The value of parameter `alpha`, for which the function `f(x) = 1+alpha x, alpha!=0` is the inverse of itself

The real value of alpha for which the expression (1-sin alpha)/(1+2i sin alpha) is purely real is

The values of alpha for which the equation alpha^2/(1-tan^2x)=(sin^2x+alpha^2-2)/(cos2x) has solution can be

Let the smallest positive value of x for which the function f(x)=sin""(x)/(3)+sin""(x)/(11), ( x in R ) achieves its maximum value be x_(0) . Express x_(0) in degree i.e. x_(0)=alpha^(0) . Then , the sum of the digits in alpha is

The value of the determinant {:|(alpha,beta,l), (alpha,x, n),(alpha,beta,x)|:} is a. independent of l b. independent of n c. alpha(x-l)(x-beta) d. alphabeta(x-l)(x-n)

If sin (3alpha) /cos(2alpha) < 0 If alpha lies in

The value of the positve integer n for which the quadratic equation sum_(k=1)^n(x+k-1)(x+k)=10n has solutions alpha and alpha+1 for some alpha is

If alpha is a root of the equation 4x^2+2x-1=0, then prove that 4alpha^3-3alpha is the other root.

Find P and alpha by converting equation x+y =1 in xcos alpha + y sin alpha = P form.

Let lambda "and" alpha be real. Let S denote the set of all values of lambda for which the system of linear equations lambda x+(sinalpha)y+(cos alpha)z=0 x+(cos alpha) y+(sin alpha) z=0 -x+ (sin alpha) y-(cos alpha) z=0 has a non- trivial solution then S contains

If alpha and beta are the roots of the equation x^2-4x + 1=0(alpha > beta) then find the value of f(alpha,beta)=(beta^3)/2csc^2(1/2tan^(- 1)(beta/alpha))+(alpha^3)/2sec^2(1/2tan^- 1(alpha/beta))