Use the Midpoint Rule with
m
=
n
=
2
\displaystyle {m}={n}={2}
m
=
n
=
2
to estimate the value for
∫
∫
R
4
x
+
3
y
d
A
\displaystyle \int\int_{{R}}{4}{x}+{3}{y}{d}{A}
∫
∫
R
4
x
+
3
y
d
A
on the rectangle
R
=
[
0
,
4
]
×
[
0
,
6
]
\displaystyle {R}={\left[{0},{4}\right]}\times{\left[{0},{6}\right]}
R
=
[
0
,
4
]
×
[
0
,
6
]
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