1
Question
Let f:R→R be a function such that f(x)=x3+x2f′(1)+xf′′(2)+f′′′(3),x∈R. Then f(2) equals :
Let f:R→R be a function such that f(x)=x3+x2f′(1)+xf′′(2)+f′′′(3),x∈R. Then f(2) equals :
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Solution
The correct option is D −2
f(x)=x3+x2f′(1)+xf′′(2)+f′′′(3)
⇒f′(x)=3x2+2xf′(1)+f′′(2) ⋯(i)
⇒f′′(x)=6x+2f′(1) ⋯(ii)
⇒f′′′(x)=6 ⋯(iii)
⇒f′′′(3)=6
Now from eqn (i)
f′(1)=3+2f′(1)+f′′(2)
⇒f′(1)+f′′(2)+3=0 ⋯(iv)
from eqn (ii)
f′′(2)=12+2f′(1)
⇒2f′(1)−f′′(2)+12=0 ⋯(v)
from eqn. (iv) and (v)
3f′(1)+15=0
⇒f′(1)=−5 and f′′(2)=2
So,
f(x)=x3−5x2+2x+6
⇒f(2)=8−20+4+6=−2
f(x)=x3+x2f′(1)+xf′′(2)+f′′′(3)
⇒f′(x)=3x2+2xf′(1)+f′′(2) ⋯(i)
⇒f′′(x)=6x+2f′(1) ⋯(ii)
⇒f′′′(x)=6 ⋯(iii)
⇒f′′′(3)=6
Now from eqn (i)
f′(1)=3+2f′(1)+f′′(2)
⇒f′(1)+f′′(2)+3=0 ⋯(iv)
from eqn (ii)
f′′(2)=12+2f′(1)
⇒2f′(1)−f′′(2)+12=0 ⋯(v)
from eqn. (iv) and (v)
3f′(1)+15=0
⇒f′(1)=−5 and f′′(2)=2
So,
f(x)=x3−5x2+2x+6
⇒f(2)=8−20+4+6=−2
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