Find the coordinates that the straight lines `y=m_1x+c_1, y=m_2x+c_2a n d\ y=m_2x+c_3` may meet in a point.

Find the coordinates that the straight lines y=m_(1)x+c_(1),y=m_(2)x+c_(2) and y=m_(2)x+c_(3) may meet in a point.

If the lines whose equations are y=m_1 x+ c_1 , y = m_2 x + c_2 and y=m_3 x + c_3 meet in a point, then prove that : m_1 (c_2 - c_3) + m_2 (c_3 - c_1) + m_3 (c_1 - c_2) =0

Find the value of m so that the straight lines y=x+1, y=2 (x+1) and y=mx+3 are concurrent.

(i) Find the value of 'a' if the lines 3x-2y+8=0 , 2x+y+3=0 and ax+3y+11=0 are concurrent. (ii) If the lines y=m_(1)x+c_(1) , y=m_(2)x+c_(2) and y=m_(3)x+c_(3) meet at point then shown that : c_(1)(m_(2)-m_(3))+c_(2)(m_(3)-m_(1))+c_(3)(m_(1)-m_(2))=0

Write the integral values of m for which the x-coordinates of the point of intersectioin of eh lines y=m x+1\ a n d\ 3x+4y=9 is an integer.

If m_(1) and m_(2) are the roots of the equation x^(2)-ax-a-1=0 then the area of the triangle formed by the three straight lines y=m_(1)xy=m_(2)x and y=a is

If three lines whose equations are y=m_(1)x+c_(1),y=m_(2)x+c_(2) and y=m_(3)x+c_(3) are concurrent,then show that m_(1)(c_(2)-c_(3))+m_(2)(c_(3)-c_(1))+m_(3)(c_(1)-c_(2))=0

The lines y=m_(1)x,y=m_(2)x, and y=m_(3)x make equal in-tercepts on the line x+y=1 . then