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SURA PUBLICATION-DIFFERENTIAL CALCULUS - LIMITS AND CONTINUITY-EXERCISE 9.6
- lim(xtooo)(sinx)/x
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- lim(xto pi/2)(2x-pi)/cosx
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- lim(xto0)(sqrt(1-cos2x))/x
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- lim(thetato0)(sinsqrttheta)/(sqrtsintheta)
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- lim(xtooo)((x^(2)+5x+3)/(x^(2)+x+3))^(x) is
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- lim(xtooo)(sqrt(x^(2)-1))/(2x-1)=
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- lim(xtooo)(a^(x)-b^(x))/x=
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- lim(xto0)(8^(x)-4^(x)-2^(x)+1^(x))/x^(2)=
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- If f(x)=x(-1)^[1/x] xle0, then the value of lim(xto0)f(x) is equal to
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- If f: R to R is defined by f(x) = |x-3| + |x-4| for x in R then lim(...
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- lim(xto0)(xe^(x)-sinx)/x is
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- If lim(xto0)(sinpx)/(tan3x)=4, then the value of p is
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- lim(alphato pi/4)(sinalpha-cosalpha)/(alpha-pi/4) is
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- lim(nto0)(1/n^(2)+2/n^(2)+3/n^(2)+...+n/n^(2)) is
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- lim(xto0)(e^(sinx)-1)/x=
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- lim(xto0)(e^(tanx)-e^(x))/(tanx-x)=
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- The value of lim(xto0)sinx/(sqrtx)^2 is
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- The value of lim(xtok^(-))x-[x], where k is an integer
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- At x=3/2 the function f(x)=(|2x-3|)/(2x-3) is
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- Let f : RRtoRR be defined by f(x)={{:(x" "x" is irrational"),(1...
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