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Question
Let D be the domain of a twice differentiable function f. For all xϵD,f"(x)+f(x)=0 and f(x)=∫g(x)dx+constant. If h(x)=(f(x))2+(g(x))2 and h(0)=5 then h(2015)−h(2014)=
Let D be the domain of a twice differentiable function f. For all xϵD,f"(x)+f(x)=0 and f(x)=∫g(x)dx+constant. If h(x)=(f(x))2+(g(x))2 and h(0)=5 then h(2015)−h(2014)=
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Solution
The correct option is C 0
f(x)=∫g(x)dx+c
On differentiating
f′(x)=g(x) ...(1)
and f′′(x)=g′(x) ...(2)
and f′′(x)+f(x)=0 .... (3) (given)
Put value of f′′(x) in eqn. (3)
⇒f(x)=−g′(x) ....(4)
now,
h(x)=f2(x)+g2(x)
h′(x)=2f(x)f′(x)+2g(x)g′(x)
Put value of f'(x) and g'(x) from eqn. (1) and (4)
h′(x)=2f(x)g(x)+2g(x)[−f(x)]
h′(x)=0
This implies h(x) is constant
∴h(x)=c
but h(o)=5⇒c=5
∴h(x)=5
∴h(2015)−h(2014)=0
f(x)=∫g(x)dx+c
On differentiating
f′(x)=g(x) ...(1)
and f′′(x)=g′(x) ...(2)
and f′′(x)+f(x)=0 .... (3) (given)
Put value of f′′(x) in eqn. (3)
⇒f(x)=−g′(x) ....(4)
now,
h(x)=f2(x)+g2(x)
h′(x)=2f(x)f′(x)+2g(x)g′(x)
Put value of f'(x) and g'(x) from eqn. (1) and (4)
h′(x)=2f(x)g(x)+2g(x)[−f(x)]
h′(x)=0
This implies h(x) is constant
∴h(x)=c
but h(o)=5⇒c=5
∴h(x)=5
∴h(2015)−h(2014)=0
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