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

Question

f(x) and g(x) are two differentiable functions on [0, 2] such that f " (x) - g"(x) = 0, f '(1) = 2g'(1) = 4, f(2) = 3g(2) = 9 then f (x)-g(x) at x = 3/2 is (A) 0 (B) 2 (C) 10 (D) 5

Tardigrade Admin · Accepted Answer

∵ :f ''(x) - g " (x) = 0 Integrating, f ' (x) - g' (x) = c; ⇒ : : f ' (1)- g' (1) = c ⇒ 4 - 2 = c ⇒ c = 2. ∴ : :f' (x) - g' (x) = 2; Integrating, f (x) - g (x) = 2x + c1 ⇒ : :: f (2) - g(2) = 4 + c1 ⇒ 9 - 3 = 4 + c1; ⇒ : c1 = 2 ∴ f (x) - g(x) = 2x + 2 At x = 3/2, f (x) - g(x) = 3 + 2 = 5.

Q. f(x) and g(x) are two differentiable functions on [0,2] such that f"(x)−g"(x)=0,<br/>f′(1)=2g′(1)=4,f(2)=3g(2)=9 then f(x)−g(x) at x=3/2 is

0

2

10

5

∵f′′(x)−g"(x)=0 Integrating, f′(x)−g′(x)=c; ⇒f′(1)−g′(1)=c⇒4−2=c⇒c=2. ∴f′(x)−g′(x)=2; Integrating, f(x)−g(x)=2x+c1​ ⇒f(2)−g(2)=4+c1​⇒9−3=4+c1​; ⇒c1​=2∴f(x)−g(x)=2x+2 At x=3/2,f(x)−g(x)=3+2=5.

Q. $f (x)$ and $g (x)$ are two differentiable functions on $[0, 2]$ such that $f " (x) - g " (x) = 0, < b r / > f^{'} (1) = 2 g^{'} (1) = 4, f (2) = 3 g (2) = 9$ then $f (x) - g (x)$ at $x = 3/2$ is