The area of the triangle whose sides `y=m_1 x + c_1 , y = m_2 x + c_2 and x=0` is

Show that the area of the triangle formed by the lines y=m_1x+c_1,""""y=m_2x+c_2 and x=0 is ((c_1-c_2)^2)/(2|m_1-m_2|)

Show that the area of the triangle formed by the lines y=m_1x+c_1,""""y=m_2x+c_2 and x=0 is ((c_1-c_2)^2)/(2|m_1-m_2|)

Find the vertices and the area of the triangle whose sides are x=y, y=2x and y=3x+4 .

If m_(1),m_(2) be the roots of the equation x^(2)+(sqrt(3)+2)x+sqrt(3)-1 =0 , then the area of the triangle formed by the lines y = m_(1)x,y = m_(2)x and y = 2 is

Show that the area of the triangle formed buy the lines y=m_1x , y=m_2x\ a n d\ y=c is equal to (c^2)/4(sqrt(33)+sqrt(11))w h e r e\ m_1,\ m_2 are the roots of the equation x ^2+(sqrt(3)+2)x+sqrt(3)-1=0.

If m_1 and m_2 are roots of equation x^2+(sqrt(3)+2)x+sqrt(3)-1=0 the the area of the triangle formed by lines y=m_1x, y = m_2x, y=c is:

Find the area of the triangle whose sides are: 3x-2y+1=0, 3x+y+4=0 and 3x-5y+34=0

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

If m_1 and m_2 are the roots of the equation x^2-a x-a-1=0 , then the area of the triangle formed by the three straight lines y=m_1x ,y=m_2x , and y=a(a!=-1) is (a^2(a+2))/(2(a+1))ifa >-1 (-a^2(a+2))/(2(a+1))ifa >-1 (-a^2(a+2))/(2(a+1))if-2

Find the vertices of the triangle whose sides are y+2x=3, 4y+x=5 and 5y+3x=0