Evaluate the following integrals as a limit of sums:
Formula used:
where,
Here, a = 0 and b = 2
Therefore,
Let,
Here, f(x) = x2 – x and a = 0
Now, by putting x = 0 in f(x) we get,
f(0) = 02 – 0 = 0 – 0 = 0
f(h)
= (h)2 – (h)
= h2 – h
Similarly, f(2h)
= (2h)2 – (2h)
= (2h)2 – 2h
Now take h2 and -h common in remaining series
Put,
Since,