A polynomial function P(x) of degree 5 with leading coefficient one, increases in the interval `(-oo, 1 )` and `(3,oo)` and decreases in the interval ( 1 , 3). Given that P(0) = 4 and P'(2)=0. Find th value P'(6).

Find a polynomial f(x) of degree 4 which increases in the intervals (-oo,1) and (2,3) and decreases in the intervals (1,2) and (3,oo) and satisfies the condition f(0)=1

Find a polynomial f(x) of degree 5 which increases in the interval (-infty, 2] and [6, infty) and decreases in the interval [2,6]. Given that f(0) = 3 and f'(4)-0 .

y= f(x) is a polynomial function passing through point (0, 1) and which increases in the intervals (1, 2) and (3, oo) and decreases in the intervals (oo,1) and (2, 3). If f(1)= -8, then the range of f(x) is

Show that f(x)=(1)/(1+x^(2)) decreases in the interval [0,oo) and increases in the interval (-oo,0].

Show that f(x)=(1)/(1+x^(2)) decreases in the interval [0,oo) and increases in the interval (-oo,0].

Let f(x) be a cubic polynomial on R which increases in the interval (-oo,0)uu(1,oo) and decreases in the interval (0,1). If f'(2)=6 and f(2)=2, then the value of tan^(-1)(f(1))+tan^(-1)(f((3)/(2)))+tan^(-1)(f(0)) equals

If P(x) is polynomial of degree 4 with leading coefficient as three such that P(1)=2,P(2)=8,P(3)=18,P(4)=32 then the value of P(5) is