Show that lim(n to infty)(1+2+3+...+n)/(...

Show that `lim_(n to infty)(1+2+3+...+n)/(3n^2+7n+2)=1/6`

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The correct Answer is:

`1/6`

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FULL MARKS-DIFFERENTIAL CALCULUS - LIMITS AND CONTINUITY-EXERCISE 9.3

Find the left and right limits of f(x)=(x^2-4)/((x^2+4x+4)(x+3)) at x...
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Find the limit of f(x)=tanx at x=pi/2.
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Evaluate lim(x to infty)(x^3/(2x^2-1)-x^2/(2x+1))
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Show that lim(n to infty)(1+2+3+...+n)/(3n^2+7n+2)=1/6
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Show that lim(n to infty)(1^2+2^2+...+(3n)^2)/((1+2+...+5n)(2n+3))=9/2...
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Show that lim(n to infty)1/1.2+1/2.3+1/3.4+...+1/(n(n+1))=1
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