Search found 186 matches
- Fri Aug 30, 2013 10:39 pm
- Forum: National Math Camp
- Topic: [OGC1] Online Geometry Camp: Day 6 (EXAM!)
- Replies: 36
- Views: 28136
Re: [OGC1] Online Geometry Camp: Day 6 (EXAM!)
I am unable to understand - why it is showing 'outbox' still [after near 1.5 hour] instead of sent messages ? I sent a test message to someone and it was also in 'outbox' .
- Wed Aug 28, 2013 9:57 pm
- Forum: National Math Camp
- Topic: [OGC1] Online Geometry Camp: Day 4
- Replies: 32
- Views: 26831
Re: [OGC1] Online Geometry Camp: Day 4
@ Samiun Fateeha Ira , apply power of a point any other way.
By the way , did it occur to you that $AB=48$ ?
By the way , did it occur to you that $AB=48$ ?
- Wed Aug 28, 2013 5:22 pm
- Forum: National Math Camp
- Topic: [OGC1] Online Geometry Camp: Day 4
- Replies: 32
- Views: 26831
Re: [OGC1] Online Geometry Camp: Day 4
Problem 6 Two circles intersect at $AB$ . A line through $B$ intersect the first circle at $C$ and the second circle at $D$. The tangents to the first circle at $C$ and the second at $D$ intersect at $M$ . Through the intersection point of $AM$ and $CD$ , there passes a line parallel to $CM$ and in...
- Mon Jun 24, 2013 8:49 pm
- Forum: Combinatorics
- Topic: rotating a colored square
- Replies: 5
- Views: 6054
rotating a colored square
A $n$ x $n$ square (where n is an odd positive integer) is divided into $n^2$ unit squares . Each unit square is colored either black or white . Probability of a square being black or white is equal . The square is rotated $90^o$ with respect to the center . If a white square overlaps on a square wh...
- Sat Jun 22, 2013 10:19 pm
- Forum: Secondary Level
- Topic: Prove there is none
- Replies: 2
- Views: 2920
Re: Prove there is none
$13^a = (3.4+1)^a = (3.4)^a +\binom{a}{1}(3.4)^{a-1} + ......... + \binom{a}{a-1}(3.4) + 1 $ $\equiv \binom{a}{a-1} (3.4) + 1 \not\equiv -1(mod 4^2)$
$\therefore 13^a \not\equiv 15 (mod 4^2)$
$\therefore 13^a \not\equiv 15 (mod 4^2)$
- Sun May 05, 2013 2:43 pm
- Forum: Junior Level
- Topic: Brilliant problem
- Replies: 1
- Views: 2796
Re: Brilliant problem
$\displaystyle (r_1^2+r_1+1)(r_2^2+r_2+1)(r_3^2+r_3+1)=\frac{r_1^3-1}{r_1-1}.\frac{r_1^3-1}{r_3-1}.\frac{r_3^3-1}{r_3-1}$
put value of $x^3$ and use Vieta's formula .
put value of $x^3$ and use Vieta's formula .
- Tue Apr 09, 2013 1:09 pm
- Forum: Higher Secondary Level
- Topic: Where is my incenter [self-made]
- Replies: 5
- Views: 5505
Re: Where is my incenter [self-made]
In $ODPE$ , $\angle ODP=\angle OEP=90^o$ , $ODPE$ is cyclic quadrilateral. $OM.MP=DM.ME=XM.MY$ , therefore $O,Y,P,X$ are concyclic. $OX=OY \Rightarrow \angle OXY=\angle OYX\Rightarrow \angle OPY=\angle OXY$ ; let $OP$ intersects $\omega $ at $J$. $JP$ bisects $\angle XPY$. on the other hand , $\angl...
Re: CMO 2012
let , $c_2$ intersects $AB$ at $X$. $\angle PAD=\angle AEP$ , $\angle PAC=\angle PBA$ ; $\angle PAD-\angle PAC=\angle AEP-\angle PBA\Rightarrow \frac{1}{2}\angle B=(\angle AXP)-(\angle AXP-\angle BPX) \Rightarrow \angle BPX= \frac{1}{2}\angle B$ $AD$ intersects $c_1$ at $D_1$.$\angle EAD_1=180^o-A-\...
- Sat Nov 17, 2012 3:59 pm
- Forum: Higher Secondary Level
- Topic: Secondary and Higher Secondary Marathon
- Replies: 128
- Views: 297180
Re: Secondary and Higher Secondary Marathon
Sophie Jermain kills it. i couldn't get that ..... i did problem 6 with factorising which results $1,-1$. i think this is general way. solution to problem 7 $\angle BAM=\angle CAM \Rightarrow \angle BCM=\angle CBM$ , $BM=CM$.so $C$ point lies on the $\omega$ circle . now , $XD.DY=BD.DC=AD.DM$ $\the...
- Sat Nov 10, 2012 10:39 am
- Forum: News / Announcements
- Topic: Active users for marathon
- Replies: 23
- Views: 17446
Re: Active users for marathon
I am not confident but i'll visit and try those problems