INTRODUCTION TO TRIGONOMETRY 125B
a^2 =b^2 +c^2 − 2 bccosA
or b^2 =a^2 +c^2 − 2 accosB
or c^2 =a^2 +b^2 − 2 abcosCThe rule may be used only when:
(i) 2 sides and the included angle are initially given,
or
(ii) 3 sides are initially given.
12.8 Area of any triangle
Thearea of any trianglesuch asABCof Fig. 12.19
is given by:
(i)^12 ×base×perpendicular height, or(ii)^12 absinCor^12 acsinBor^12 bcsinA,or(iii)√
[s(s−a)(s−b)(s−c)], wheres=a+b+c
212.9 Worked problems on the solution
of triangles and finding their
areasProblem 21. In a triangle XYZ,∠X= 51 ◦,
∠Y= 67 ◦andYZ= 15 .2 cm. Solve the triangle
and find its area.The triangleXYZ is shown in Fig. 12.20. Since
the angles in a triangle add up to 180◦, then
Z= 180 ◦− 51 ◦− 67 ◦= 62 ◦. Applying the sine rule:
15. 2
sin 51◦=y
sin 67◦=z
sin 62◦Using15. 2
sin 51◦=y
sin 67◦and transposing gives:y=15 .2 sin 67◦
sin 51◦=18.00 cm=XZUsing
15. 2
sin 51◦=z
sin 62◦and transposing gives:z=15 .2 sin 62◦
sin 51◦=17.27 cm=XYFigure 12.20Area of triangleXYZ=^12 xysinZ
=^12 (15.2)(18.00) sin 62◦=120.8 cm^2 (or area
=^12 xzsinY=^12 (15.2)(17.27) sin 67◦=120.8 cm^2 ).
It is always worth checking with triangle problems
that the longest side is opposite the largest angle, and
vice-versa. In this problem,Yis the largest angle and
XZis the longest of the three sides.Problem 22. Solve the triangle PQR and
find its area given thatQR= 36 .5 mm,PR=
29.6 mm and∠Q= 36 ◦.TrianglePQRis shown in Fig. 12.21.Figure 12.21Applying the sine rule:29. 6
sin 36◦=36. 5
sinPfrom which,sinP=36 .5 sin 36◦
29. 6= 0. 7248HenceP=sin−^10. 7248 = 46 ◦ 27 ′or 133◦ 33 ′.
WhenP= 46 ◦ 27 ′andQ= 36 ◦then
R= 180 ◦− 46 ◦ 27 ′− 36 ◦= 97 ◦ 33 ′.
WhenP= 133 ◦ 33 ′andQ= 36 ◦then
R= 180 ◦− 133 ◦ 33 ′− 36 ◦= 10 ◦ 27 ′.
Thus, in this problem, there aretwoseparate sets
of results and both are feasible solutions. Such a
situation is called theambiguous case.