In a monopolistic economy, p = f(x), generally decreasing with increase in x so that `(dp)/(dx)=0` . Then

For each of the following graphs, comment whether f(x) is increasing or decreasing or neither increasing nor decreasing at x = a.

The function f(x)=x^2-x+1 is increasing and decreasing in the intervals

The function f(x)=x/(1+|x|) is (a) strictly increasing (b) strictly decreasing (c) neither increasing nor decreasing (d) none of these

The differential equation y=px+f(p) , …………..(i) where p=(dy)/(dx) ,is known as Clairout's equation. To solve equation i) differentiate it with respect to x, which gives either (dp)/(dx)=0 rArr p =c ………….(ii) or x+f^(i)(p)=0 …………(iii) The number of solution of the equation f(x)=-1 and the singular solution of the equation y=x(dy)/(dx)+((dy)/(dx))^(2) is

If x in (0,pi/2) , then the function f(x)= x sin x +cosx +cos^(2)x is (a) Increasing (b) Decreasing (c) Neither increasing nor decreasing (d) None of these

Find the intervals of decrease and increase for the function f(x)=cos(pi/x)

Which of the following statement is always true? (a)If f(x) is increasing, the f^(-1)(x) is decreasing. (b)If f(x) is increasing, then 1/(f(x)) is also increasing. (c)If fa n dg are positive functions and f is increasing and g is decreasing, then f/g is a decreasing function. (d)If fa n dg are positive functions and f is decreasing and g is increasing, the f/g is a decreasing function.

If fogoh(x) is an increasing function, then which of the following is not possible? (a) f(x),g(x),a n dh(x) are increasing (b) f(x)a n dg(x) are decreasing and h(x) is increasing (c) f(x),g(x),a n dh(x) are decreasing

Prove that the function given by f(x) = cos x is(a) strictly decreasing in (0,pi) (b) strictly increasing in (pi,2pi) , and(c) neither increasing nor decreasing in (0,2pi)

Let h(x)=f(x)-(f(x))^2+(f(x))^3 for every real number xdot Then (a) h is increasing whenever f is increasing (b) h is increasing whenever f is decreasing (c) h is decreasing whenever f is decreasing (d) nothing can be said in general