Advertisements
Advertisements
प्रश्न
The exterior angles, obtained on producing the base of a triangle both way are 104° and 136°. Find all the angles of the triangle.
Advertisements
उत्तर
In the given problem, the exterior angles obtained on producing the base of a triangle both ways are 104° and 136°. So, let us draw ΔABC and extend the base BC, such that:
∠ACD = 104°
∠ABE = 136°
Here, we need to find all the three angles of the triangle.
Now, since BCD is a straight line, using the property, “angles forming a linear pair are supplementary”, we get
∠ACB + ∠ADC = 180°
∠ACB + 104° = 180°
∠ACB = 180° – 104°
∠ACB = 76°
Similarly, EBC is a straight line, so we get,
∠ABC + ∠ABE = 180°
∠ABC + 136° = 180°
∠ABC = 44
Further, using angle sum property in ΔABC
∠ABC + ∠ACB + ∠BAC = 180°
44 + 76 + ∠BAC = 180°
∠ABC = 180° – 120°
∠ABC = 60°
Therefore, ∠ACB = 76°, ∠BAC = 60°, ∠ABC = 44°.
APPEARS IN
संबंधित प्रश्न
In the given figure, AM ⊥ BC and AN is the bisector of ∠A. If ∠B = 65° and ∠C = 33°, find ∠MAN.
In Δ ABC, BD⊥ AC and CE ⊥ AB. If BD and CE intersect at O, prove that ∠BOC = 180° − A.
If the side BC of ΔABC is produced on both sides, then write the difference between the sum of the exterior angles so formed and ∠A.
In ΔABC, ∠B = ∠C and ray AX bisects the exterior angle ∠DAC. If ∠DAX = 70°, then ∠ACB =
In a triangle, an exterior angle at a vertex is 95° and its one of the interior opposite angle is 55°, then the measure of the other interior angle is
State, if the triangle is possible with the following angles :
40°, 130°, and 20°
One of the base angles of an isosceles triangle is 52°. Find its angle of the vertex.
Can a triangle together have the following angles?
33°, 74° and 73°
One of the angles of a triangle is 65°. If the difference of the other two angles is 45°, then the two angles are
Can we have two acute angles whose sum is a straight angle? Why or why not?
