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Question
If f:R→R is a differentiable function such that f′(x)>2f(x) for all x∈R, and f(0)=1, then
If f:R→R is a differentiable function such that f′(x)>2f(x) for all x∈R, and f(0)=1, then
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Solution
The correct options are
C f(x) is increasing in (0,∞)
D f(x)>e2x in (0,∞)
Given : f:R→R is a differential function such that f′(x)>2f(x)Now, f′(x)>2f(x)⟹f′(x)f(x)>2Integrating both sides, we get∫f′(x)f(x)dx>∫2 dx
⟹log(f(x))+c>2x⟹f(x)+C>e2xSince, f(0)=1 ⟹f(0)+C>e0⟹C>0⟹f(x)>e2x∴ D is correctSince, e2x increases in the interval (0,∞)⟹f(x) is increasing in (0,∞).Hence, C and D are correct.
C f(x) is increasing in (0,∞)
D f(x)>e2x in (0,∞)
Given : f:R→R is a differential function such that f′(x)>2f(x)
Now, f′(x)>2f(x)
⟹f′(x)f(x)>2
Integrating both sides, we get
∫f′(x)f(x)dx>∫2 dx
⟹log(f(x))+c>2x
⟹f(x)+C>e2x
Since, f(0)=1
⟹f(0)+C>e0⟹C>0
⟹f(x)>e2x
∴ D is correct
Since, e2x increases in the interval (0,∞)
⟹f(x) is increasing in (0,∞).
Hence, C and D are correct.
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