If `b gt a`, then the equation `(x-a)(x-b)-1=0`, has

If b>a, then the equation (x-a)(x-b)-1=0 has (2000,1M) both roots in (a,b) both roots in (-oo,a) both roots in (b,+oo) one root in (-oo,a) and the other in (b,oo)

If a

If |a|<|b|,b-a<1 and a,b are the real roots of the equation x^(2)-| alpha|x-| beta|=0 then the equation log_(|b|)|(x)/(a)|-1=0 has

If (a+b+c)>0 and a < 0 < b < c, then the equation a(x-b)(x-c)+b(x-c)(x-a)+c(x-a)(x-c)=0 has (i) roots are real and distinct (ii) roots are imaginary (iii) product of roots are negative (iv) product of roots are positive

If a,b in R and the equation x^(2)+(a-b)x+1-a-b=0 has unequal roots for all b in R then a can be

Statement-1 : f(x) = 0 has a unique solution in (0,pi). Statement-2: If g(x) is continuous in (a,b) and g(a) g(b) <0, then the equation g(x)=0 has a root in (a,b).

If (1)/(sqrt(alpha)) and (1)/(sqrt(beta)) are the roots of equation ax^(2)+bx+1=0(a!=0,(a,b in R)), then the equation x(x+b^(3))+(a^(3)-3abx)=0 has roots -