If the sines of the angles A and B of a ...

If the sines of the angles A and B of a triangle ABC satisfy the equation `c^2x^2-c(a+b)x+a b=0` , then the triangle a)acute angled b)right angled c)obtuse angled d)`sinA+cosA`= `((a+b))/c`

Similar Questions

Explore conceptually related problems

Find the angle A in triangle ABC, if angle B=60^∘ and angle c=70^∘

The sides of A B C satisfy the equation 2a^2+4b^2+c^2=4a b+2a cdot Then the triangle a)isosceles the triangle b)obtuse c) B=cos^(-1)(7/8) d) A=cos^(-1)(1/4)

If one side of a triangle is double the other, and the angles on opposite sides differ by 60^0, then the triangle is equilateral (b) obtuse angled (c) right angled (d) acute angled

In a triangle ABC , if angle A=60 , a=5,b=4 then c is a root of the equation

If the sides of a right angled triangle are in A.P then the sines of the acute angles are

The angles of a triangle ABC, are in Arithmetic progression and if b : c = sqrt(3) : sqrt(2), "find "angleA

If a, b, c are the sides of a triangle ABC such that x^2+2(a+b+c)x+3lambda(a b+b c+c a)=0 has real roots.then

If in a triangle A B C , (2cosA)/a+(cos B)/b+(2cosC)/c=a/(b c)+b/(c a) , then prove that the triangle is right angled.

If A, B, C are the angles of a triangle such that sin^(2)A+sin^(2)B=sin^(2)C , then

If the sines of the angles A and B of a triangle ABC satisfy the equation `c^2x^2-c(a+b)x+a b=0` , then the triangle a)acute angled b)right angled c)obtuse angled d)`sinA+cosA`= `((a+b))/c`

Similar Questions

Recommended Questions