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Inradius

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The radius of a polygon's incircle or of a polyhedron's insphere, denoted r or sometimes rho (Johnson 1929). A polygon possessing an incircle is same to be inscriptable or tangential.

The inradius of a regular polygon with n sides and side length a is given by

r=1/2acot(pi/n).
(1)

The following table summarizes the inradii from some nonregular inscriptable polygons.

polygoninradius
3, 4, 5 triangle1
30-60-90 triangle1/4a(sqrt(3)-1)
bicentric quadrilateral(sqrt(abcd))/s
diamond(ab)/(sqrt(a^2+b^2))
golden triangle1/2bsqrt(5-2sqrt(5))
isosceles right trianglea(1-1/2sqrt(2))
isosceles triangle(a(sqrt(a^2+4h^2)-a))/(4h)
lozengea/(2sqrt(2))
rhombus(pq)/(2sqrt(p^2+q^2))
right triangle(ab)/(a+b+sqrt(a^2+b^2))
tangential quadrilateral(sqrt(p^2q^2-(a-b)^2(a+b-s)^2))/(2s)

For a triangle,

r=1/2sqrt(((b+c-a)(c+a-b)(a+b-c))/(a+b+c))
(2)
=Delta/s
(3)
=4Rsin(1/2A)sin(1/2B)sin(1/2C),
(4)

where Delta is the area of the triangle, a, b, and c are the side lengths, s is the semiperimeter, R is the circumradius, and A, B, and C are the angles opposite sides a, b, and c (Johnson 1929, p. 189). If two triangle side lengths a and b are known, together with the inradius r, then the length of the third side c can be found by solving (1) for c, resulting in a cubic equation.

Equation (◇) can be derived easily using trilinear coordinates. Since the incenter is equally spaced from all three sides, its trilinear coordinates are 1:1:1, and its exact trilinear coordinates are r:r:r. The ratio k of the exact trilinears to the homogeneous coordinates is given by

k=(2Delta)/(a+b+c)=Delta/s.
(5)

But since k=r in this case,

r=k=Delta/s,
(6)

Q.E.D.

Other equations involving the inradius include

r=(abc)/(4sR)
(7)
=(Delta^2)/(r_1r_2r_3)
(8)
=R(cosA+cosB+cosC-1)
(9)

where s is the semiperimeter, R is the circumradius, and r_i are the exradii of the reference triangle (Johnson 1929, pp. 189-191).

Let d be the distance between inradius r and circumradius R, d=rR^_. Then the Euler triangle formula states that

R^2-d^2=2Rr,
(10)

or equivalently

1/(R-d)+1/(R+d)=1/r
(11)

(Mackay 1886-87; Casey 1888, pp. 74-75). These and many other identities are given in Johnson (1929, pp. 186-190).

For a Platonic or Archimedean solid, the inradius r_d of the dual polyhedron can be expressed in terms of the circumradius R of the solid, midradius rho=rho_d, and edge length a as

r_d=(rho^2)/(sqrt(rho^2+1/4a^2))
(12)
=(R^2-1/4a^2)/R,
(13)

and these radii obey

Rr_d=rho^2.
(14)

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