In order to answer this question, the figure in the first picture will be helpful to understand what a right triangle is. Here, a right angle refers to [tex]90\°[/tex].
However, if we want to solve the problem we have to know certain things before:
In the second figure is shown a general right triangle with its three sides and another given angle, we will name it [tex]\alpha[/tex]:
- The side opposite to the right angle is called The Hypotenuse (h)
- The side opposite to the angle [tex]\alpha[/tex] is called the Opposite (O)
- The side next to the angle [tex]\alpha[/tex] is called the Adjacent (A)
So, going back to the triangle of our question (first figure):
Now, if we want to find the length of each side of a right triangle, we have to use the Pythagorean Theorem and Trigonometric Functions:
Pythagorean Theorem
[tex]h^{2}=A^{2} +O^{2}[/tex] (1)
Trigonometric Functions (here are shown three of them):
Sine: [tex]sin(\alpha)=\frac{O}{h}[/tex] (2)
Cosine: [tex]cos(\alpha)=\frac{A}{h}[/tex] (3)
Tangent: [tex]tan(\alpha)=\frac{O}{A}[/tex] (4)
In this case the function that works for this problem is cosine (3), let’s apply it here:
[tex]cos(40\°)=\frac{AC}{h}[/tex]
[tex]cos(40\°)=\frac{15}{h}[/tex] (5)
And we will use the Pythagorean Theorem to find the hypotenuse, as well:
[tex]h^{2}=AC^{2}+BC^{2}[/tex]
[tex]h^{2}=15^{2}+BC^{2}[/tex] (6)
[tex]h=\sqrt{225+BC^2}[/tex] (7)
Substitute (7) in (5):
[tex]cos(40\°)=\frac{15}{\sqrt{225+BC^2}}[/tex]
Then clear BC, which is the side we want:
[tex]{\sqrt{225+BC^2}}=\frac{15}{cos(40\°)}[/tex]
[tex]{{\sqrt{225+BC^2}}^2={(\frac{15}{cos(40\°)})}^2[/tex]
[tex]225+BC^{2}=\frac{225}{{(cos(40\°))}^2}[/tex]
[tex]BC^2=\frac{225}{{(cos(40\°))}^2}-225[/tex]
[tex]BC=\sqrt{158,41}[/tex]
[tex]BC=12.58[/tex]
Finally [tex]BC[/tex] is approximately 13 cm
