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SRISIRI PUBLICATION-IPE SCANNER (TEXTUAL BITS)-LIMITS & CONTINUITY
- Evaluate Lt(x to 0) (root(3)(1+x)-root(3)(1-x))/(x)
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- Evaluate Lt(x to 0)((1+x)^(1//8) - (1 - x)^(1//8))/(x)
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- Show that Lt(x to 0)(e^(x)-1)/(x)=1
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- Evaluate Lt(x to 3) (e^x - e^3)/(x - 3)
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- Evaluate Lt(x to 0)(e^(sin x) - 1)/(x - 3)
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- Evaluate Lt(x to 1)(log(e)x)/(x - 1)
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- Evaluate Lt(x to 0)(log(1 + 5x))/(x)
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- Evaluate Lt(x to 0)(3^x - 1)/(sqrt(1 + x) - 1)
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- Evaluate Lt(x to 3)(x^2 + 3x + 2)/(x^2 - 6x + 9)
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- Evaluate Lt(x to oo)(3x^(2) + 4x + 5)/(2x^2 + 3x - 7)
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- Compute lim(x to infty)(x^(2)+5x+2)/(2x^(2)-5x+1)
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- underset(x to 0)"Lt" (1-cos x)/(x)=
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- Evaluate Lt(x to 0)("sec" x - 1)/(x^2)
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- underset(x to 0)"Lt" (1-cos mx)/(1-cos nx)=
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- Evaluate Lt(x to 0)(x(e^x - 1))/(1 - cos x)
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- Evaluate Lt(x to 0)(log(1 + x^3))/(sin^3 x)
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- Evaluate {:(" Lt"),(xrarr2):}{(1)/(x-2)-(4)/(x^(2)-4)}
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- If f is given by f(x)={{:(k^(2)x-k,"if "xge1),(2,"if "xlt1):} is a co...
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- Find whether the limit of f(x) exists or not at x = 3, where f(x) = ...
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- If f(x) = (|x|)/x then show that Lt(x to 0) f(x) does not exist.
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