Answer:
[tex]\sin \theta = -\frac{15}{17}[/tex]
Step-by-step explanation:
Given the point (8, -15) is on the terminal side of an angle [tex]\theta[/tex].
To find the value of [tex]\sin \theta[/tex].
As the point (8, -15) lies in the fourth quadrant where [tex]\sin \theta < 0[/tex]
In a right angle triangle;
here, adjacent side = x = 8 units and Opposite side = y = -15 units
Using Pythagoras theorem;
[tex](Hypotenuse side)^2 = (Adjacent side)^2+(Opposite side)^2[/tex]
Substitute the given values we have;
[tex](Hypotenuse side)^2 = (8)^2+(-15)^2[/tex]
[tex](Hypotenuse side)^2 = 64+ 225 = 289[/tex]
[tex]Hypotenuse side = \sqrt{289} =17 units[/tex]
Sine ratio is defined as in the right angle triangle, the ratio of opposite side to Hypotenuse side.
[tex]\sin \theta = \frac{Opposite side}{Hypotenuse side}[/tex]
then;
[tex]\sin \theta = -\frac{15}{17}[/tex]
therefore, the value of [tex]\sin \theta[/tex] is [tex] -\frac{15}{17}[/tex].
