Given the base of a triangle, the opposite angle A, and the product `k^(2)` of other two sides, show that it is not possible for a to be less than `2k "sin" (A)/(2)`

If in a triangle of base 'a', the ratio of the other two sides is r ( <1).Show that the altitude of the triangle is less than or equal to (ar)/(1-r^2)

A point on the hypotenuse of a triangle is at distance a and b from the side of the triangle. Show that the minimum length of the hypotenuse is (a^((2)/(3))+b^((2)/(3)))^((3)/(2)) .

If the equation of the base of an equilateral triangle is x+y=2 and the vertex is (2,-1) , then find the length of the side of the triangle.

The altitude of a right triangle is 7 cm less than its base. If the hypotenuse is 13 cm , find the other two sides.

If two angles and the included side of one triangled are euqal to two angles and the included side of the other triangle, prove that those two triangles are congruent.

Let A(h, k), B(1, 1) and C(2, 1) be the vertices of a right angled triangle with AC as its hypotenuse. If the area of the triangle is 1, then the set of values which k can take is given by (1) {1,""3} (2) {0,""2} (3) {-1,""3} (4) {-3,-2}

The measures of the sides of a right angle triangle are in A.P. The sum of sin e of two acute angles is…….

The base of an equilateral triangle with side 2a lies along the Y-axis such that the mid-point of the base is at the origin. Find vertices of the triangle.

In the given figure, ABD is a triangle right angled at A and AC bot BD . Show that AC^(2)= BC*DC

In the given figure, ABD is a triangle right angled at A and AC bot BD . Show that AD^(2)= BD*CD