The second degree polynomial satisfying `f(x), f(0) =0, f(1) = 1, f ' (x) > 0 AA x in (0,1)`

The second degree polynomial f(x), satisfying f(0)=o, f(1)=1,f'(x)gt0AAx in (0,1)

The second degree polynomial f(x), satisfying f(0)=o, f(1)=1,f'(x)gt0AAx in (0,1)

The second degree polynomial f(x), satisfying f(0)=o, f(1)=1,f'(x)gt0AAx in (0,1) a. f(x)=phi b. f(x)=ax+(1-a)x^(2),AAa in (0,oo) c. f(x)=ax+(1-a)x^(2), a in (0,2) d. No such polynomial

Which one of the following is the second degree polynomial function f(x), where f(0)=5 f(-1)=10 and f(1)=6=?

Let f(x) is a three degree polynomial for which f ' (–1) = 0, f '' (1) = 0, f(–1) = 10, f(1) = 6 then local minima of f(x) exist at

Let f(x) is a three degree polynomial for which f ' (–1) = 0, f '' (1) = 0, f(–1) = 10, f(1) = 6 then local minima of f(x) exist at

There exists a function f(x) satisfying 'f (0)=1,f(0)=-1,f(x) lt 0,AAx and

Let f(x) be a polynomial of degree 2 satisfying f(0)=1, f(0) =-2 and f''(0)=6 , then int_(-1)^(2) f(x) is equal to

Let f(x) be a polynomial of degree 2 satisfying f(0)=1, f(0) =-2 and f''(0)=6 , then int_(-1)^(2) f(x) is equal to