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HIMALAYA PUBLICATION-LIMITS, CONTINUITY AND DIFFERENTIABILITY-QUESTION BANK
- lim(theta rarr 0) (cos5 theta - cos 7 theta )/(theta^(2)) =
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- lim(x rarr 0) (cos 2x - cos 7x )/(sin 3x . tan 5x) =
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- lim(x rarr 0) (cos 9x - cos 7x )/(x^(2)) =
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- lim(x rarr 0) (cos^(3) 2x - cos ^(3) 3x )/(x^(2)) =
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- lim(x rarr 0) (tan x - sin x)/(x^(3)) =
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- lim(x rarr 0) (tan^(3)2 x - sin^(3) 2x)/(x^(5)) =
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- lim(theta rarr 0) (1-cos theta)/(theta sin theta) =
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- lim(x rarr pi/2)(sec x - tan x)=
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- lim(alpha rarr beta)(sin^(2) alpha - sin^(2)beta)/(alpha^(2)-beta^(2))...
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- lim(theta rarr 0)(sin 5 theta - sin 3 theta)/(theta)=
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- lim(theta rarr 0)(tan theta - sin theta)/(theta^(3))=
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- lim(x rarr 0)(e^(x^(2) ) - cos x)/x^(2)=
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- lim(x rarr 0) (log (1+x))/(3^(x) - 1)=
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- lim(x rarr 0) (e^(x) + e^(-x) -2)/x^(2)=
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- lim(x rarr 0) (sin x^(o) )/x=
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- lim(theta rarr pi/2) (1-sin theta )/((pi/2 - theta) cos theta)=
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- lim(x rarr oo) ((x-2)(x+4))/(x(x-9)) =
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- lim(x rarr oo) (2x^(2)-x-1)/(x^(2)+x-2) =
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- lim(x rarr oo) ((2n+1)(3n+2))/(n(n+9))=
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- lim(x rarr oo) ((x+1)(x+2))/(x^(2)(x+3))=
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