I think it will be $R \equiv Q$
Anyway, Nice solution...
Search found 155 matches
- Wed Feb 12, 2014 2:42 pm
- Forum: Geometry
- Topic: Don't touch my circles [externally;)]
- Replies: 2
- Views: 2459
- Tue Feb 11, 2014 4:05 pm
- Forum: National Math Olympiad (BdMO)
- Topic: warm-up problems for national BdMO'14
- Replies: 25
- Views: 15961
Re: warm-up problems for national BdMO'14
I think it will be $B$$K \cap \odot ABC=N$.Tahmid Hasan wrote: Let $A$$K \cap \odot ABC=N$.
- Mon Feb 10, 2014 9:27 pm
- Forum: Physics
- Topic: Falling Body, Thought Experiment
- Replies: 2
- Views: 3292
Re: Falling Body, Thought Experiment
I think so.... For any body of mass $m$ gravitational force acting on the body, $F=G\frac{M \times m}{R^2}$ (usual notations). So, Acceleration of the body, $a=\frac{F}{m}=\frac{GM}{R^2}$, which is a constant. $\therefore$ the acceleration of any freely falling body is constant. If two bodies are at...
- Mon Feb 10, 2014 8:52 pm
- Forum: National Math Olympiad (BdMO)
- Topic: warm-up problems for national BdMO'14
- Replies: 25
- Views: 15961
Re: warm-up problems for national BdMO'14
Could you explain a bit more?? How did you get this equation??Fatin Farhan wrote: $$\binom{n}{n-1}n=3n$$
So, $$n=3$$
And instead of using $*$ you can us the command "\times", if you want to write "$\times$".
- Mon Feb 10, 2014 8:25 pm
- Forum: National Math Olympiad (BdMO)
- Topic: warm-up problems for national BdMO'14
- Replies: 25
- Views: 15961
Re: warm-up problems for national BdMO'14
There's a bug in the solution. $y$ and $x$ need not be integers. Only $N$ needs to be a positive integer. $\sqrt{1+8N}$ and $\sqrt{9+8N}$ may be rational, or, irrational.Fatin Farhan wrote: $$y^2-x^2=8$$
So, $$(y+x)=4,8$$ and $$(y-x)=2,1$$
- Sun Feb 09, 2014 6:22 pm
- Forum: National Math Olympiad (BdMO)
- Topic: warm-up problems for national BdMO'14
- Replies: 25
- Views: 15961
Re: warm-up problems for national BdMO'14
I've got some more: $[4]$( JBMO'07 ) Let $ABCD$ be a convex quadrilateral with $\angle DAC = \angle BDC = 36^\circ , \angle CBD = 18^\circ$ and $\angle BAC = 72^\circ$. The diagonals and intersect at point $P$ . Determine the measure of $\angle APD$ in degrees. $[5]$( Self-Made ) Show that, there is...
- Sun Feb 09, 2014 2:27 pm
- Forum: National Math Olympiad (BdMO)
- Topic: warm-up problems for national BdMO'14
- Replies: 25
- Views: 15961
Re: warm-up problems for national BdMO'14
A much easier solution to No. (2): $7^{2}\equiv (-1)\pmod{25} \Rightarrow 7^4\equiv 1\pmod{25}$. Again, $7^2\equiv 1 \pmod4 \Rightarrow 7^4\equiv 1\pmod4$ $\therefore 7^4\equiv 1\pmod{100}$ Now, $1996 \equiv 0 \pmod4$ $\displaystyle \therefore 7^{1996}\equiv 7^0\equiv 1\pmod{100}$ And, the result f...
- Sun Feb 09, 2014 2:11 pm
- Forum: National Math Olympiad (BdMO)
- Topic: warm-up problems for national BdMO'14
- Replies: 25
- Views: 15961
Re: warm-up problems for national BdMO'14
*Solution of No.(2): We need to calculate $\pmod {100}$. First of all, $100=2^2\times 5^2$. $\therefore \varphi(100)=100\times(1-\frac{1}{2})\times(1-\frac{1}{5})=40$. $\because gcd(7,100)=1$, $\therefore 7^{40}\equiv 1\pmod{100}$. Now, $1996\equiv36\pmod{40}$. $\displaystyle \therefore 7^{1996}\eq...
- Wed Feb 05, 2014 12:05 am
- Forum: Algebra
- Topic: Trouble in Trigonometry
- Replies: 3
- Views: 3096
Re: Trouble in Trigonometry
In this solution, you did some pretty ugly calculations, which are very tough to do without a calculator.
For example, how did you solve the equations for $\sin{6^\circ}$ and $\sin{12^\circ}$ ??
Would you please elaborate...?
For example, how did you solve the equations for $\sin{6^\circ}$ and $\sin{12^\circ}$ ??
Would you please elaborate...?
- Fri Jan 17, 2014 7:01 pm
- Forum: Algebra
- Topic: Trouble in Trigonometry
- Replies: 3
- Views: 3096
Trouble in Trigonometry
$\displaystyle \tan \theta = \sqrt{3}-4\sin 24^\circ$
where, $0<\theta < 90^\circ$.
Find the measure of $\theta$ in degrees.
where, $0<\theta < 90^\circ$.
Find the measure of $\theta$ in degrees.