Consider three functions, f(x)=x3+x2+x+1, g(x)=2xx2+1 and h(x)=sin−1x−cos−1x+tan−1x−cot−1x and let p(x) be a differentiable function on R defined as p(x)={a∫x0√p(t)dt+b;x>0x2+4x+1;x≤0 where, a, b ϵ(0,∞) and tangent drawn to the graph of p(x) at x = 1 is y = mx + c
Column 1 Column 2 Column 3(I)If range of f(g(x)) is [l,m],(i)a=(P)1 then (l+m)= (II)The number of integers in the(ii)b=(Q)3 range of g(f(x)) is equal to (III)The maximum value of(iii)|c|=(R)4 g(h(x)) is equal to (IV)If the minimum value of(iv)(m−7)=(S)5 h(g(f(x))) is kπ2, then |k| is equalto
Which of the following option is the only correct combination?
(I), (i), (R)
Range of f(g(x)) = [f(–1), f(1)]
= [0, 4]
Range of g(f(x)) = [–1, 1]
g(h(x))|max=1, where x=1
h(g(f(x)))|min=−5π2, when g(f(x)) =-1
p(x)={4x2+4x+1;x>0x2+4x+1;x≤0
∴ a = 4, b = 1, c = –3, m = 12