In a DeltaABC, prove that a sin ((A)/(...

In a `Delta`ABC, prove that
a sin `((A)/(2) + B) = (b + c) sin ""(A)/(2)`

Verified by Experts

The correct Answer is:

`a sin ((A)/(2) + B)`

TRIGONOMETRY
SURA PUBLICATION|Exercise EXERCISE 3.10|16 Videos
TRIGONOMETRY
SURA PUBLICATION|Exercise EXERCISE 3.11|6 Videos
TRIGONOMETRY
SURA PUBLICATION|Exercise EXERCISE 3.8|18 Videos
SURAS MODEL QUESTION PAPER -2
SURA PUBLICATION|Exercise section -IV|7 Videos
TWO DIMENSIONAL ANALYTICAL GEOMETRY
SURA PUBLICATION|Exercise ADDITIONAL PROBLEMS - SECTION - D|3 Videos

Similar Questions

Explore conceptually related problems

In a Delta ABC, prove that a ( cos B + cos C) = 2 (b + c) sin^(2)""(A)/(2)

In a Delta ABC, prove that (a sin(B - C))/(b^(2) - c^(2)) = (b sin (C - A))/(c^(2) - a^(2)) = (c sin (A - B))/(a^(2) - b^(2))

In a Delta ABC, prove that (a^(2) - c^(2))/(b^(2)) = (sin (A - C))/(sin(A + C))

In a triangleABC," prove that sin" ((B-C)/(2))=(b-c)/(a) cos""A/2 .

Sine formula: With usual notation in a Delta ABC Prove that (a)/(sin A)= (b)/(sinB)= (c)/(sin C)

In a Delta ABC, prove that (a + b)/(a - b) = tan ((A + B)/(2)) cot ((A - B)/(2))

In a triangle ABC, prove that b^(2) sin 2C+c^(2) sin 2B=2bc sin A .

In Delta ABC , prove that (a - b)^(2) cos^(2).(C)/(2) + (a + b)^(2) sin^(2).(C)/(2) = c^(2)