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BITSAT GUIDE-LIMITS CONTINUITY AND DIFFERENTIABILITY -BITSAT Archives
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- lim(x rarr 0) ((2+x) sin (2+x) - 2 sin2)/(x) is equal to
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- If f(x) = (log (1+ax)-log (1-bx))/(x) for x ne 0 and f(0) = k and f(x...
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- lim(x rarr0) (sin x)/(x)
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- lim(x->0)(cos(sinx)-1)/(x^2)
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- In order that the function f(x) = (x+1)^(1/x) is continuous at x = 0, ...
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- The function f (x ) = |x | at x = 0 is
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- lim(x rarr 0) (cosec x )^(1//"log"x) is equal to
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- lim(x->2)(sqrt(1+sqrt(2+x))-sqrt(3))/(x-2) is equal to
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- lim(x rarr 1) (1-x) tan((pi x)/2)
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- If f: R rarr R is defined by f(x) = [ x -3] + | x-4| for x in R then...
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- If f : R rarr R is defined by f(x) = {{:((cos 3x-cosx )/(x^(2)), "f...
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