$5^{ \phi(9)} \equiv 2^{ \phi(9)} \equiv 1$(mod 9)
$5^{1020} \equiv 2^{1020} \equiv 1$(mod 9)
$5^{1024} \equiv -5 \equiv 4$(mod 9)
$2^{1024} \equiv -2 \equiv 7$(mod 9)
$7+4+1=12 \equiv 3$(mod 9)
Ans:3
Search found 125 matches
- Sun Jan 23, 2011 11:10 am
- Forum: Secondary: Solved
- Topic: Dhaka Secondary 2010/2
- Replies: 3
- Views: 3668
- Sun Jan 23, 2011 10:51 am
- Forum: Divisional Math Olympiad
- Topic: digit again again
- Replies: 5
- Views: 4193
Re: digit again again
$a \equiv b$(mod m) $\Rightarrow \frac{a-b}{m}=x \epsilon Z$ now,$ \frac{ak-bk}{mk}=x$ so,$ak \equiv bk$(mod mk)..........(1) $2^{ \phi(25)} \equiv 1$(mod 25) $2^{20} \equiv 2^{980} \equiv 1$(mod 25) $2^{982} \equiv 4(mod 25 \cdot 4)$[using 1] $2^{982} \cdot 2^{10} \cdot 2^7 \equiv 4 \cdot 24 \cdot ...
- Sun Jan 23, 2011 10:31 am
- Forum: Divisional Math Olympiad
- Topic: problem
- Replies: 7
- Views: 5128
Re: problem
Yaaaahuuu.....
At last ei easy prob taar solution krte paarsi.But aager gulay vul ki chilo???Plz keu b0lo.
$3^{4} \equiv 1$(mod 8)
$3^{2012} \equiv 1$(mod 8)
$3^{2012}-1 \equiv 0 \equiv 8$(mod 8)
$ \frac{3^{2012}-1}{2} \equiv 4$(mod 8)
Ans:4.....
At last ei easy prob taar solution krte paarsi.But aager gulay vul ki chilo???Plz keu b0lo.
$3^{4} \equiv 1$(mod 8)
$3^{2012} \equiv 1$(mod 8)
$3^{2012}-1 \equiv 0 \equiv 8$(mod 8)
$ \frac{3^{2012}-1}{2} \equiv 4$(mod 8)
Ans:4.....
- Sat Jan 22, 2011 3:19 am
- Forum: Social Lounge
- Topic: My first div MO
- Replies: 17
- Views: 10461
Re: My first div MO
Sundor g0lpo...Kintu amr bepaar ta besi dukkher:'(ami divisional mo kothay h0y seitao jantam na dcmbr 2009 porjnto.Ctg te amr schol er keu o janto na k0thay h0y(sir era to janleo blbe na amr schol e),abr paper e o lekha h0y na m0n e h0y...Tai goto baarer aager pr0ttek bochor ami paper e khali tmdr c...
- Fri Jan 21, 2011 2:29 pm
- Forum: Divisional Math Olympiad
- Topic: DIGIT
- Replies: 24
- Views: 12699
Re: DIGIT
আগের পেজ এ আমার ভুলের পর মজার একটা জিনিস বাইর করলাম। এইটা আগে কখোনো দেখি নাই।এইটার জন্য কোপ্রাইম হওয়া লাগে না। :) we know in modular arithmetic, if G.C.D(n,d)=k in $a \equiv b $(mod n) then, $ \frac{a}{d} \equiv \frac{b}{d} (mod \frac{n}{k})$.....(1) let's try it without changing n...... from $(1)\...
- Fri Jan 21, 2011 2:02 am
- Forum: College / University Level
- Topic: e^ipi + 1 = 0
- Replies: 11
- Views: 28934
Re: e^ipi + 1 = 0
"College / University Level" e r 1ta post kora ache..oita poira dekho.....post name "$i^i$"
- Fri Jan 21, 2011 1:55 am
- Forum: Divisional Math Olympiad
- Topic: digit again again
- Replies: 5
- Views: 4193
Re: digit again again
my ans is 88 :? I'm not sure because i found it by an ugly way......... $2^{10} \equiv 24\equiv 3 \cdot 2^3$ (mod 100) $\Rightarrow 2^{100} \equiv 3^{10} \cdot 2^{30}$(mod 100) $\Rightarrow 2^{100} \equiv 3^4 \cdot 3^4 \cdot 3^2 \cdot 2^{10 \cdot 3}$(mod 100) $\Rightarrow 2^{100} \equiv 49 \cdot 24^...
- Fri Jan 21, 2011 1:26 am
- Forum: Divisional Math Olympiad
- Topic: digit again again
- Replies: 5
- Views: 4193
Re: digit again again
Solving this i have observed some nice things.... $24^{2n} \equiv 76$(mod 100) $24^{2n+1} \equiv 24$ (mod 100) where$ n \epsilon N$ $11^i \equiv 10 \cdot i +1$(mod100)......put, i=10n+1 $11^{10n+i} \equiv 10 \cdot i+1$(mod 100). another one is: we know in modular arithmetic, if G.C.D(n,d)=k in $a \e...
- Thu Jan 20, 2011 1:58 pm
- Forum: Algebra
- Topic: Find Sum of Roots
- Replies: 4
- Views: 3875
Re: Find Sum of Roots
what will be the sum of the roots???Moon wrote:Hint:
If a polynomial $P(x)=a^nx^n+a_{n-1}x^{n-1}+\cdots + a_0x_0$. What is the sum of the roots?
- Thu Jan 13, 2011 10:37 am
- Forum: Divisional Math Olympiad
- Topic: problem
- Replies: 7
- Views: 5128
Re: problem
$3^{2n} \equiv 1 (mod 8)$.............[1] $3^{2n} \equiv 9 (mod 8)$ $3^{2n-1} \equiv 3 (mod 8)$....................[2] $2011=2 \cdot 1006-1$ and $2010=2 \cdot 1005$ from [1] and [2] $3^{2n}+3^{2n-1} \equiv 1+4 (mod 8)$ so,$3^{2n} \cdot 1005+3^{2n-1} \cdot 1006 \equiv 1 \cdot 1005+3 \cdot 1006 (mod ...