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

The orthocenter of the triangle formed by the lines xy=0 and x+y=1 is

Area of the triangle formed by the lines y^2-9xy+18x^2=0 and y=9 is

Find the co-ordinates of the incentre of the triangle formed by the lines y -15 = 0, 12y - 5x =0 and 4y + 3x =0 .

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.

Area of the triangle formed by the lines y=2x, y=3x and y=5 is equal to (in square units) :

Prove that (-1, 4) is the orthocentre of the triangle formed by the lines whose equations are : x-y+1=0, x-2y + 4=0 and 9x - 3y + 1 =0.

If 2/(1 !3!)+2/(3!7!)+1/(3!5!)=2^m/(n!), then orthocentre of the triangle having sides x-y+1=0,x+y+3=0and 2x+5y-2=0 is

Find the area of the parallelogram formed by the lines 6x^2-5xy-6y^2=0 and 6x^2-5xy-6y^2+x+5y-1=0

Draw the graphs of the 5x-y=5 and 3x-y=3. Determine the co-ordinates of the vertices of the triangle formed by these lines and the y axis.