If `a, b, and c` are the sides of a triangle and `A, B and C` are the angles opposite to `a, b,and c,` respectively, then `Delta=|(a^2,b sinA,csin A),(b sinA,1,cosA),(c sinA,cos A,1)|`

If a,b,and c are the side of a triangle and A,B and C are the angles opposite to a,b,and c respectively, then Delta=|{:(a^(2),bsinA,CsinA),(bsinA,1,cosA),(CsinA,cos A,1):}| is independent of

If a,b,and c are the side of a triangle and A,B and C are the angles opposite to a,b,and c respectively, then Delta=|{:(a^(2),bsinA,CsinA),(bsinA,1,cosA),(CsinA,cos A,1):}| is independent of

If a,b,and c are the side of a triangle and A,B and C are the angles opposite to a,b,and c respectively, then Delta=|{:(a^(2),bsinA,CsinA),(bsinA,1,cosA),(CsinA,cos A,1):}| is independent of

If a,b,and c are the side of a triangle and A,B and C are the angles opposite to a,b,and c respectively, then Delta=|{:(a^(2),bsinA,CsinA),(bsinA,1,cosA),(CsinA,cos A,1):}| is independent of

If a,b, and c are the sides of a triangle and A,B and C are the angles opposite to a,b, and c, respectively,then a^(2)quad b sin A,c sin Ab=det[[b sin A,1,cos Ac sin A,cos A,1]]

If a ,b ,and c are the sides of a triangles and A , B and C are the angles opposites to a ,b and c , respectively then "Delta"=|a^2b s in A c s in A bs in A1cos A cs in A cos A1| is independent of

If A ,Ba n dC are the vetices of a triangle A B C , then prove sine rule a/(sinA)=b/(sinB)=c/(sinC)dot

If A ,Ba n dC are the vetices of a triangle A B C , then prove sine rule a/(sinA)=b/(sinB)=c/(sinC)dot

If A ,Ba n dC are the vetices of a triangle A B C , then prove sine rule a/(sinA)=b/(sinB)=c/(sinC)dot

If A ,Ba n dC are the vetices of a triangle A B C , then prove sine rule a/(sinA)=b/(sinB)=c/(sinC)dot