If `a lt b lt c lt d` then show that `(x-a)(x-c)+2(x-b)(x-d)=0` has real and distinct roots.

If a le b le c le d then the equation (x-a)(x-c)+2(x-b)(x-d)=0 has

If a, b and c are distinct real numbers, prove that the equation (x-a)(x-b)+(x-b)(x-c)+(x-c)(x-a)=0 has real and distinct roots.

If 2 lt x lt 3 , then :

If a ,b ,c ,d are four consecutive terms of an increasing A.P., then the roots of the equation (x-a)(x-c)+2(x-b)(x-d)=0 are a. non-real complex b. real and equal c. integers d. real and distinct

If 0 lt x lt (pi)/(4) then sec 2 x-tan 2 x=

If 0 lt a lt b lt c and the roots alpha,beta of the equation ax^2 + bx + c = 0 are non-real complex numbers, then

If 0 lt=a lt=3 , 0 lt=b lt=3 and the equation : x^(2) + 4 + 3cos(ax + b)=2x has at least one solution, then the value of a + b is :

If f(x) is a cubic polynomial x^3 + ax^2+ bx + c such that f(x)=0 has three distinct integral roots and f(g(x)) = 0 does not have real roots, where g(x) = x^2 + 2x - 5, the minimum value of a + b + c is

Let a in R and f : R rarr R be given by f(x)=x^(5)-5x+a , then (a) f(x)=0 has three real roots if a gt 4 (b) f(x)=0 has only one real root if a gt 4 (c) f(x)=0 has three real roots if a lt -4 (d) f(x)=0 has three real roots if -4 lt a lt 4