If f and g are differentiable functions in [0,1] satifying f(0)=2=g(1),g(0)=0 and f(1) =6 , then for some `c in (0,1)`

If f and 'g' are differentiable functions in [0, 1] satisfying f(0) = 2 = g(1), g(0) = 0 and f(1) = 6, then for some c in [0,1]:

Let f(x) and g(x) be differentiable functions for 0 le x le 1 such that f(0) = 2, g(0) = 0, f(1) = 6 . Let there exist a real number c in (0,1) such that f ’(c) = 2 g ’(c), then g(1) =

If f be a continuous function on [0,1], differentiable in (0,1) such that f(1) = 0 , then there exists some c in (0,1) such that

f(x) and g(x) are two differentiable functions on [0,2], such that f^('')(x) - g^('') (x) = 0,f' (1) = 4,g'(1) = 2, f(2) = 9, g(2) = 3, then f(x) = g(x) at x = 3//2 is

If f(x) and g(x) are continuous functions on the interval [0, 4] satisfying f(x)=f(4-x) and g(x)+g(4-x)=3 and int_(0)^(4) f(x)dx=2 then int_(0)^(4) f(x)g(x)dx=

Let f and g be two diffrentiable functions on R such that f'(x) gt 0 and g'(x) lt 0 for all x in R . Then for all x

Let f(x) be continuous on [0, 6] and differentiable on (0, 6). Let f(0) = 12 and f(6) = -4 . If g(x)=(f(x))/(x+1) , then for some Lagrange's constant c in (0,6),g'( c )=