Observe that f(x) as you defined it isn't actually a function of x. x is the variable of integration. If you wanted to amend this you can change the variable of integration by defining f(x) \;\; =\;\; \int_0^x ydy. ...

In terms of the literal definition of the (Riemann) integral, you always have ending points of small subintervals for integration that are BEFORE (less than) the starting points, so when you take the ...

If you swap the bounds, the area will be exactly the same magnitude, but of the opposite sign. If you graph y=x^2, in both cases you are still taking the area under the curve, just in different ...

Yes, everything you've written is correct. (except for that one weird chain of equations x_{0+k} = f(0+k) = k^2 which doesn't really make sense) Although this problem is simple enough that what I ...

We have x^2-1<\lfloor x^2\rfloor=n\le x^2\iff \sqrt n\le x<\sqrt{n+1} so for n=0 we have 0\le x< 1 and \lfloor x^2\rfloor=0 and for n=1 we have 1\le x<\sqrt2 and \lfloor x^2\rfloor=1 ...

First off, you forgot the factor of 2 in the transformation, i.e. \int_{0}^{4} x^2 dx = 2\int_{-1}^{1}(2x+2)^2 dx Secondly your calculation is wrong, you should get \left(\frac{2}{\sqrt{3}} + 2\right)^2 + \left(-\frac{2}{\sqrt{3}} + 2\right)^2 = \frac{32}{3} ...