In the given figure graph of `y = P(x) = ax^(5) + bx^(4) + cx^(3) + dx^(2) + ex + f`, is given.

If P''(x) has real roots `alpha, beta, gamma`, then `[alpha] + [beta] + [gamma]`, is

In the given figure graph of y = P(x) = ax^(5) + bx^(4) + cx^(3) + dx^(2) + ex + f , is given. The minimum number of real roots of equation (P''(x))^(2) + P'(x).P'''(x) = 0 , is

If the function f(x)=x^(3)-9x^(2)+24x+c has three real and distinct roots alpha, beta and gamma , then the value of [alpha]+[beta]+[gamma] is

ax^2 + bx + c = 0(a > 0), has two roots alpha and beta such alpha 2, then

The direction angles of the line x=4z+3, y=2-3z are alpha, beta and gamma , then cos alpha +cos beta+ cos gamma = ____

x+y-ln(x+y)=2x+5 has a vertical tangent at the point (alpha,beta) then alpha+beta is equal to

alpha is a root of equation ( 2 sin x - cos x ) (1+ cos x)=sin^2 x , beta is a root of the equation 3 cos 2x - 10 cos x +3 =0 and gamma is a root of the equation 1-sin2 x = cos x- sin x : 0 le alpha , beta, gamma , le pi//2 cos alpha + cos beta + cos gamma can be equal to

alpha is a root of equation ( 2 sin x - cos x ) (1+ cos x)=sin^2 x , beta is a root of the equation 3 cos ^2x - 10 cos x +3 =0 and gamma is a root of the equation 1-sin2 x = cos x- sin x : 0 le alpha , beta, gamma , le pi//2 sin alpha + sin beta + sin gamma can be equal to

Let f(x) = x2 + b_1x + c_1. g(x) = x^2 + b_2x + c_2 . Real roots of f(x) = 0 be alpha, beta and real roots of g(x) = 0 be alpha+gamma, beta+gamma . Least values of f(x) be - 1/4 Least value of g(x) occurs at x=7/2

alpha is a root of equation ( 2 sin x - cos x ) (1+ cos x)=sin^2 x , beta is a root of the equation 3 cos 2x - 10 cos x +3 =0 and gamma is a root of the equation 1-sin2 x = cos x- sin x : 0 le alpha , beta, gamma , le pi//2 sin (alpha - beta ) is equal to