Here, we want to get the values of the six trigonometric functions
Firstly, we need the measure of the third side of the triangle
Let us call this third side x
Mathematically, the square of the hypotenuse ( 4 root 2) is equal the sum of the two other sides
The above is the Pythagoras' theorem
Thus, we have it that;
[tex]\begin{gathered} (4\sqrt[]{2})^2=4^2+x^2 \\ 32=16+x^2 \\ x^2=\text{ 32-16} \\ x^2\text{ = 16} \\ x\text{ = 4} \end{gathered}[/tex]Thus, we have the opposite and the hypotenuse as 4
We start calculating the functions as follows;
a) Sine
This is the ratio of the opposite to the hypotenuse.
[tex]\sin \text{ }\theta\text{ = }\frac{4}{4\sqrt[]{2}}\text{ = }\frac{\sqrt[]{2}}{2}[/tex]b) Cosine
This is the ratio of the adjacent to the hypotenuse
Since the adjacent value id equal to the opposite, we have the sine and cosine equal
[tex]\text{cos }\theta\text{ = }\frac{4}{4\sqrt[]{2}\text{ }}\text{ = }\frac{\sqrt[]{2}}{2}[/tex]c) Tangent
This is the ratio of the opposite to the adjacent
We have this as;
[tex]\text{Tan }\theta\text{ = }\frac{4}{4}\text{ = 1}[/tex]d) Secant
This is the reciprocal of the cosine
Mathematicaly, it is the ratio of the hypotenuse to the adjacent
We have this as;
[tex]\sec \text{ }\theta\text{ = }\frac{4\sqrt[]{2}}{4}\text{ = }\sqrt[]{2}[/tex]e) Cosecant
This is the ratio of the hypotenuse to the opposite
Mathematically, we have this as;
[tex]co\sec \text{ }\theta\text{ = }\frac{4\sqrt[]{2}}{4}\text{ = }\sqrt[]{2}[/tex]f) Cot
This is the reciprocal of tan
It is the ratio of adjacent to the opposite
We have this as;
[tex]\cot \text{ }\theta\text{ = 1}[/tex]
