Author Topic: TT's Maths Thread (Read 145800 times) Tweet Share

TrueTears · « **Reply #600 on:** January 01, 2010, 09:26:54 pm »

Quote from: brightsky on January 01, 2010, 09:20:01 pm

Lolol. Differs from person to person I guess. 可谓仁者见仁，智者见智!

hahaha I see you have been reading my Chinese essays!

brightsky · « **Reply #601 on:** January 01, 2010, 09:28:34 pm »

Hehe, sure have! Got to say, they are wayy too pro!! :p

EvangelionZeta · « **Reply #602 on:** January 02, 2010, 03:42:20 pm »

Quote from: TrueTears on January 01, 2010, 09:17:25 pm

Nope haven't been to him, but from what I've heard from friends, he's pretty shit.

Really? I've heard he teaches concepts very well (haven't been to his class personally, although I sat his Methods practice exams. :p). Also his questions tend to be challenging enough to make actual VCAA exams appear very easy.

TrueTears · « **Reply #603 on:** January 02, 2010, 05:18:36 pm »

Quote from: EvangelionZeta on January 02, 2010, 03:42:20 pm

Quote from: TrueTears on January 01, 2010, 09:17:25 pm
Nope haven't been to him, but from what I've heard from friends, he's pretty shit.

Really? I've heard he teaches concepts very well (haven't been to his class personally, although I sat his Methods practice exams. :p). Also his questions tend to be challenging enough to make actual VCAA exams appear very easy.

ye

Alright just wondering, if we have $2$ integers $a$ and $b$ such that $(a,b) = 1$ then there exists some integers $x$ and $y$ such that $ax+by = 1.$

Then does that mean if we have $\text{n}$ integers $a_1,a_2, \cdots a_n$ such that $(a_1,a_2, \cdots a_n) = 1$ then does there exists some integers $x_1,x_2,x_3 \cdots x_n$ such that $a_1x_1+a_2x_2+ \cdots + a_nx_n = 1$ ?

If there is, then how do we solve the linear diophantine equation $a_1x_1+a_2x_2+ \cdots + a_nx_n = 1$ for $x_1$ ? Ie, what would the general solution be? (Is this question beyond my abilities? Is there even a general solution?)

Thanks

zzdfa · « **Reply #604 on:** January 02, 2010, 06:45:13 pm »

yea it's pretty simple,

try proving it for n=3.
let g=(a1,a2)

use the fact that
(a1,a2,a3)= (g,a3)

and

g=a1y1+a2y2 for some y1,y2

the general case should follow easily, by induction.

edit: actually, if you're using induction, it's easier to prove the general case instead:

a1x1+...+anxn=m has a solution iff (a1,...,an)|m

the inductive proof also shows you how to find the solution.

TrueTears · « **Reply #605 on:** January 03, 2010, 01:34:35 am »

Finally I can do some modular arithmetic questions.

I must say this probs has been the most challenging topic for me so far, but now I love it so much <3

Some warmup questions out there for thought (And yes there's like 3 putnam and 2 IMO's questions coming soon

, this ought to be fun)

~~1. Show that if $a^2+b^2=c^2$ then $3|ab$~~

~~2. If $x^3+y^3=z^3$ show that one of the three must be a multiple of $7$~~

~~3. Find all prime $x$ such that $x^2+2$ is a prime~~

~~4. Prove there are infinitely many positive integers which cannot be represented as a sum of three perfect cubes~~

kamil9876 · « **Reply #606 on:** January 03, 2010, 04:33:57 pm »

We have to show that either a or b is a multiple of 3. Assume that neither a nor b was a multiple of 3. This means:

$a\equiv \pm 1\mod 3, b\equiv \pm 1\mod 3$

$a^2+b^2 \equiv 2 \mod 3$

But no square is congruent to 2 mod 3. Since $0^2 \equiv 0, (\pm 1)^2=1 \mod 3$

same trick for all other q's.

TrueTears · « **Reply #607 on:** January 03, 2010, 05:12:58 pm »

How do you know if a or b wasn't a multiple of 3 then it'd be congruent to 1 mod 3?

kamil9876 · « **Reply #608 on:** January 03, 2010, 06:02:10 pm »

0,1,2 or equivalently 0,1,-1 are all the residues mod 3. Each integer has exactly one of these, if not a multiple of 3, then not 0 and hence 1 or -1.

TrueTears · « **Reply #609 on:** January 03, 2010, 06:02:50 pm »

Quote from: kamil9876 on January 03, 2010, 06:02:10 pm

0,1,2 or equivalently 0,1,-1 are all the residues mod 3. Each integer has exactly one of these, if not a multiple of 3, then not 0 and hence 1 or -1.

lol how stupid of me, how did I not think of that ffs

TrueTears · « **Reply #610 on:** January 03, 2010, 06:29:23 pm »

Quote from: kamil9876 on January 03, 2010, 04:33:57 pm

We have to show that either a or b is a multiple of 3. Assume that neither a nor b was a multiple of 3. This means:

$a\equiv \pm 1\mod 3, b\equiv \pm 1\mod 3$

$a^2+b^2 \equiv 2 \mod 3$

But no square is congruent to 2 mod 3. Since $0^2 \equiv 0, (\pm 1)^2=1 \mod 3$

But $c^2 \equiv 2 \pmod {3}$

$c \equiv \sqrt{2} \pmod {3}$

So there is a value of c that satisfies, since the question never stated a b and c are integers?

Nvm

TrueTears · « **Reply #611 on:** January 03, 2010, 09:09:42 pm »

Quote

2. If $x^3+y^3=z^3$ show that one of the three must be a multiple of $7$

The questions wants us to show that $7|xyz$

Let's assume the contrapositive, that $7$ does not divide $xyz$

$x \equiv \pm 1, \pm 2, \pm 3 \pmod {7}$

$y \equiv \pm 1, \pm 2, \pm 3 \pmod {7}$

$z \equiv \pm 1, \pm 2, \pm 3 \pmod {7}$

$x^3+y^3 \equiv z^3 \pmod {7}$

Now assume some number that is not congruent to $0 \pmod {7}$ satisfies the equation.

Now $x^3 \equiv \left(\pm 1\right)^2, \left(\pm 2\right)^2, \left(\pm 3\right)^2 \pmod {7}$

$\implies x^3,y^3,z^3 \equiv 1, 8, 27 \equiv \pm 1 \pmod {7}$

$\therefore \pm 1 \pm 1 \equiv \pm 1 \pmod {7}$

But clearly this is false.

So there are no numbers that is not congruent to $0 \pmod {7}$ which satisfies the equation. So at least one of them must be divisible by $7$ .

kamil9876 · « **Reply #612 on:** January 03, 2010, 09:20:45 pm »

Mods doing mod

kamil9876 · « **Reply #613 on:** January 04, 2010, 01:42:46 am »

hint for 3:

3^2+2=11

so x=3 is a solution.

5^2+2=27=3(9) so 5 is not a soution.

7^2+2=51=3(14) so 7 is not a solution.

11^2+2=123=3(41) so 11 is not a solution.

13^2+2=171=3(57) so 13 is not a solution.

Now conjecture and prove.

TrueTears · « **Reply #614 on:** January 04, 2010, 04:22:27 pm »

Quote

3. Find all prime $x$ such that $x^2+2$ is a prime

Thanks kamil for hint.

I conjecture that the final answer can not be a multiple of $3$ and that any prime number larger than $3$ when subbed into the expression produces an integer that is a multiple of $3$ .

Assume that the final answer is a multiple of $3$ .

$\implies x^2+2 \equiv 0 \pmod {3}$

$\implies x^2 \equiv -2 \pmod {3}$

$\implies x^2 \equiv 1 \pmod {3}$

$\implies x \equiv 1, -1 \pmod {3}$

$\implies x \equiv 1 \ \text{or} \ x \equiv 2 \pmod {3}$

But all prime numbers (except for $3$ ) can be written in the form of either $6k+1$ or $6k-1$ .

$\implies 6k+1 \equiv 1 \pmod {3} \ \text{and} \ 6k-1 \equiv 2 \pmod {3}$

$\implies x \equiv 6k+1 \ \text{or} \ x \equiv 6k-1 \pmod {3}$

Thus any primes in the form of $6k+1$ or $6k-1$ when subbed into the expression $x^2+2$ produces an integer that is a multiple of $3$ which does not satisfy the condition.

However the only prime which can not be expressed in the form of $6k+1$ or $6k-1$ is $3$ .

$\therefore x = 3$

Or how about this way...

Assume that $x^2+2$ is prime iff $x$ is prime.

Since from the experimenting we conjecture that any prime larger than $3$ produces an integer that is a multiple of $3$ . Let us consider $\mathbb{Z}_3$ .

Since $x^2+2$ is prime, it can only be divided by itself or $1$ .

$x^2+2 \not\equiv 0 \pmod {3}$

$x^2 \not\equiv 1 \pmod {3}$

$x \not\equiv 1 \ \text{or} \ x \not\equiv -1 \pmod {3}$

We require $x \equiv 0 \pmod {3}$ in order to maintain $x^2+2$ as a prime.

$\therefore x = 3k \equiv 0 \pmod {3}$ for $x^2+2$ to be prime.

However the only prime number in the form of $3k$ is $3$ .

Thus $x = 3$ .

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