Trigonometry/Area of a quadrilateral

Take any quadrilateral ABCD. Write AB=a, BC=b, CD=c, DA=a; σ = ¹⁄₂(a+b+c+d); area of ABCD = S.

Note that a+b+c-d = 2(σ-d) and similarly for the other sides.

The diagonals of ABCD are AC and BD. Let the angle between them be θ. Then S = ¹⁄₂AC.BD.sin(θ).

If ABCD is convex and the diagonals intersect at P, this is easily proved by considering the four triangles ABP, BCP, CDP, DAP since S is the sum of the areas of these four triangles. IF ABCD is not convex, then one of the vertices, say C, must lie inside the triangle ABD. We then find S as the area of ABD less the area of BCD.

Let angle A+C = 2α. To find S in terms of the sides and alpha;.

We can find BD² by applying the cosine theorem to either of the triangles BAD, BCD. This means that

a²+d²-2ad.cos(A) = b²+c²-2bc.cos(C)

so

a²+d²-b²-c² = 2ad.cos(A)-2bc.cos(C) ... (i)

Also

S = area(BAD) + area(BCD) = ¹⁄₂ad.sin(A) + ¹⁄₂bc.sin(C)

so

4S = 2ad.sin(A) + 2bc.sin(C) ... (ii)

Taking (ii)² + (i)²,

16S² + (a²+d²-b²-c²)² = 4a²d² + 4b²c² - 8abcd.cos(A+C)

But

cos(A+C) = cos(2α) = 2cos²(α)-1

so

16S² = 4(ad+bc)² - (a²+d²-b²-c²)² - 16abcd.cos²(α).

Simplifying,

S² = (σ-a)(σ-b)(σ-c)(σ-d) - abcd.cos²(α).

This expression becomes even simpler for a cyclic quadrilateral, because then cos(α) = 0 so the last term disappears.

The diagonals and circumradius of a cyclic quadrilateral[edit | edit source]

In the expression (i) above, for a cyclic quadrilateral cos(C) = -cos(A), so

${\displaystyle 2(ad+bc)\cos(A)=a^{2}+d^{2}-b^{2}-c^{2}}$.

From the cosine theorem,

${\displaystyle BD^{2}=a^{2}+d^{2}-2ad.\cos(A)=a^{2}+d^{2}-{\frac {ad(a^{2}+d^{2}-b^{2}-c^{2})}{ad+bc}}={\frac {(ab+cd)(ac+bd)}{ad+bc}}}$.

Similarly,

${\displaystyle AC^{2}={\frac {(ab+cd)(ad+bc)}{ab+cd}}}$.

Thus AC.BD = ac+bd (as we already knew) and

${\displaystyle {\frac {AC}{BD}}={\frac {ad+bc}{ab+cd)}}}$.

The circumcircle of ABCD is also the circumcircle of triangle ABD, so

${\displaystyle R={\frac {BD}{2\sin(A)}}={\frac {(ad+bc)BD}{2(ad+bc)\sin(A)}}={\frac {(ad+bc)BD}{4S}}={\frac {1}{4S}}{\sqrt {(ab+cd)(ac+bd)(ad+bc)}}}$.

${\displaystyle \tan ^{2}\left({\frac {B}{2}}\right)={\frac {(\sigma -a)(\sigma -b)}{(\sigma -c)(\sigma -d)}}}$.

Further results[edit | edit source]

If a quadrilateral is circumcyclic, i.e. such that a circle can be inscribed in it touching all four sides, then a+c=b+d. This is easily proved by noting that the lengths of the two tangents from a point to a circle are equal in length.

The radius of the inscribed circle is called the inradius and equals S/σ.

Theorem: If a quadrilateral ABCD is both cyclic and circumcyclic, then

${\displaystyle \tan ^{2}\left({\frac {A}{2}}\right)={\frac {bc}{ad}}}$.

Proof: Since ABCD is cyclic,

${\displaystyle \cos(A)={\frac {a^{2}+d^{2}-b^{2}-c^{2}}{2(ad+bc)}}}$.

Since a+c=b+d, a-d=b-c, i.e. a²+d²-b²-c² = 2(ad-bc). Thus

${\displaystyle \cos(A)={\frac {ad-bc}{ad+bc}}}$

${\displaystyle \tan ^{2}\left({\frac {A}{2}}\right)={\frac {1-\cos(A)}{1+\cos(A)}}={\frac {bc}{ad}}}$.

If a quadrilateral ABCD is both cyclic and circumcyclic, then its area is √(abcd) and inradius is 2√(abcd)/(a+b+c+d).

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