Type of quartic plane curve
In geometry, the ampersand curve is a type of quartic plane curve . It was named after its resemblance to the ampersand symbol by Henry Cundy and Arthur Rollett. [ 1] [ 2]
This image shows an ampersand curve on the Cartesian plane. The ampersand curve is the graph of the equation
6 x 4 + 4 y 4 − 21 x 3 + 6 x 2 y 2 + 19 x 2 − 11 x y 2 − 3 y 2 = 0. {\displaystyle 6x^{4}+4y^{4}-21x^{3}+6x^{2}y^{2}+19x^{2}-11xy^{2}-3y^{2}=0.} The graph of the ampersand curve has three crunode points where it intersects itself at (0,0), (1,1), and (1,-1). [ 3] The curve has a genus of 0. [ 4]
The curve was originally constructed by Julius Plücker as a quartic plane curve that has 28 real bitangents , the maximum possible for bitangents of a quartic . [ 5]
It is the special case of the Plücker quartic
( x + y ) ( y − x ) ( x − 1 ) ( x − 3 2 ) − 2 ( y 2 + x ( x − 2 ) ) 2 − k = 0 , {\displaystyle (x+y)(y-x)(x-1)(x-{\tfrac {3}{2}})-2(y^{2}+x(x-2))^{2}-k=0,} with k = 0. {\displaystyle k=0.}
The curve has 6 real horizontal tangents at
( 1 2 , ± 5 2 ) , {\displaystyle \left({\frac {1}{2}},\pm {\frac {\sqrt {5}}{2}}\right),} ( 159 − 201 120 , ± 1389 + 67 67 / 3 40 ) , {\displaystyle \left({\frac {159-{\sqrt {201}}}{120}},\pm {\frac {\sqrt {1389+67{\sqrt {67/3}}}}{40}}\right),} ( 159 + 201 120 , ± 1389 − 67 67 / 3 40 ) . {\displaystyle \left({\frac {159+{\sqrt {201}}}{120}},\pm {\frac {\sqrt {1389-67{\sqrt {67/3}}}}{40}}\right).} And 4 real vertical tangents at ( − 1 10 , ± 23 10 ) {\displaystyle \left(-{\tfrac {1}{10}},\pm {\tfrac {\sqrt {23}}{10}}\right)} ( 3 2 , 3 2 ) . {\displaystyle \left({\tfrac {3}{2}},{\tfrac {\sqrt {3}}{2}}\right).}
It is an example of a curve that has no value of x in its domain with only one y value.
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