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Use the Riemann Sums corresponding

  1. The following sum[(sqrt(36-((6/n)^2))).(6/n)] + [(sqrt(36-((12/n)^2))).(6/n)]+ ... + [(sqrt(36-((6n/n)^2))).(6/n)] is a right
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    2. Salman asked by Salman
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  2. The following sum[(sqrt(36-((6/n)^2))).(6/n)] + [(sqrt(36-((12/n)^2))).(6/n)]+ ... + [(sqrt(36-((6n/n)^2))).(6/n)] is a right
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    2. Salman asked by Salman
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  3. The following sum[(sqrt(36-((6/n)^2))).(6/n)] + [(sqrt(36-((12/n)^2))).(6/n)]+ ... + [(sqrt(36-((6n/n)^2))).(6/n)] is a right
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    2. Salman asked by Salman
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  4. The following sum[(sqrt(36-((6/n)^2))).(6/n)] + [(sqrt(36-((12/n)^2))).(6/n)]+ ... + [(sqrt(36-((6n/n)^2))).(6/n)] is a right
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    2. Salman asked by Salman
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  5. Calculate the indicated Riemann Sums for the function g(x)=4-x^2a)one rectangle b)two rectangles
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    2. Carl asked by Carl
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  6. given the function f(x)=x^3 defined for 0<x<1 evaluate the lower & upper Riemann sums.
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    2. Romina asked by Romina
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  7. What is the connection between improper integrals, Riemann sums, and the integral test?
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    2. Kendra asked by Kendra
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  8. Let V be the volume of the solid that lies under the graph of f(x,y)= (52 − x^2 − y^2)^1/2 and above the rectangle given by
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    2. R asked by R
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  9. Use the Left and Right Riemann Sums with 80 rectangles to estimate the (signed) area under the curve of y=e^2x−15 on the
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    2. Will asked by Will
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  10. Use the Left and Right Riemann Sums with 80 rectangle to estimate the (signed) area under the curve of y=e^(3x)−5 on the
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    2. Mark asked by Mark
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