Difference between revisions of "The Additivity Theorem"

Revision as of 15:46, 9 November 2021

The Additivity Theorem for Riemann Integrable Functions: Let $f$ be a real-valued function on the interval $[a,b]$ , and let $c\in (a,b)$ . Then, $f$ is Riemann integrable on $[a,b]$ if and only if it is also Riemann integrable on $[a,c]$ and $[c,b]$ . In this case,
$\int _{a}^{b}f=\int _{a}^{c}f+\int _{c}^{b}f$

@@ Line 1: / Line 1: @@
 <blockquote style="background: white; border: 1px solid black; padding: 1em;">
-'''The Additivity Theorem for Riemann Integrable Functions''': Let <span class="math-inline"><math> f </math></span> be a real-valued function on the interval <span class="math-inline"><math> [a,b] </math></span>, and let <span class="math-inline"><math> c\in (a,b) </math></span>. Then, <span class="math-inline"><math> f </math></span> is Riemann integrable on <span class="math-inline"><math> [a,b] </math></span> if and only if it is also Riemann integrable on <span class="math-inline"><math> [a,c] </math></span> and <span class="math-inline"><math> [c,b] </math></span>. In this case, we have that
+'''The Additivity Theorem for Riemann Integrable Functions''': Let <span class="math-inline"><math> f </math></span> be a real-valued function on the interval <span class="math-inline"><math> [a,b] </math></span>, and let <span class="math-inline"><math> c\in (a,b) </math></span>. Then, <span class="math-inline"><math> f </math></span> is Riemann integrable on <span class="math-inline"><math> [a,b] </math></span> if and only if it is also Riemann integrable on <span class="math-inline"><math> [a,c] </math></span> and <span class="math-inline"><math> [c,b] </math></span>. In this case,
-<math>  </math>
+<math> \int_{a}^{b} f = \int_{a}^{c} f + \int_{c}^{b} f </math>
 </blockquote>

Difference between revisions of "The Additivity Theorem"

Revision as of 15:46, 9 November 2021

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