The graphs `y=2x^(3)-4x+2 and y=x^(3)+2x-1` intersect at exacty 3 distinct points. The slope of the line passing through two of these point is

The graphs y=2x^(3)-4x+2and y=x^(3)+2x-1 intersect in exactly 3 distinct points. Then find the slope of the line passing through two of these points.

The graphs y=2x^(3)-4x+2and y=x^(3)+2x-1 intersect in exactly 3 distinct points. Then find the slope of the line passing through two of these points.

The graph y=2x^(3)-4x+2 and y=x^(3)+2x-1 intersect in exactly 3 distinct points.Then find the slope of the line passing through two of these points.

The graph y=2x^3-4x+2a n dy=x^3+2x-1 intersect in exactly 3 distinct points. Then find the slope of the line passing through two of these points.

The graph y=2x^3-4x+2a n dy=x^3+2x-1 intersect in exactly 3 distinct points. Then find the slope of the line passing through two of these points.

The graph y=2x^3-4x+2a n dy=x^3+2x-1 intersect in exactly 3 distinct points. Then find the slope of the line passing through two of these points.

The graph y=2x^3-4x+2a n dy=x^3+2x-1 intersect in exactly 3 distinct points. Then find the slope of the line passing through two of these points.

If the lines 2x-3y+1=0 and 3x-2y+1=02x-3y+1=0 and 3x-2y+1=0 intersect the cordinate axsing through points centre of the circle passing through those points is

A line L passing through the focus of the parabola y^2=4(x-1) intersects the parabola at two distinct points. If m is the slope of the line L , then

The circles x^(2)+y^(2)=4x+8y+5 intersects the line 3x-4y = m at two distinct points of