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

Show that sin^(2)x=p+1/p is impossible if x is real.

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

Let a , b , c be nonzero real numbers such that int_0^1(1+cos^8x)(a x^2+b x+c)dx =int_0^2(1+cos^8x)(a x^2+b x+c)dx=0 Then show that the equation a x^2+b x+c=0 will have one root between 0 and 1 and other root between 1 and 2.

Show that the equation x^(3)+2x^(2)+x+5=0 has only one real root, such that [alpha]=-3 , where [x] denotes the integral point of x

If t is a real number satisfying the equation 2t^3-9t^2+30-a=0, then find the values of the parameter a for which the equation x+1/x=t gives six real and distinct values of x .

Show that the general solution of the differential equation (dy)/(dx) + (y^(2) + y + 1)/(x^(2) + x + 1) = 0 is given by ( x + y + 1) = A(1 - x - y - 2xy) , where A is parameter.

Solve the equation |x/(x-1)|+|x|=x^2/|x-1|

Show that x^(2)-3|x|+2=0 is an equation.

If f(x)=x^(3)-12x+p,p in {1,2,3,…,15} and for each 'p', the number of real roots of equation f(x)=0 is denoted by theta , the 1/5 sum theta is equal to ……….. .

The real solutions of the equation cos^(7)x+sin^(4)x=1 in (-pi,pi) are ………….