Calculate the upper sums Unand lower sums Ln, on a regular
partition of the intervals, for the following integrals. Note that
H represents the Heaviside function as usual:
∫51(7−8x)dx
(a) Upper sum Un
__________
(b) Lower sum Ln
__________
∫10(4+12x2)dx
(c) Upper sum Un
__________
(d) Lower sum Ln
__________
∫21H(x−2)dx
(e) Upper sum Un
__________
(f) Lower sum Ln
__________
∫21f(x)dx
where f(x)={10 if x is rational if x is irrational
(g) Upper sum Un
__________
(h) Lower sum Ln
__________
Calculate the upper sums Unand lower sums Ln, on a regular partition of the intervals, for the following integrals. Note that H represents the Heaviside function as usual: ∫51(7−8x)dx (a) Upper sum Un...
Calculate the upper sums Unand lower sums Ln, on a regular partition of the intervals, for the following integrals. Note that H represents the Heaviside function as usual: ∫51(7−8x)dx (a) Upper sum Un __________ (b) Lower sum Ln __________ ∫10(4+12x2)dx (c) Upper sum Un __________ (d) Lower sum Ln __________ ∫21H(x−2)dx (e) Upper sum Un __________ (f) Lower sum Ln __________
Unsure how to complete these. My understanding is that some
answers will still include the n variable.
Calculate the upper sums Un and lower sums L n on a regular partition of the intervals, for the following integrals Note that H represents the Heaviside function as usual (1 -6x) dx (a) Upper sum Un (b) Lower sum Ln (3 + 15x) dx 0 (c) Upper sum Un (d) Lower sum Ln H (x - 2) dx e) Upper sum Un...