Advertisements
Advertisements
प्रश्न
In the given figure, side BC of ΔABC is produced to point D such that bisectors of ∠ABC and ∠ACD meet at a point E. If ∠BAC = 68°, find ∠BEC.
Advertisements
उत्तर
In the given figure, bisectors of ∠ABC and ∠ACD meet at E and ∠BAC = 68°
We need to find ∠BEC
Here, using the property: an exterior angle of the triangle is equal to the sum of the opposite interior angles.
In ΔABC with ∠ACD as its exterior angle
exterior ∠ACD = ∠A +∠ABC ........(1)
Similarly, in ΔBE with ∠ECD as its exterior angle
exterior ∠ECD = ∠EBC + ∠BEC
`1/2 ∠"ACD" = 1/2 ∠"ABC" + ∠"BEC"` (CE and BE are the bisectors of ∠ACD and) ∠ABC
`∠"BEC" = 1/2 ∠"ACD" - 1/2 ∠"ABC"` ........(2)
Now, multiplying both sides of (1) by 1/2
We get,
`1/2 ∠"ACD" = 1/2 ∠"A" +1/2 ∠"ABC"`
`1/2 ∠"A" = 1/2 ∠"ACD" - 1/2∠"ABC"` ........(3)
From (2) and (3) we get,
`∠"BEC" = 1/2 ∠"A"`
`∠"BEC" = 1/2(68°)`
∠BEC = 34°
Thus, ∠BEC = 34°
APPEARS IN
संबंधित प्रश्न
Can a triangle have All angles more than 60°? Justify your answer in case.
Compute the value of x in the following figure:
Is the following statement true and false :
A triangle can have at most one obtuse angles.
In the given figure, AB divides ∠DAC in the ratio 1 : 3 and AB = DB. Determine the value of x.
In the given figure, AE bisects ∠CAD and ∠B= ∠C. Prove that AE || BC.
State, if the triangle is possible with the following angles :
20°, 70°, and 90°
One angle of a right-angled triangle is 70°. Find the other acute angle.
Classify the following triangle according to sides:
The length of the sides of the triangle is given. Say what types of triangles they are 4.3 cm, 4.3 cm, 4.3 cm.
How many angles are there inside a triangle?
