17.3 CHAPTER 17. TRIGONOMETRY
and that cos θ is defined as:
cos θ =
adjacent
hypotenuse
Therefore, we can writetan θ =
opposite
hypotenuse×
hypotenuse
adjacent= sin θ×1
cos θ
=
sin θ
cos θTiptanθ can also be de-
fined as:
tanθ=
sinθ
cosθA Trigonometric Identity EMBDC
One of the most usefulresults of the trigonometric functions is that theyare related to each other. We
have seen that tan θ can be written in termsof sin θ and cos θ. Similarly, we shall show that:
sin^2 θ + cos^2 θ = 1We shall start by considering�ABC,�
A�
B�C
θWe see that:
sin θ =AC
BC
and
cos θ =AB
BC
.
We also know from theTheorem of Pythagorasthat:
AB^2 + AC^2 = BC^2.So we can write:sin^2 θ + cos^2 θ =�
AC
BC
� 2
+
�
AB
BC
� 2
=
AC^2
BC^2
+
AB^2
BC^2
=
AC^2 + AB^2
BC^2
=
BC^2
BC^2
(from Pythagoras)
= 1