if m and b are real numbers and `mbgt0`, then the line whose equation is `y=mx+b` cannot contain the point

if m and b are real numbers and mb>0, then the line whose equation is y=mx+b cannot contain the point

Let a and b be non-zero real numbers.Then the equation of the line passing through the origin and the point of inter section of (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 is

If the equation ax^(2)+2bx+c=0 has real roots, a,b,c being real numbers and if m and n are real numbers such that m^(2)gtngt0 then prove that the equation ax^(2)+2mbx+nc=0 has real roots.

If 'b' is a real number, then what is the distance between lines y = b and y = - b ?

If a,b and c are real and a+b+c=0 , then the line 3ax+4by+c=0 passes through the point whose coordinates are

If (a,b) and (c,d) are two points on the whose equation is y=mx+k , then the distance between (a,b) and (c,d) in terms of a,c and m is

If a and b are real numbers between o and 1 such that the points (a,0), (1,b) and (0,0) form an equilateral triangle then a=_______ and b=_________.

For all real values of m, the straight line y=mx+sqrt(9m^(2)-4) is a tangent to the curve :