Answer:
67.4 degrees
Explanation:
We are given a right angled triangle,and with respect to x as theta,in which:
- Perpendicular = Let us find.
- Base = 5 units
- Hypotenuse = 13 units
To find:
Angle x as given in figure
To proceed,let us find the perpendicular.
Since the given figure is a right angled triangle, we can apply the pythagoras theorem,which says:
where a and b are legs of the triangle and c is the hypotenuse.
Putting the values,
- 5² + perpendicular² = 13²
On solving,
- 25 + p² = 169
- p² = 169-25 = 144 = 12²
On taking square root on both sides,
Hence perpendicular = 12 units
We know,tan∅ = Perpendicular/base
Putting the values,we get:
tan∅ = 12/5
Transposing tan to RHS:
∅ = 12/5*tan^-1
∅ = 67.4(To the nearest tenth)