Statement I The equation `(x^(3))/(4) - sin pi x + (2)/(3) = 0` has atleast one solution in [-2, 2].
Statement II Let `f : [a, b] rarr R` be a function and c be a number such that `f(a) lt c lt f(b)`, then there is atleast one number `n in (a, b)` such that f(n) = c.

Statement 1: If 27 a+9b+3c+d=0, then the equation f(x)=4a x^3+3b x^2+2c x+d=0 has at least one real root lying between (0,3)dot Statement 2: If f(x) is continuous in [a,b], derivable in (a , b) such that f(a)=f(b), then there exists at least one point c in (a , b) such that f^(prime)(c)=0.

If the equation x^(2)+12+3sin(a+bx)+6x=0 has atleast one real solution, where a, b in [0,2pi] , then the value of a - 3b is (n in Z)

Statement I The equation 3x^(2)+4ax+b=0 has atleast one root in (o,1), if 3+4a=0. Statement II f(x)=3x^(2)+4x+b is continuos and differentiable in (0,1)

Let f:R rarr R be a twice differential function such that f((pi)/(4))=0,f((5 pi)/(4))=0 and f(3)=4 then show that there exist a c in(0,2 pi) such that f'(c)+sin c-cos c<0

Let f(x) is differentiable function in [2, 5] such that f(2)=(1)/(5) and f(5)=(1)/(2) , then the exists a number c, 2 lt c lt 5 for which f '(c) equals :-

If f(x) is continuous in [a, b] and differentiable in (a, b), prove that there is atleast one c in (a, b) , such that (f'(c))/(3c^(2))= (f(b)-f(a))/(b^(3)-a^(3)) .

If f'[x) exists for all points in [a,b] and (f(c ) -f(a))/(c-a) =(f(b)-f( c))/(b-c) where a lt c lt b , then there is a number l such that a lt l lt b and f''(l)=0

f(x) and g(x) are differentiable functions for 0 le x le 2 such that f(0)=5, g(0)=0, f(2)=8, g(2)=1 . Show that there exists a number c satisfying 0 lt c lt 2 and f'(c)=3g'(c) .