Concept:The exterior angle of a triangle is equal to the sum of its two opposite interior angles.
The sum of all interior angles in a triangle is always 180 degrees.
Explanation:We are given that one exterior angle of a triangle is
84°.
We are also told that the two interior opposite angles are in the ratio
1:2.
Let the two interior opposite angles be
x and
2x.
According to the property of exterior angles, the sum of these two interior opposite angles must be equal to the exterior angle.
So, we can write the equation:
x+2x=84°.
Combining the terms, we get
3x=84°.
To find the value of
x, we divide
84° by
3:
x=384°=28°.
So, the first interior opposite angle is
x=28°.
The second interior opposite angle is
2x=2×28°=56°.
Now we have two angles of the triangle:
28° and
56°.
To find the third angle of the triangle, we use the fact that the sum of all interior angles in a triangle is
180°.
Let the third angle be
y. Then,
28°+56°+y=180°.
Adding the known angles, we get
84°+y=180°.
Subtracting
84° from both sides to find
y:
y=180°−84°=96°.
Therefore, the angles of the triangle are
28°,
56°, and
96°.
Answer:The angles of the triangle are 28°, 56°, 96°.