Mesmerising Isogonals

by MathPassionForever, Sep 27, 2019, 2:59 PM

Finally what you expect from me: a GEOMETRY blog post!!
So I was having a conversation with Naruto.D.Luffy and we came up with this as a result of a problem's generalisation.
$[asy] /* Geogebra to Asymptote conversion, documentation at artofproblemsolving.com/Wiki go to User:Azjps/geogebra */ import graph; size(20cm); real labelscalefactor = 0.5; /* changes label-to-point distance */ pen dps = linewidth(0.7) + fontsize(10); defaultpen(dps); /* default pen style */ pen dotstyle = black; /* point style */ real xmin = -21.70393503651915, xmax = 16.96733784512575, ymin = -19.527249887479634, ymax = 8.639647115834748; /* image dimensions */ pen qqffff = rgb(0,1,1); pen ffxfqq = rgb(1,0.4980392156862745,0); pen wrwrwr = rgb(0.3803921568627451,0.3803921568627451,0.3803921568627451); pen ffqqff = rgb(1,0,1); draw((-8.204062972546984,5.370109264277287)--(-12.676912150369088,-11.22009495891742)--(11.029188492088062,-10.732147775882282)--cycle, linewidth(1.2) + qqffff); /* draw figures */ draw((-8.204062972546984,5.370109264277287)--(-12.676912150369088,-11.22009495891742), linewidth(1.2) + qqffff); draw((-12.676912150369088,-11.22009495891742)--(11.029188492088062,-10.732147775882282), linewidth(1.2) + qqffff); draw((11.029188492088062,-10.732147775882282)--(-8.204062972546984,5.370109264277287), linewidth(1.2) + qqffff); draw((xmin, -7.573770491803278*xmin-56.76558079009495)--(xmax, -7.573770491803278*xmax-56.76558079009495), linewidth(0.8)); /* line */ draw((xmin, -3.1740105245712344*xmin-20.669672954832006)--(xmax, -3.1740105245712344*xmax-20.669672954832006), linewidth(0.8) + green); /* line */ draw((xmin, -1.9247973507800558*xmin-10.421049410913895)--(xmax, -1.9247973507800558*xmax-10.421049410913895), linewidth(0.8)); /* line */ draw((xmin, -48.58333333333346*xmin-393.21061681863137)--(xmax, -48.58333333333346*xmax-393.21061681863137), linewidth(0.8) + ffxfqq); /* line */ draw((xmin, 0.13203463203463203*xmin-9.546303527808082)--(xmax, 0.13203463203463203*xmax-9.546303527808082), linewidth(0.8) + dotted + wrwrwr); /* line */ draw((xmin, 0.5195352121586896*xmin-4.633992715358346)--(xmax, 0.5195352121586896*xmax-4.633992715358346), linewidth(0.8) + dotted + wrwrwr); /* line */ draw((xmin, 0.5195352121586896*xmin-16.46219955905743)--(xmax, 0.5195352121586896*xmax-16.46219955905743), linewidth(0.8) + dotted + wrwrwr); /* line */ draw((xmin, 0.13203463203463203*xmin-12.188382620075727)--(xmax, 0.13203463203463203*xmax-12.188382620075727), linewidth(0.8) + dotted + wrwrwr); /* line */ draw(circle((-0.8238618291405168,-10.976121367399855), 5.340092852868624), linewidth(0.8) + ffqqff); draw((xmin, 1.194444444444445*xmin + 3.92177233180122)--(xmax, 1.194444444444445*xmax + 3.92177233180122), linewidth(0.8) + linetype("4 4") + wrwrwr); /* line */ draw((xmin, -0.2696078431372549*xmin-7.758592054976186)--(xmax, -0.2696078431372549*xmax-7.758592054976186), linewidth(0.8) + linetype("4 4") + wrwrwr); /* line */ draw(circle((-3.644468734917405,-4.7288267331171525), 3.29918604211756), linewidth(0.8) + blue); draw(circle((-4.669738921552697,-13.377517176814951), 5.680356398464501), linewidth(0.8) + red); draw((-6.9212894030477266,-4.345323344061346)--(-2.3675406461868462,-5.86401344726935), linewidth(0.4) + wrwrwr); draw((-4.598175673547878,-1.5704930560476382)--(-6.709460220477019,-5.949668956318167), linewidth(0.4) + wrwrwr); draw((xmin, 0.5138512998065294*xmin-1.5080719407995526)--(xmax, 0.5138512998065294*xmax-1.5080719407995526), linewidth(0.8) + linetype("2 2") + red); /* line */ draw((xmin, -2.2148760330578505*xmin-12.800873187314375)--(xmax, -2.2148760330578505*xmax-12.800873187314375), linewidth(0.8) + linetype("2 2") + red); /* line */ /* dots and labels */ dot((-8.204062972546984,5.370109264277287),linewidth(4pt) + dotstyle); label("$A$", (-8.04141391153527,5.695407386300712), NE * labelscalefactor); dot((-12.676912150369088,-11.22009495891742),linewidth(4pt) + dotstyle); label("$B$", (-12.514263089357375,-10.894796836893994), NW * labelscalefactor); dot((11.029188492088062,-10.732147775882282),linewidth(4pt) + dotstyle); label("$C$", (11.191837553099775,-10.406849653858856), NE * labelscalefactor); dot((-5.784885220120563,-12.952187811476929),linewidth(3pt) + dotstyle); label("$P$", (-5.642340261612507,-12.724598773275764), NE * labelscalefactor); dot((-2.3675406461868462,-5.86401344726935),linewidth(3pt) + dotstyle); label("$Q$", (-2.186047715113608,-5.608702354013328), NE * labelscalefactor); dot((2.471492725556317,-15.178172061536873),linewidth(3pt) + dotstyle); label("$R$", (2.6527618499848495,-14.920361096933886), E * labelscalefactor); dot((-6.1277538820978,-10.355379256829654),linewidth(3pt) + dotstyle); label("$S$", (-5.967638383635932,-10.122213797088358), NE * labelscalefactor); dot((-0.8238618291405126,-10.976121367399852),linewidth(3pt) + dotstyle); label("$M$", (-0.6408816355023359,-10.732147775882282), SW*2); dot((-7.8646224521743635,-11.121042683825934),linewidth(3pt) + dotstyle); label("$I$", (-7.7161157895118455,-10.894796836893994), NE * labelscalefactor); dot((-7.978106032039922,-5.60763209535758),linewidth(3pt) + dotstyle); label("$H$", (-7.797440320017702,-5.3647287624957585), W*2); dot((-1.6085513735097214,-7.32491398858876),linewidth(3pt) + dotstyle); label("$R'$", (-1.4541269405609003,-7.072543903118744), E * labelscalefactor); dot((-4.598175673547878,-1.5704930560476382),linewidth(3pt) + dotstyle); label("$Q'$", (-4.42247230402466,-1.339164502455867), N * labelscalefactor); dot((-6.9212894030477266,-4.345323344061346),linewidth(3pt) + dotstyle); label("$S'$", (-6.740221423441568,-4.104198539654985), W); dot((-6.709460220477019,-5.949668956318167),linewidth(3pt) + dotstyle); label("$P'$", (-6.536910097176928,-5.690026884519185), NE * labelscalefactor); dot((0.8592501594336901,-12.0749318414492),linewidth(3pt) + dotstyle); label("$W$", (1.026271239867721,-11.830028937711344), NE * labelscalefactor); dot((-4.979841699456322,-19.049402672901163),linewidth(3pt) + dotstyle); label("$Z$", (-4.829094956553942,-18.823938561214995), NE * labelscalefactor); dot((-0.4252879624658302,-9.602456267441015),linewidth(3pt) + dotstyle); label("$Y$", (-0.27492124822598196,-9.349630757282723), NE * labelscalefactor); dot((-6.441321998897964,-7.980486306638234),linewidth(3pt) + dotstyle); label("$X$", (-6.292936505659358,-7.723140147165594), W * labelscalefactor); dot((-6.0724568386395825,-4.628411780353551),linewidth(3pt) + dotstyle); label("$T$", (-5.926976118383004,-4.388834396425482), NE * labelscalefactor); dot((-4.138486506330636,-3.634638611309332),linewidth(3pt) + dotstyle); label("$H_{A}$", (-3.9751873862424496,-3.372277765102277), NE * labelscalefactor); clip((xmin,ymin)--(xmin,ymax)--(xmax,ymax)--(xmax,ymin)--cycle); /* end of picture */[/asy]$
Problem: Perpendiculars $BP,CS$ are dropped on line $l$ through $A$ and perpendiculars $BQ,CR$ are dropped on lime $m$ , which is the isogonal conjugate of $l$ with respect to $\angle A$ such that $P,S$ lie on $l$ , $Q,R$ lie on $m$ . $M$ is the midpoint of $BC$ and $I$ is the foot of $A$ -altitude on $BC$ . Then prove that:
(i) $PQRS$ is cyclic with circumcenter $M$ .
(ii) $MIPR$ and $MIQS$ are cyclic.

Proof:

And this is the question from where we got this:

Elnino2k wrote:

Given the circle $(ABC)$ and $BC$ fixed, $A$ moves on $(ABC)$ . The circles with diameter $AB$ and $AC$ intersect at $K$ . Let $E,F$ be the intersection of $AD$ with $(AB),(AC)$ respectively where $D$ is midpoint of $BC$ . Suppose that $(KDF)$ intersects $(AB)$ at $N$ and $(KDE)$ intersects $(AC)$ at $M$ .
Prove that $MN$ passes through a fixed point as $A$ moves.

Solution:

Edit:
Supercali and BOBTHEGR8 helped me study this configuration even more.

Let $P',Q',R',S'$ be intersections of $BH,CH$ with $l,m$ as shown in the diagram. Then:
1) $P'Q'R'S'$ and $PQRS$ have similicenter $A$ .
2) Let $T=P'Q' \cap R'S'$ . Then $H,T,H_A$ are collinear, where the last point is the $A$ -Humpty point.

This post has been edited 25 times. Last edited by MathPassionForever, Apr 1, 2020, 6:43 PM

geometry

isogonal conjugates

isogonal

Conjugation

Conjugate

Submit

Cum'on post smth man
by Commander_Anta78, Dec 12, 2021, 8:55 AM
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by Project_Donkey_into_M4, Nov 8, 2021, 7:58 AM
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by HoRI_DA_GRe8, Nov 8, 2021, 7:54 AM
？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？、？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？？
by whatagreatday7, Dec 11, 2020, 2:22 PM
@3 below, that's an april fools prank ig?
by Synthetic_Potato, Apr 20, 2020, 9:03 AM
Kya yaar kuch bhi yaar
by MathPassionForever, Apr 1, 2020, 6:50 PM
Nice blog yaar geo pro
by Wizard_32, Apr 1, 2020, 6:02 PM
Lol okay, guess I will restart soon.
by MathPassionForever, Apr 1, 2020, 12:51 PM
No celebratory posts?
by Hexagrammum16, Mar 4, 2020, 6:02 AM
Nice blog, especially the Artzt Parabola post!
by PhysicsMonster_01, Jan 5, 2020, 1:09 PM
Uhh, looks like I'm a bit too stuck b/w JEE+Schoolwork+Oly prep. Perhaps I'll blog a bit after Mains. Sorry for no posts for now. And The algebraic to geometric ineq, oh man that'll take a LOT of time.
by MathPassionForever, Dec 4, 2019, 8:07 PM
New Post ??
by gamerrk1004, Nov 24, 2019, 6:43 AM
When are you releasing the article on Algebraic to Geometric inequalities?
by Math-wiz, Nov 5, 2019, 8:43 AM
HIGH LAVIL ... Not for me
by gamerrk1004, Oct 15, 2019, 12:40 PM
I found the properties actually!
I'd like to see some more geo posts
by Physicsknight, Oct 9, 2019, 7:57 PM
Chill, couldn't find that huge a compilation of properties anywhere
by MathPassionForever, Sep 28, 2019, 6:09 PM
Yayyy!!! Geo Posts!!!
I earlier thought that we made a groundbreaking discovery of the Dumpty Parabola, but bery sad to know that it was already known, namely Artzt Parabola
by AlastorMoody, Sep 27, 2019, 7:52 PM
Shocked!!!!
by Math-wiz, Sep 10, 2019, 6:18 AM
HURRAAYYYY!! #MPF Hai Lavil!! Next Post geo?!!
by AlastorMoody, Sep 9, 2019, 6:03 PM
yeeee this is nicer
by Hexagrammum16, Sep 5, 2019, 8:30 AM
Nice blog!
by Mathotsav, Sep 4, 2019, 10:08 AM
Okay, maybe after yet another inequality post.
by MathPassionForever, Sep 4, 2019, 8:03 AM
Get back to geo please
by Hexagrammum16, Sep 4, 2019, 6:36 AM
Shout!!!
Expecting some very interesting stuff here
by Naruto.D.Luffy, Sep 3, 2019, 6:25 PM
$\frac{1}{\cos{C}}$ blog..
by Mr.Chagol, Aug 28, 2019, 9:44 AM
Let me try this shout thing too.(Nothing much to say as of now,..well, I hope to see some interesting stuff here).
by Mathotsav, Aug 28, 2019, 7:15 AM
With that kind of support, you can expect nonzero blog posts soon

Also, those who know what I shall be posting, don't spoil for the others
by MathPassionForever, Aug 23, 2019, 5:07 PM
Even before you get to write I'm shouting
by Hexagrammum16, Aug 23, 2019, 4:47 PM
No posts yet I'll give a shout
by Pluto1708, Aug 23, 2019, 3:37 PM

29 shouts

What's in the name?

Mesmerising Isogonals

by MathPassionForever, Sep 27, 2019, 2:59 PM