Prove that da(x) = a(b) a(a), %3D |

note: second image is definition 2.1

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Definition 2.1 Let P X0, X1, ..., Xn be a partition of [a, b] and let tk be a point in the %3D subinterval [xk-1, Xx]. A sum of the form n S(P f,a) - Σ ftu) Δαι k=1 is called a Riemann-Stieltjes sum of f with respect to a. We say f is Riemann-integrable with respect to a on [a, b], and we write "f E R(a) on [a, b]" if there exists a number A having the following property: For every e > 0, there exists a partition Pe of [a, b] such that for every partition P finer than Pe and for every choice of the points tr in [xk-1, xk], we have |S(P, f,a) – A| . When such a number A exists, it is uniquely determined and is denoted by f fda or by L' f(x)dx . We also say that the Riemann-Stieltjes integral f fda exists. The functions f and a are referred to as the integrand and the integrator, respectively. In the special case when a(x) = x, we write S(P, f) instead of S(P, f, a), and f E R instead of f E R(a). The integral is then called a Riemann integral and is denoted by fdx or by f(x)dx. The numerical value of f" f(x)da(x) depends only on f,a, a, and b, and does not depend on the symbol x. The letter x is a "dummy variable" and may be replaced by any other convenient symbol.

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Prove that da(x) = «(b) – a(a), directly from Definition '2.1.