The sides of a triangle are `3x + 4y, 4x + 3y` and `5x+5y` units, where `x gt 0, y gt 0`. The triangle is

If the equations of three sides of a triangle are x+y=1, 3x + 5y = 2 and x - y = 0 then the orthocentre of the triangle lies on the line/lines

The equation of the sides of a triangle are x+2y+1=0, 2x+y+2=0 and px+qy+1=0 and area of triangle is Delta .

The sides of a triangle are given by : x-2y+9=0, 3x + y-22 =0 and x + 5y+2=0. Find the vertices of the triangle.

The equations of two sides of a triangle are 3x-2y+6=0\ a n d\ 4x+5y-20\ a n d\ the orthocentre is (1,1). Find the equation of the third side.

Add: 3x + 5y -4,-9x + 4y and 2x-5y+7.

The three sides AB, BC, CA of a triangle are 5x - 3y +2 = 0,x-3y-2=0 and x+y-6=0 respectively. Find equation of the altitude through the vertex A.

If (a,a^(2)) falls inside the angle made by the lines y=(x)/(2), x gt 0 and y=3x, x gt 0 , then a belongs to the interval

The sides of a triangle have the combined equation x^2-3y^2-2x y+8y-4=0 . The third side, which is variable, always passes through the point (-5,-1) . Find the range of values of the slope of the third line such that the origin is an interior point of the triangle.

Orthocentre of the triangle formed by the lines xy-3x-5y+15=0 and 3x+5y=15 is

statement 1: incentre of the triangle formed by the lines whose 3x+4y = 0 , 5x-12y=0 and y - 15 = 0 is the point P whose co-ordinates are (1, 8) . Statement- 2: Point P is equidistant from the 3 lines forming the triangle.