If `a` is the root (having the least absolute value) or the equation `x^2-b x-1=0(b in R^+)` , then prove that `-1

If alpha is the root (having the least absolute value) of the equation x^2-b x-1=0(b in R^+) , then prove that -1ltalphalt0.

If alpha is the root (having the least absolute value) of the equation x^2-b x-1=0(b in R^+) , then prove that -1ltalphalt0.

If a is the root (having the least absolute value) or the equation x^(2)-bx-1=0(b in R^(+)), then prove that -1

If 2a+3b+6c=0, then prove that at least one root of the equation a x^2+b x+c=0 lies in the interval (0,1).

If 2a+3b+6c=0, then prove that at least one root of the equation a x^2+b x+c=0 lies in the interval (0,1).

If 2a+3b+6c=0, then prove that at least one root of the equation a x^2+b x+c=0 lies in the interval (0,1).

If 2a+3b+6c=0, then prove that at least one root of the equation a x^2+b x+c=0 lies in the interval (0,1).

The value of b for which the equation x^2+bx-1=0 and x^2+x+b=0 have one root in common is

The value of b for which the equation x^2+bx-1=0 and x^2+x+b=0 have one root in common is:

The value of b for which the equation x^2+bx-1=0 and x^2+x+b=0 have one root in common is