Home
Class 11
MATHS
In any triangle ABC prove that (a^(2)sin...

In any triangle ABC prove that `(a^(2)sin(B-C))/(sinA)+(b^(2)sin(C-A))/(sinB)+(c^(2)sin(A-B))/(sinC)=0`

Text Solution

Verified by Experts

The correct Answer is:
0
Promotional Banner

Topper's Solved these Questions

  • SAMPLE PAPER -17

    FULL MARKS|Exercise PART -III|10 Videos

  • SAMPLE PAPER -17

    FULL MARKS|Exercise PART -IV|7 Videos

  • SAMPLE PAPER -17

    FULL MARKS|Exercise PART -IV|7 Videos

  • SAMPLE PAPER - 3

    FULL MARKS|Exercise PART - IV|7 Videos

  • SAMPLE PAPER -19

    FULL MARKS|Exercise SAMPLE PAPER UNSOLVED-19(IV)|6 Videos

Similar Questions

Explore conceptually related problems

Prove that (a^2sin(B-C))/(sinb+sinC)+(b^2"sin"(C-A))/(sinC+sinA)+(c^2"sin"(A-B))/(sinA+sinB)=0

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

Show that [suma^2 sin(B-C)]/sinA = 0

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

In any triangle ABC, prove that sin^3Acos(B-C)+sin^3Bcos(C-A)+sin^3Ccos(A-B)=3sinAsinBsinC

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

Prove that: (sin(B-C))/(cosBcosC)+(sin(C-A))/(cosCcosA)+(sin(A-B))/(cosAcosB)=0

In any triangle prove that a^2 =(b+c)^2 sin^2 (A/2) +(b-c)^2 cos^2 (A/2)

Prove that (sin (A-B))/(sin (A+B))=(a^(2)-b^(2))/(c^(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))