Given A(0,0) and B(x,y) with x`in`(0,1) and y>0. Let the slope of line AB be `m_1`. Point C lies on line `x=1` such that the slope of BC is equal to `m_2` where` 0ltm_2ltm_1`. If the area of triangle ABC can be expressed as `(m_1-m_2)f(x)` then the largest possible value of x is

Given A (0, 0) and B (x,y) with x epsilon (0,1) and y>0 . Let the slope of the line AB equals m_1 Point C lies on the line x= 1 such that the slope of BC equals m_2 where 0< m_2< m_1 If the area of the triangle ABC can expressed as (m_1- m_2)f(x) , then largest possible value of f(x) is:

If the line y=mx meets the lines x+2y-1=0 and 2x-y+3=0 at the same point, then m is equal to

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

The slopes of the tangents to the curve y=(x+1)(x-3) at the points where it cuts the x - axis, are m_(1) and m_(2) , then the value of m_(1)+m_(2) is equal to

A family of curves is such that the slope of normal at any point (x, y) is 2(1-y). The area bounded by the curve y = f(x) of question number 1 and the line x+2y = 0 is

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:

Let ABC be an isosceles triangle with AB = BC. If base BC is parallel to x-axis and m_1 and m_2 are the slopes of medians drawn through the angular points B and C, then

Let f(x)=ax^(2)+bx + c , where a in R^(+) and b^(2)-4ac lt 0 . Area bounded by y = f(x) , x-axis and the lines x = 0, x = 1, is equal to :

If m be the slope of common tangent of y = x^2 - x + 1 and y = x^2 – 3x + 1 . Then m is equal to

The line y=m x bisects the area enclosed by the curve y=1+4x-x^2 and the lines x=0,x=3/2 and y=0. Then the value of m is