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https://mathworld.wolfram.com/Ball.html

Ball -- from Wolfram MathWorld

The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...



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Ball -- from Wolfram MathWorld

https://mathworld.wolfram.com/Ball.html

The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...



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https://mathworld.wolfram.com/Ball.html

Ball -- from Wolfram MathWorld

The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...

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      Ball -- from Wolfram MathWorld
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      The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...
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      The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...

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      Ball -- from Wolfram MathWorld
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      The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...

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      Ball -- from Wolfram MathWorld
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      The n-ball, denoted B^n, is the interior of a sphere S^(n-1), and sometimes also called the n-disk. (Although physicists often use the term "sphere" to mean the solid ball, mathematicians definitely do not!) The ball of radius r centered at point {x,y,z} is implemented in the Wolfram Language as Ball[{x, y, z}, r]. The equation for the surface area of the n-dimensional unit hypersphere S^n gives the recurrence relation S_(n+2)=(2piS_n)/n. (1) Using Gamma(n+1)=nGamma(n) then...
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