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Question
If f and g are differentiable functions in [0,1] satisfying f(0)=2=g(1), g(0)=0 and f(1)=6, then for some c∈[0,1]:
If f and g are differentiable functions in [0,1] satisfying f(0)=2=g(1), g(0)=0 and f(1)=6, then for some c∈[0,1]:
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Solution
The correct option is D f′(c)=2g′(c)
Let h(x)=f(x)−2g(x)...(1)
∴h(0)=f(0)−2g(0)=2−0=2
and h(1)=f(1)−2g(1)=6−2(2)=2
Thus, h(0)=h(1)=2
Now apply Rolle's theorem on equation (1),
h′(c)=0 where c∈(0,1)
Differentiating equation (1) w.r.t x
∴h′(x)=f′(x)−2g′(x)
At x=c, h′(c)=f′(c)−2g′(c)
Hence, 0=f′(c)−2g′(c)
∴f′(c)=2g′(c)
Let h(x)=f(x)−2g(x)...(1)
∴h(0)=f(0)−2g(0)=2−0=2
and h(1)=f(1)−2g(1)=6−2(2)=2
Thus, h(0)=h(1)=2
Now apply Rolle's theorem on equation (1),
h′(c)=0 where c∈(0,1)
Differentiating equation (1) w.r.t x
∴h′(x)=f′(x)−2g′(x)
At x=c, h′(c)=f′(c)−2g′(c)
Hence, 0=f′(c)−2g′(c)
∴f′(c)=2g′(c)
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