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Beliebte Geometrie-Probleme

y^2=-28x	`y`²=−28`x`
(x^2)/5+(y^2)/9 =1	`x`²5 +`y`²9 =1
x^2+y^2-6y=0	`x`²+`y`²−6`y`=0
x^2+2y^2-8y=0	`x`²+2`y`²−8`y`=0
foki x^2-y^2=4	`foci` `x`²−`y`²=4
leitkurve y^2+6y-2x+13=0	`directrix` `y`²+6`y`−2`x`+13=0
scheitelpunkte (x^2)/(49)+(y^2)/(16)=1	`vertices` `x`²49 +`y`²16 =1
scheitelpunkte f(x)=x^2+2x-8	`vertices` `f`(`x`)=`x`²+2`x`−8
(x^2}{36}-\frac{y^2)/9 =1	`x`²36 −`y`²9 =1
achse y=x^2	`axis` `y`=`x`²
scheitelpunkte f(x)=x^2-4x-12	`vertices` `f`(`x`)=`x`²−4`x`−12
25y^2-36(x-8)^2=900	25`y`²−36(`x`−8)²=900
x^2+y^2-4=0	`x`²+`y`²−4=0
foki x=-1/2 (y+3)^2+1	`foci` `x`=−12 (`y`+3)²+1
asymptoten (x^2}{16}-\frac{y^2)/9 =1	`asymptotes` `x`²16 −`y`²9 =1
4x^2+9y^2=36	4`x`²+9`y`²=36
3x^2+6y^2=18	3`x`²+6`y`²=18
x^2=-12y	`x`²=−12`y`
y^2=4x	`y`²=4`x`
x^2=-8y	`x`²=−8`y`
y^2=-25x	`y`²=−25`x`
foki 9x^2+y^2=9	`foci` 9`x`²+`y`²=9
scheitelpunkte (x^2)/4-(y^2)/(16)=1	`vertices` `x`²4 −`y`²16 =1
scheitelpunkte f(x)=x^2+4x-5	`vertices` `f`(`x`)=`x`²+4`x`−5
scheitelpunkte x^2+9y^2+6x-90y+225=0	`vertices` `x`²+9`y`²+6`x`−90`y`+225=0
(x^2}{25}-\frac{y^2)/9 =1	`x`²25 −`y`²9 =1
(x^2}{49}+\frac{y^2)/9 =1	`x`²49 +`y`²9 =1
y^2-x^2=1	`y`²−`x`²=1
x^2+4y^2-6x+20y-2=0	`x`²+4`y`²−6`x`+20`y`−2=0
exzentrizität (x^2)/(25)+(y^2)/(16)=1	`eccentricity` `x`²25 +`y`²16 =1
((x-5)^2)/(12)-((y+6)^2)/(17)=1	(`x`−5)²12 −(`y`+6)²17 =1
-36y=x^2	−36`y`=`x`²
foki 5x^2+7y^2=35	`foci` 5`x`²+7`y`²=35
((x+3)^2}{25}-\frac{(y-4)^2)/9 =1	(`x`+3)²25 −(`y`−4)²9 =1
16x^2-96x+144+25y^2=400	16`x`²−96`x`+144+25`y`²=400
leitkurve x^2=20y	`directrix` `x`²=20`y`
scheitelpunkte x^2=4y	`vertices` `x`²=4`y`
x^2+y^2=8	`x`²+`y`²=8
x^2-6x+y^2-32y=0	`x`²−6`x`+`y`²−32`y`=0
(y-2)^2=8(x-1)	(`y`−2)²=8(`x`−1)
(y^2)/9-(x^2)/4 =1	`y`²9 −`x`²4 =1
leitkurve y=3x^2	`directrix` `y`=3`x`²
(x^2)/4+(y^2)/9 =1	`x`²4 +`y`²9 =1
((x-1)^2)/(25)+((y-3)^2)/(16)=1	(`x`−1)²25 +(`y`−3)²16 =1
scheitelpunkte 6x^2+12y-18=0	`vertices` 6`x`²+12`y`−18=0
x^2+8y+2x-23=0	`x`²+8`y`+2`x`−23=0
foki (x^2)/9+(y^2)/4 =1	`foci` `x`²9 +`y`²4 =1
scheitelpunkte f(x)=-2x^2	`vertices` `f`(`x`)=−2`x`²
x^2+2y^2=4	`x`²+2`y`²=4
x^2+4y^2=4	`x`²+4`y`²=4
x^2+4x+y^2-6y=-4	`x`²+4`x`+`y`²−6`y`=−4
foki x^2+x+1	`foci` `x`²+`x`+1
scheitelpunkte (x^2}{16}+\frac{y^2)/9 =1	`vertices` `x`²16 +`y`²9 =1
x^2+y^2-2x+6y+6=0	`x`²+`y`²−2`x`+6`y`+6=0
achse y=-x^2+4x+1	`axis` `y`=−`x`²+4`x`+1
25x^2+9y^2=225	25`x`²+9`y`²=225
scheitelpunkte (y^2}{64}-\frac{x^2)/9 =1	`vertices` `y`²64 −`x`²9 =1
x^2+4y^2-6x+16y+21=0	`x`²+4`y`²−6`x`+16`y`+21=0
x^2+y^2-6x+4y+9=0	`x`²+`y`²−6`x`+4`y`+9=0
scheitelpunkte f(x)=x^2-4x+3	`vertices` `f`(`x`)=`x`²−4`x`+3
((x-h)^2)/(a^2)+((y-k)^2)/(b^2)=1	(`x`−`h`)²`a`² +(`y`−`k`)²`b`² =1
x^2+y^2+4x-6y-3=0	`x`²+`y`²+4`x`−6`y`−3=0
(x^2}{25}-\frac{y^2)/4 =1	`x`²25 −`y`²4 =1
center 9x^2+16y^2=144	`center` 9`x`²+16`y`²=144
leitkurve y^2=-25x	`directrix` `y`²=−25`x`
foki (x^2)/4-(y^2)/9 =1	`foci` `x`²4 −`y`²9 =1
(x^2}{25}+\frac{y^2)/4 =1	`x`²25 +`y`²4 =1
x^2+y^2+8x+4y-3=40	`x`²+`y`²+8`x`+4`y`−3=40
y^2=-x	`y`²=−`x`
(x-2)^2+(y-2)^2=4	(`x`−2)²+(`y`−2)²=4
(x^2)/(25)+(y^2)/(25)=1	`x`²25 +`y`²25 =1
center x^2+y^2-2x+4y-31=0	`center` `x`²+`y`²−2`x`+4`y`−31=0
foki y^2=-36x	`foci` `y`²=−36`x`
foki x^2+(y^2)/(16)=1	`foci` `x`²+`y`²16 =1
x^2=-2y	`x`²=−2`y`
foki x=-2y^2	`foci` `x`=−2`y`²
x^2=20y	`x`²=20`y`
3x^2+y^2+18x-2y-8=0	3`x`²+`y`²+18`x`−2`y`−8=0
exzentrizität (x^2)/5+(y^2)/9 =1	`eccentricity` `x`²5 +`y`²9 =1
scheitelpunkte 3x^2+2y^2=6	`vertices` 3`x`²+2`y`²=6
foki (x^2)/(25)+(y^2)/(25)=1	`foci` `x`²25 +`y`²25 =1
y^2+20x+8y+56=0	`y`²+20`x`+8`y`+56=0
x^2+y^2<= 16	`x`²+`y`²≤ 16
scheitelpunkte f(x)=x^2+4x	`vertices` `f`(`x`)=`x`²+4`x`
foki (x^2)/4+(y^2)/(25)=1	`foci` `x`²4 +`y`²25 =1
2x-y^2=0	2`x`−`y`²=0
(x^2)/4+y^2=1	`x`²4 +`y`²=1
x^2+(y-2)^2=1	`x`²+(`y`−2)²=1
foki 16x^2+y^2=16	`foci` 16`x`²+`y`²=16
scheitelpunkte f(x)=x^2-2	`vertices` `f`(`x`)=`x`²−2
x^2+y^2-9=0	`x`²+`y`²−9=0
foki y^2=20x	`foci` `y`²=20`x`
(x^2)/(49)+(y^2)/(16)=1	`x`²49 +`y`²16 =1
((y-6)^2)/(64)-((x-8)^2)/(36)=1	(`y`−6)²64 −(`x`−8)²36 =1
asymptoten 9x^2-9y^2+18x+36y=63	`asymptotes` 9`x`²−9`y`²+18`x`+36`y`=63
scheitelpunkte f(x)=x^2+8x+12	`vertices` `f`(`x`)=`x`²+8`x`+12
(x^2)/(16)-(y^2)/(25)=1	`x`²16 −`y`²25 =1
x^2=28y	`x`²=28`y`
x=-y^2	`x`=−`y`²
asymptoten 9y^2-16x^2=81	`asymptotes` 9`y`²−16`x`²=81

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