Show that the equation `sinθ=x+1/x` is not possible if x is real.

The range of y such that the equation in x , y cos x = sin x has a real solution is

Show that the function f defined by f(x)= |1-x+|x|| , where x is any real number, is a continuous function.

The range of y such that the equation of x,y+cos x=sin x has a real solutiions is

Show that Lt_(x to 0)(e^(x)-1)/(x)=1

Between any two real roots of the equation e^(x) sin x =1 , the equation e^(x) cos x = -1 has

If x and y are two positive real numbers (x ne y) , prove that cos^(2) theta = ((x+y)^(2))/(4 xy) is not possible.

If the equation sin x(sin x + cos x)=k has real solutions then k may lie in the interval