A positive acute angle is divided into two parts whose tangents are `1/2 and 1/3.` Then the angle is

A positive acute angle is divided into two parts whose tangents are (1)/(8)and(7)/(9) . What is the value of this angle ?

If angle theta is divided into two parts such that the tangents of one part is lambda xx the tangent of other,and phi is their difference,then show that sin theta=(lambda+1)/(lambda-1)sin phi

Two acute angles are congruent

If an angle theta is divided into two parts A and B such that A-B=x and tan A:tan B=k:1, then the value of sink is

The base of a triangle is divided into three equal parts.If t_(1),t_(2),t_(3) are the tangents of the angles subtended by these parts at the opposite vertex,prove that ((1)/(t_(1))+(1)/(t_(2)))((1)/(t_(2))+(1)/(t_(3)))=4(1+(1)/(t_(2)^(2)))

Find the angle between the lines whose slope are (1)/(2) and 3.

(The tangents of two acute angles are 3 and 2, The sine of twice their difference is

A non right angle bisector of a right angled isosceles triangle divide the triangle in those two parts, whose area are in the ratio.

If an angle alpha be divided into two parts such that the ratio of tangents of the parts is K. If x be the difference between the two parts , then prove that sinx = (K-1)/(K+1) sin alpha .

The acute angle between the lines whose direction ratios are 1, 2, 2 and -3, 6, -2 is