Let `f(x)=xsinpix ,x > 0.` Then for all natural numbers `n ,f^(prime)(x)` vanishes at a unique point in the interval `(n , n+1/2)` a unique point in the interval `(n+1/2, n+1)` a unique point in the interval `(n , n+1)` two points in the interval `(n , n+1)`

Let f(x)=xsinpix ,x > 0. Then for all natural numbers n ,f^(prime)(x) vanishes at (A)a unique point in the interval (n , n+1/2) (B)a unique point in the interval (n+1/2, n+1) (C)a unique point in the interval (n , n+1) (D)two points in the interval (n , n+1)

Prove that (1+x)^(n) ge (1+nx) for all natural number n where x gt -1

Let f((x+y)/2)=(f(x)+f(y))/2fora l lr e a lxa n dy If f^(prime)(0) exists and equals -1a n df(0)=1,t h e n f i n d f(2)dot

Prove that the coefficient of x^(n) in the expansion of (1 + x)^(2n) is twice the coefficient of x^(n) in the expansion of (1 + x)^(2n - 1) .

Let f(x)=lim_(ntooo) (x)/(x^(2n)+1). Then

If f(x) =(p-x^n)^(1/n) , p >0 and n is a positive integer then f[f(x)] is equal to

Let f be function f:N to N be defined by f(x)=3x+2, xin N . Find the images of 1, 2, 3

If f(x)=x/(sinx)a n dg(x)=x/(tanx),w h e r e0ltxlt=1, then in this interval

f(x) is cubic polynomial with f(x)=18a n df(1)=-1 . Also f(x) has local maxima at x=-1a n df^(prime)(x) has local minima at x=0 , then the distance between (-1,2)a n d(af(a)), where x=a is the point of local minima is 2sqrt(5) f(x) is increasing for x in [1,2sqrt(5]) f(x) has local minima at x=1 the value of f(0)=15

Suppose that f is an even, periodic function with period 2,a n dt h a tf(x)=x for all x in the interval [0,1] . The values of [10f(3. 14)] is(where [.] represents the greatest integer function) ______