The abscissa of the points of the curve y=x3 in the interval [–2, 2], where the slope of the tangents can be obtained by mean value theorem for the interval [–2, 2], are [MP PET 1993]
A
±2√3
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B
±√3
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C
±√32
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D
0.0
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Solution
The correct option is A±2√3 According to the mean value theorem, f'(c) = f(b)−f(a)b−a in the interval [a,b] f'(c) = f(8)−f(−8)8+8 f'(c) = 4 Also, f'(c) = 3c2 so, 3c2 = 4 or c = ±2√3