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Calculus & Analysis Marathon & Questions (1 Viewer)

integral95

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Re: First Year Uni Calculus Marathon

Yeah basically, but part a) could've been smacked straight away with the first FTC and the chain rule

Hiccup on the final answer for d) though
wait what?
I don't know if it's legit lol
 

leehuan

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Re: First Year Uni Calculus Marathon

I'm taking a massively blank stab at this one for my procrastination from accounting, so the quality of this answer will be again, poor lol.









 

dan964

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Re: First Year Uni Calculus Marathon

Wouldn't you have to also check/assume the individual requirements of L'Hs are satisfied, namely the limits have to all exist?
 

Paradoxica

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Re: First Year Uni Calculus Marathon

Change variables.

P(ex)/Q(x)

Without Loss of Generality, we can assume P is of degree 1.

This expression obviously tends to infinity.

For those who do not see it, apply L'Hôpital's Rule (with respect to x) n times where n is the degree of Q.

If P is larger, then the contribution to the explosion is greater, and the expression still diverges.

[QED]
 
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BlueGas

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Re: First Year Uni Calculus Marathon

Change variables.

P(ex)/Q(x)

Without Loss of Generality, we can assume P is of degree 1.

This expression obviously tends to infinity.

For those who do not see it, apply L'Hôpital's Rule (with respect to x) n times where n is the degree of Q.

If P is larger, then the contribution to the explosion is greater, and the expression still diverges.

[QED]
How are you able to do these uni questions when you're not even at uni?
 

Paradoxica

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Re: First Year Uni Calculus Marathon

How are you able to do these uni questions when you're not even at uni?
These things are fairly simple to understand, you don't have to be taking a high level mathematics course to be able to do them. I'm sure I could find people in year 10 who can do these questions.
 

leehuan

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Re: First Year Uni Calculus Marathon

Wouldn't you have to also check/assume the individual requirements of L'Hs are satisfied, namely the limits have to all exist?
That's a statement I forgot to (explicitly) make.

But I obviously assumed so because the final limit is supposed to exist and tend to infinity
 

BlueGas

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Re: First Year Uni Calculus Marathon

These things are fairly simple to understand, you don't have to be taking a high level mathematics course to be able to do them. I'm sure I could find people in year 10 who can do these questions.
That's abit of an exaggeration isn't it? Would you find people in Year 10 (unless if they accelerate) that understand L'Hôpital's Rule?
 

Paradoxica

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Re: First Year Uni Calculus Marathon

That's abit of an exaggeration isn't it? Would you find people in Year 10 (unless if they accelerate) that understand L'Hôpital's Rule?
Yes. I would, and I can, and I will. I am quasi-mentoring (mainly because he is very self capable) a year 10 student who has self-taught all the basics of Extension 2 Integration, and I will be teaching him competitive integration. Then I will drag him to the MATHSOC Integration Bee next year.
 

dan964

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Re: First Year Uni Calculus Marathon

That's a statement I forgot to (explicitly) make.

But I obviously assumed so because the final limit is supposed to exist and tend to infinity
Limits that tend to infinity, do they actually exist in the reals?
 

InteGrand

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Re: First Year Uni Calculus Marathon

Going to infinity counts as "exist" for the purposes of using L'Hôpital's rule. You can't have something that oscillates forever though (like (2+cos(x))/(2-cos(x)) or something), that'd fail to satisfy the requirement for L'Hôpital's rule.
 

Paradoxica

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Re: First Year Uni Calculus Marathon

Going to infinity counts as "exist" for the purposes of using L'Hôpital's rule. You can't have something that oscillates forever though (like (2+cos(x))/(2-cos(x)) or something), that'd fail to satisfy the requirement for L'Hôpital's rule.
Identically equal to making a manipulation/substitution so that you get 0/0 instead of ∞/∞
 

Paradoxica

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Re: First Year Uni Calculus Marathon



Prove that f is differentiable at the origin.

There is a real positive number θ which satisfies tan-1θ = sinθ.

Prove that f is continuous at θ.

Hence prove f is continuous at -θ.
 

leehuan

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Re: First Year Uni Calculus Marathon

Yes. I would, and I can, and I will. I am quasi-mentoring (mainly because he is very self capable) a year 10 student who has self-taught all the basics of Extension 2 Integration, and I will be teaching him competitive integration. Then I will drag him to the MATHSOC Integration Bee next year.
...just saw (realised) this
 

seanieg89

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Re: First Year Uni Calculus Marathon

Yep. MVT implies (f(x)-f(a))/(x-a)=f'(c(x)) for some c(x) strictly between a and x. As x->a, c(x)->a, which implies that the RHS converges to a limit by the question's assumptions. So the LHS converges to a limit as x->a, which is precisely the definition of differentiability.

A related followup:
Let f:R->R be a differentiable function. Must f' be continuous?
 
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leehuan

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Re: First Year Uni Calculus Marathon

Yep. MVT implies (f(x)-f(a))/(x-a)=f'(c(x)) for some c(x) strictly between a and x. As x->a, c(x)->a, which implies that the RHS converges to a limit by the question's assumptions. So the LHS converges to a limit as x->a, which is precisely the definition of differentiability.

A related followup:
Let f:R->R be a differentiable function. Must f' be continuous?
Going by memory isn't the function f(x)=x. sin(1/x) for x \neq 0 ; 0 for x=0 a case where f is differentiable everywhere but f' is not continuous at 0?
 

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