Let f(x) be continuous on [0,4], differentiable on (0,4), f(0)=4 and f(4)=-2 . If g(x)=(f(x)/x+2), then the value of g prime(c) for some Lagrange's constant c ∈(0,4) is

Question

Let f(x) be continuous on [0,4], differentiable on (0,4), f(0)=4 and f(4)=-2 . If g(x)=(f(x)/x+2), then the value of g prime(c) for some Lagrange's constant c ∈(0,4) is (A) (1/2) (B) (5/12) (C) -(5/12) (D) -(7/12)

Tardigrade Admin · Accepted Answer

Let f(x) be continuous on [0,4], differentiable on (0,4) F(0)=4 and F(4)=-2 g(x)=(f(x)/x+2) At x=0, g(0)=(f(0)/0+2)=(4/2)=2 At x=4, g(4)=(f(4)/4+2)=(-2/6)=(-1/3) Now, g'(c)=(g(4)-g(0)/4-0)=((-1/3)-2/4)=(-7/3 × 4) g' (c)=(-7/12)

Q. Let $f (x)$ be continuous on $[0, 4]$ , differentiable on $(0, 4), f (0) = 4$ and $f (4) = - 2.$ If $g (x) = \frac{f ( x )}{x + 2}$ , then the value of $g^{'} (c)$ for some Lagrange's constant $c \in (0, 4)$ is

$\frac{1}{2}$

$\frac{5}{12}$

$- \frac{5}{12}$

$- \frac{7}{12}$

Q. Let f(x) be continuous on [0,4], differentiable on (0,4),f(0)=4 and f(4)=−2. If g(x)=x+2f(x)​, then the value of g′(c) for some Lagrange's constant c∈(0,4) is

21​

125​

−125​

−127​

Let f(x) be continuous on [0,4], differentiable on (0,4) F(0)=4 and F(4)=−2g(x)=x+2f(x)​ At x=0,g(0)=0+2f(0)​=24​=2 At x=4,g(4)=4+2f(4)​=6−2​=3−1​ Now, g′(c)=4−0g(4)−g(0)​=43−1​−2​=3×4−7​ g′(c)=12−7​

Q. Let $f (x)$ be continuous on $[0, 4]$ , differentiable on $(0, 4), f (0) = 4$ and $f (4) = - 2.$ If $g (x) = \frac{f ( x )}{x + 2}$ , then the value of $g^{'} (c)$ for some Lagrange's constant $c \in (0, 4)$ is

$\frac{1}{2}$

$\frac{5}{12}$

$- \frac{5}{12}$

$- \frac{7}{12}$