-
standard mathematics and were clearly eager to continue with their exploration
of mathematics, but did the majority exhibit the sort of logical and
systematic thinking that maths *ought to* induce? From the evidence of the
anecdote, it seems not.
What happened? I can make a few suggestions:
a) the idea that maths teaches logical thinking is false; or
b) the students in the example were a particularly bad sample and do not
exemplify the typical "mathematically trained" student; or
c) for some people, this "training" does stay with them and make a difference
(and these are the ones that Mr Walker described as managing to solve the
problems), but for the majority, this "training" is lost on them.
There are probably other explanations, but these are the ones that I think
are most likely, given no further details or data.

So, the point of this point is: the techniques taught in mathematics should
lead to logical and methodical thinking, but can we see any convincing
evidence of this, except as minority exceptions?

2.
People don't always behave in mathematically logical (i.e. the definition of
"logical" that Ray Pang used elsewhere in this thread) ways. People behave
in the way that people behave, not in mechanically predictable behaviour
patterns. I've hinted at this... frustration?... before on AUA, and I'll
explicitly say it now. Studying computers and maths and logical problem-
solving is fine and dandy for some areas, but it does not equip you with
the right approach to dealing with people. You need something else...
empathy, understanding, call-it-what-you-will. No amount of mathematical
logic will enable you to understand how a person truly interacts with a
computer. There has to be that extra "Well, this is what humans think
and want and feel about such-and-such" so that, for example, a workable
back-up routine will, um, work.
Sure, the underlying process might be produced through methodical application
of logical thinking, but that's not the end of it. It's missing the
vital component, the essential component, the component whose priorities and
needs matter more than anything else: the person using this tool that you
have created. Mathematically logical thinking does not teach you how to cope
with that part.

Oh, and a third (minor) point:
3.
Schools should teach the art of rhetoric. It's amazing how many weak and
feeble arguments appear on Usenet. And -- even more annoyingly -- how many
times people will reply to an argument mid-paragraph (or mid-sentence, even!)
before the actual point has been made, replying directly to the rhetorical
device rather than the real point that is being set-up to be made. I guess
that's the danger inherent in this medium with the ability to "interrupt" a
person's long essay at any point you choose, but I do think the inability to
think about what the person is saying as a whole is missing from so many
people.
Maths might teach logical reasoning, but a little bit of rhetorical training
will make one's arguing technique much more effective.
Hmm... I wrote a whole chunk of text here, based on what I thought that
last line meant, but then I wondered if you really did mean what I think
you mean. Um. Anyway... what do you mean exactly by that last line?

Do you mean:
a) It is easier to teach from maths and it is easier to learn from maths.
Or:
b) It is easier to teach maths and it is easier to learn from maths.

Regardless of the details of what you did mean, both of my interpretations
lead me to see a "So what use is maths outside of itself?" situation if I
take your 'humanities versus maths' contrasts into consideration. In other
words, you say that maths is one thing, humanities subjects another thing,
and never the two shall meet. If that's the case, then what influence could
maths have on your ability to learn other stuff? (This is getting close to
my post the other week about a theory explaining only itself... "learning
maths will teach you how to learn only maths"!) If that's not what you meant,
then ignore me. More so.
Ah, flattery!

I don't think I have a truly opposite view that I will fight for till the
last breath leaves my body. I'm just considering all the arguments and
positions that could stand on the opposite side. As I hinted at in a reply
elsewhere, AUA does seem to have rather a mathcentric bias. (For some rough-
and-ready proof of this, take a little while to go back through the Google
archives and look at the "IS NE1 DOING QQQQ TOMOROW?!?!?!?" or "DID NE1 DO
QQQQ YESTRDAY?!?!?!?" posts. Work out the percentage of those in which QQQQ
is a maths paper and of those in which QQQQ is not a maths paper.)
There is a whole world of A-level topics out there, and it puzzles me why,
time and again, maths seems to appear in this group and other subjects don't.