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AAKASH SERIES-LIMITS-EXERCISE-2.1 (SHORT ANSWER QUESTIONS)
- Show that Lt(xto0)(|x|)/x does not exist.
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- Show that Lt(xto2-)(|x-2|)/(x-2)=-1
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- Show that Lt(x to0+)((2|x|)/x+x+1)=3.
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- Show that Lt(x to2)([x]+x) does ot exists.
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- Show that Lt(xto3+){[x]-x}=0
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- Find {:(" Lt"),(xrarroo):}(8|x|+3x)/(3|x|-2x)
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- Compute : Lt(xto2-)sqrt(2-x). What is the value of Lt(xto2)sqrt(2-x)?
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- Show that Lt(xto-2^(+))sqrt(x^(2)-4)=0=Lt(xto-2)sqrt(x^(2)-4)
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- Find the left and right hand limits of the function at the point 'a' m...
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- Find the left and right hand limits of the function at the point 'a' m...
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- Find the left and right hand limits of the function at the point 'a' m...
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- Find the left and right hand limits of the function at the point 'a' m...
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- Find the left and right hand limits of the function at the point 'a' m...
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- Find the left and right hand limits of the function at the point 'a' m...
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- Let f:R to R defined by f(x)={{:(2x-1,if x lt 3),(5, if x ge 3):} ...
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- Suppose f(x)={{:(a+bx",",xlt1),(4",",x=1),(b-ax",",xgt1):} and if li...
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- Find Lt(xto0)f(x) where f(x)=f(x)={{:(x-1" if "xlt1),(0" if "x=...
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