Search found 36 matches
- Sat Sep 30, 2017 12:02 pm
- Forum: Geometry
- Topic: CGMO 2002/4
- Replies: 2
- Views: 10447
CGMO 2002/4
Circles $T_1$ and $T_2$ intersect at two points $B $ and $C$, and $BC$ is the diameter of $T_1$. Construct a tangent line to circle $T_1$ at $C$ intersecting $T_2$ at another point $A$. Line $AB$ meets $T_1$ again at $E $and line $CE $ meets $T_2$ again at $F $. Let $H $ be an arbitrary point on seg...
- Sat Jul 29, 2017 12:38 pm
- Forum: International Mathematical Olympiad (IMO)
- Topic: IMO 2017 P4
- Replies: 4
- Views: 9091
Re: IMO 2017 P4
We get $TA$ parallel to $KR$ because $\angle{ATS}=\angle{SJK}=\angle{SRK}$ We extend $KS$ to $P$ where $KS$ intersects $TA$ at $P$ Now, It's easy to prove that $TPRK$ is a rombus So, $\angle{TPK}=\angle{PKR}$ Again, $\angle{ARS}=\angle{SKR}$ So, $\angle{TPK}=\angle{ARS}$ So, $APSR$ is cyclic. $\angl...
- Sat Jul 29, 2017 12:29 pm
- Forum: International Mathematical Olympiad (IMO)
- Topic: IMO 2017 P4
- Replies: 4
- Views: 9091
IMO 2017 P4
Let R and S be dierent points on a circle Ω such that RS is not a diameter. Let be the tangent line to Ω at R. Point T is such that S is the midpoint of the line segment RT. Point J is chosen on the shorter arc RS of Ω so that the circumcircle Γ of triangle JST intersects at two distinct points. Let...
- Sat Jun 03, 2017 3:21 pm
- Forum: Geometry
- Topic: CGMO 2007/5
- Replies: 1
- Views: 9450
CGMO 2007/5
Point $D$ lies inside triangle $ABC$ such that $$\angle{DAC}=\angle{DCA}=30^o$$ and $$\angle{DBA}=60^o$$. Point $E$ is the midpoint of segment $BC$. Point $F$ lies on segment $AC$ with $AF=2FC$. Prove that $DE$ I $EF$.
- Fri Jun 02, 2017 3:04 pm
- Forum: International Mathematical Olympiad (IMO)
- Topic: IMO 2001 Problem1
- Replies: 2
- Views: 6884
Re: IMO 2001 Problem1
$$\angle{A}+\angle{COP} <90° \Rightarrow \angle{COP} <90°-\angle{COD}$$ $$\Rightarrow \angle{COP} <\angle{OCP} \Rightarrow CP<PO$$ is enough to prove. $\angle C -\angle B \geq 30°$ as both $(\angle{C}-\angle{B})$ and 30° are less than $90°$, $$\begin{align*}&\sin(\angle{C}-\angle{B})\geq \sin30°\\ \...
- Fri Jun 02, 2017 3:01 pm
- Forum: International Mathematical Olympiad (IMO)
- Topic: IMO 2001 Problem1
- Replies: 2
- Views: 6884
IMO 2001 Problem1
Consider an acute angled triangle $ABC$. Let $P$ be the foot of the altitude of triangle $ABC$ issuing from the vertex $A$, and let $O$ be the circumvented of triangle $ABC$. Assume that $$\angle{C}\geq\angle{B}+30°$$. Prove that $$\angle{A}+\angle{COP}<90°$$
- Fri Jun 02, 2017 1:59 pm
- Forum: Geometry
- Topic: IMO 2007 Problem 4
- Replies: 4
- Views: 10722
Re: IMO 2007 Problem 4
Let's draw $RX$ perpendicular on $PK$ which intersects thevcircumcirle of triangle $ABC$ at $M$ $RX$ is parallel to $BC$ So, $BRMC$ is a trapizoid. So, $BR$=$MC$ Again, $BR$=$AR$ is known as $CR$ in the angle bisector of angle $ACB$ So, $AR$=$MC$ and it makes $ARCM$ cyclic trapizoid Then $MR$=$b$ $X...
- Thu Apr 27, 2017 4:31 pm
- Forum: National Math Olympiad (BdMO)
- Topic: BDMO 2017 National round Secondary 2
- Replies: 2
- Views: 3210
Re: BDMO 2017 National round Secondary 2
Here, $AD$ is perpendicular on $BC$ Hence, $BE=CE$ We can show that $$\triangle$$$BDE$ and $$\triangle$$$CFE$ are congruent. So, $FE=ED=OF=\frac{1}{3}OD=\frac{1}{3}OB$ In the right angle triangle $OBE$, $OE^2+BE^2=OB^2$ or,$4OF^2+5=9OF^2$ or,$OF=1=DE$ in rigth angle triangle $CED$, $CE^2+DE^2=CD^2$ ...
- Wed Apr 12, 2017 10:42 am
- Forum: Social Lounge
- Topic: BDMO Forum Mafia #2
- Replies: 30
- Views: 47230
Re: BDMO Forum Mafia #2
I am also in
- Sun Apr 02, 2017 2:31 pm
- Forum: National Math Camp
- Topic: The Gonit IshChool Project - Beta FE Class
- Replies: 8
- Views: 8838
Re: The Gonit IshChool Project - Beta FE Class
I will be able to dedicate about 10 hours per week.
My experience is Adib vai's class.
My experience is Adib vai's class.