For what values of `a` the graphs of the functions `y=2ax+1` and `y=(a-6)x^2-2` not intersect?

For what values of a do the graphs of the functions y=2ax+1 and y=(a-6)x^(2)-2 not intersect?

Draw the graph of function y = |2-|x-2|| .

The least integral value of a' for which the graphs y=2ax+1 and y=(a-6)x^(2)-2 do not intersect: -6( b) -5(c)3(d)2

The least integral value of ' a ' for which the graphs y=2a x+1 and y=(a-6)x^2-2 do not intersect: (a) -6 (b) -5 (c) 3 (d) 2

Sketch the graph of the function y=2|x-2|-|x+1|+x.

The least integral value of a'a' for which the graphs y=ax+1 and (a-6)x^(2)-2 do not intersect: -6 b.-5 c.3 d.2

Draw the graph of the functions on the same axes: y= sin x and y = sin 2x

Draw the graph of the functions on the same axes: y= sin x and y = sin 2x

Draw the graphs of the functions y^(2)=x+1 and y^(2)=-x+1 and also find the area bounded by these curves.

Number of points in which the graphs of |y|=x+1 and (x-1)^(2)+y^(2)=4 intersect,is (A) 1