RAM (Rectangle Approximation Method/Riemann Sum)

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Questions

• What is Integration using rectangles?
• Find the riemann sum for #f(x)=x+x^2#?
• How do you Find the Riemann sum for #f(x)=x^3# on the interval #[0,5]# using right endpoints with #n=8#?
• How do you find Find the Riemann sum that approximates the integral #int_0^9sqrt(1+x^2)dx# using left endpoints with #n=6#?
• How do you Use a Riemann sum to approximate the area under the graph of the function #y=f(x)# on the interval #[a,b]#?
• How do you use a Riemann sum to calculate a definite integral?
• How do you Use a Riemann sum to find area?
• How do you Use a Riemann sum to find volume?
• What is a left Riemann sum?
• What is lower Riemann sum?
• What is midpoint Riemann sum?
• How do you use the Midpoint Rule with #n=5# to approximate the integral #int_1^(2)1/xdx# ?
• How do I estimate the area under the graph of #f(x) = sqrt x# from x=0 to x=4 using four approximating rectangles and right endpoints?
• How do I estimate the area under the graph of f(x) = #3 cos(x)# from #x=0# to #x=pi/2# using left and right endpoint methods?
• How do I estimate the area under the graph of #f(x)=25-x^2# from x=0 to x=5 using five rectangles and the right-endpoint method?
• How do you estimate the area under the graph of #f(x) = sqrt x# from #x=0# to #x=4# using four approximating rectangles and right endpoints?
• How do you estimate the area under the graph of #f(x)=3cos(x)# from the interval where x is between [0,2] using four rectangles and the right end points?
• How do you estimate the area under the graph of #f(x) = 10sqrt(x)# from #x = 0# to #x = 4# using four approximating rectangles and right endpoints?
• How do you approximate the area under #y=10−x^2# on the interval [1, 3] using 4 subintervals and midpoints?
• How do you estimate the area under the graph of #y=2x^3+4x# from 0 to 3 using 4 approximating rectangles of equal width and right endpoints?
• How do you use the midpoint rule to approximate the integral #-3x-8x^2dx# from the interval [-1,4] with #n=3#?
• How do you estimate the area under the graph of #f(x)=4sqrt(x)# from #x=0# to #x=4# using four approximating rectangles and right endpoints?
• How do you estimate the area under the graph of #f(x)=25-x^2# from #x=0# to #x=5# using five approximating rectangles and right endpoints?
• How do you evaluate the Riemann sum for 0 ≤ x ≤ 2, with n = 4?
• How do you find the Riemann sum for #f(x) = x^2 + 3x# over the interval [0, 8]?
• How do you find an approximation for the definite integrals #int 1/x# by calculating the Riemann sum with 4 subdivisions using the right endpoints from 1 to 4?
• How do you find the Riemann sum for #f(x) = x - 2 sin 2x# on the interval [0,3] with a partitioning of n = 6 taking sample points to be the left endpoints and then the midpoints?
• How do you find the area between 1 and 2 of #(3x^2-2)dx# using reimann sums?
• How do you find the Riemann sum associated with #f(x)=3x^2 +6#, n=3 and the partition of [0,6]?
• How do you use a Riemann Sum with n = 4 to estimate #ln3 = int (1/x)# from 1 to 3 using the right endpoints and then the midpoints?
• How do you find the Riemann sum of #f(x)=x^3# , -1<=x<=1, if the partition points are -1, -0.5, 0, 0.5, 1 and the sample points are -1, -0.4, 0.2, 1?
• How do you integrate #(2x+1)dx# with b=3,a=1 using reimann sums?
• How would I write the Riemann sum needed to find the area under the curve given by the function #f(x)=5x^2+3x+2# over the interval [2,6]?
• How do I find the riemann sum of #y = x^2 + 1# for [0,1] at infinitely small intervals?
• How do you find the left Riemann sum for #f(x) = e^x# on [0,In 2] with n = 40?
• How do you find the Riemann sum for this integral using right endpoints and n=3 for the integral #int (2x^2+2x+6)dx# with a = 5 and b = 11?
• How do you find an approximation to the integral #int(x^2-x)dx# from 0 to 2 using a Riemann sum with 4 subintervals, using right endpoints as sample points?
• How do you find the area under the curve #f(x) = x^(2) + 1# over [0,1] with n = 4 using the midpoint of each subinterval?
• How do you find the Riemann sum for #f(x) = x - 5 sin 2x# over 0 <x <3 with six terms, taking the sample points to be right endpoints?
• How do you estimate the area under the graph of #f(x)= 2/x# on [1,5] into 4 equal subintervals and using right endpoints?
• Let #f(x) = x^3# and compute the Riemann sum of f over the interval [2, 3], n=2 intervals using midpoints?
• Let #f(x) = x^2# and how do you compute the Riemann sum of f over the interval [6,8], using the following number of subintervals (n=5) and using the right endpoints?
• How do you use n = 5 equally divided subdivisions to estimate the integral from 1 to 3 of #(1/x^2)dx# with the right-hand Riemann sum?
• How do you find the Riemann sum for #f(x) = 4 sin x#, #0 ≤ x ≤ 3pi/2#, with six terms, taking the sample points to be right endpoints?
• How do you calculate the right hand and left hand riemann sum using 4 sub intervals of #f(x)= 3x# on the interval [1,5]?
• How do you find the Riemann sum for #f(x)=sinx# over the interval #[0,2pi]# using four rectangles of equal width?
• If #f(x)=x^(1/2)#, #1 <= x <= 4# approximate the area under the curve using ten approximating rectangles of equal widths and left endpoints?
• Using Right Riemann Sums, approximate the area under the curve #5x^2-4x# in the interval #[0,3]# with #6# strips?
• How do you use Riemann sums to evaluate the area under the curve of #f(x)= x^2# on the closed interval [1,3], with n=4 rectangles using midpoints?
• How do you use Riemann sums to evaluate the area under the curve of #f(x)= 3 - (1/2)x # on the closed interval [2,14], with n=6 rectangles using left endpoints?
• How do you use Riemann sums to evaluate the area under the curve of #f(x) = (e^x) − 5# on the closed interval [0,2], with n=4 rectangles using midpoints?
• How do you use Riemann sums to evaluate the area under the curve of #f(x)=cosx+0.5# on the closed interval [0,2pi], with n=pi rectangles using midpoints?
• How do you use Riemann sums to evaluate the area under the curve of # f(x) = 4 sin x# on the closed interval [0, 3pi/2], with n=6 rectangles using right endpoints?
• How do you use Riemann sums to evaluate the area under the curve of #f(x)= In(x)# on the closed interval [3,18], with n=3 rectangles using right, left, and midpoints?
• How do you use Riemann sums to evaluate the area under the curve of #f(x)= 3x # on the closed interval [1,5], with n=4 rectangles using right, left, and midpoints?
• How do you use Riemann sums to evaluate the area under the curve of #f(x)=x^3# on the closed interval [1,3], with n=4 rectangles using right, left, and midpoints?
• How do you use Riemann sums to evaluate the area under the curve of #y = x^2 + 1# on the closed interval [0,1], with n=4 rectangles using midpoint?
• How do you use Riemann sums to evaluate the area under the curve of #1/x# on the closed interval [0,2], with n=4 rectangles using midpoint?
• How do you use Riemann sums to evaluate the area under the curve of #f(x) = 2-x^2# on the closed interval [0,2], with n=4 rectangles using midpoint?
• How do you use Riemann sums to evaluate the area under the curve of #f(x) = x^2 + 3x# on the closed interval [0,8], with n=4 rectangles using midpoint?
• How do you calculate the left Riemann sum for the given function over the interval [1,7], using n=3 for #(3 x^2+2 x +5) #?
• How do you calculate the left and right Riemann sum for the given function over the interval [0, ln2], using n=40 for #e^x#?
• How do you calculate the left and right Riemann sum for the given function over the interval [1,5], using n=4 for # f(x)= 3x#?
• How do you calculate the left and right Riemann sum for the given function over the interval [6,8], using n=2 for #f(x) = x^2#?
• How do you calculate the left and right Riemann sum for the given function over the interval [2,6], for #f(x)=5x^2+3x+2#?
• How do you calculate the left and right Riemann sum for the given function over the interval [2,14], n=6 for # f(x)= 3 - (1/2)x #?
• How do you calculate the left and right Riemann sum for the given function over the interval [0,2], n=4 for # f(x) = (e^x) − 5#?
• Suppose #f(x)= 2x^(2)-1#, how do you compute the Riemann sum for f(x) on the interval [-1,5] with partition {-1,2,4,5} using the left-hand endpoints as sample points?
• Suppose f(x)= cos (x). How do you compute the Riemann sum for f(x) on the interval [0, (3pi/2)] obtained by partitioning into 6 equal subintervals and using the right hand end points as sample points?
• Find, approximate, the area under f(x)=3x^2+6x +3 [-3,1] using the given partitions? a) 4 upper sum rectangles b) 2 midpoint rectangles c) 2 trapezoids d) 256 right sided rectangles
• Determine a region whose area is equal to the given limit?
• How do you find the area under the curve #y=4 -x^2# with 6 rectangles over [-2,1] by using the LHS rule?
• Question #24cce
• Find the linear approximation of the function f(x) = √4-x at a = 0 and use it to approximate the numbers √3.9 and √3.99 ? (Round your answers to four decimal places.)
• Using Riemann sums, find integral representations of the following:?
• Use Riemann sums to evaluate? : #int_0^3 \ x^2-3x+2 \ dx #
• Estimate the area under the curve #f(x) = x^2# over the interval #[0,10]# with #5# strips using Left Riemann Sums?
• Use Riemann sums to evaluate? : #int_0^(pi/2) \ sinx \ dx# ?