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:

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:

Given A(0,0) and B(x,y) with x varepsilon(0,1) and y>0. Let the slope of the line AB equals m_(1) Point Clies on the line x=1 such that the slope of BC equals m_(2) where 0

Given A(0, 0) and B(x, y) with x in (0, 1) and y gt 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 lt m_2 lt m_1 . If the area the triangle ABC can be expressed as (m_1 - m_2) f(x) , then find the largest possible value of f(x).

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 0 Correct OCR Text Search Crop and Search

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

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

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

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

The slope of the line a^(2)X - a Y + 1 =0 , where a is constant, is